Bandwidth mismatch calibration in time-interleaved analog-to-digital converters
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- Δημοσθένης Βονόρτας
- 6 χρόνια πριν
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1 Bandwidth mismatch calibration in time-interleaved analog-to-digital converters Fatima Ghanem To cite this version: Fatima Ghanem. Bandwidth mismatch calibration in time-interleaved analog-to-digital converters. Other. Télécom ParisTech, English. <NNT : 2012ENST0051>. <pastel > HAL Id: pastel Submitted on 2 Jun 2014 HAL is a multi-disciplinary open access archive for the deposit and dissemination of scientific research documents, whether they are published or not. The documents may come from teaching and research institutions in France or abroad, or from public or private research centers. L archive ouverte pluridisciplinaire HAL, est destinée au dépôt et à la diffusion de documents scientifiques de niveau recherche, publiés ou non, émanant des établissements d enseignement et de recherche français ou étrangers, des laboratoires publics ou privés.
2 2012-ENST-051 EDITE - ED 130 Doctorat ParisTech T H È S E pour obtenir le grade de docteur délivré par TELECOM ParisTech Spécialité «Electronique et Communications» présentée et soutenue publiquement par Fatima GHANEM le 28 septembre 2012 Compensation de l erreur de bande passante dans les convertisseurs analogique numérique à entrelacement temporel Directeur de thèse : Patrick LOUMEAU Co-encadrement de la thèse : Patricia DESGREYS Jury M. Amara AMARA, Professeur, ISEP, Paris Président M. Dominique DALLET, Professeur, IMS, Bordeaux Rapporteur M. Philippe BÉNABÈS, Professeur, Supélec, Paris Rapporteur M. M. Philippe GANDY, Reponsable, IDT, Caen Examinateur M. Arnaud BIALLAIS, Ingénieur, IDT, Caen Examinateur M. Patrick LOUMEAU, Professeur, IT ParisTech, Paris Directeur de thèse Mme. Patricia DESGREYS, Maitre de Conférences, IT ParisTech, Paris Co-directrice de thèse TELECOM ParisTech Ecole de l Institut Télécom - membre de ParisTech
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4 r t t ès t r t s st t é tr é rt t tr q t t s à P r s ù ssé s r rs s t ès s q éq rt ss rs s P r ù t r é t ès t s t t r à r r r s r t rs t ès P tr t P tr s r 2 r r s té t r r t t ès r à r t t ès r st r q ssé à r t t rt é s s r r tt t ès r t t r s s r s t s s r t q s très str t s r à t r r t t à P 2 q t rs r t s t s t t s s é r s t s s s s t ré 1 q q s t r r ss é t s r r ts à P ès t q t q t r r r t q r rt t s r t ès été très t r à r r r q té rés r s t t ès ét t r r à r s t à é é P r s q r s s r s rt ss rs t s rt t r r s ts t s ât 1 q t s r s s r r tt r é t à ss r2 q st 1 t t r s éq P r s r ss é t s r r ts à s s è s q é s t s s rs t q rt s q t à é é P r s r s r P tr s r 2r s 3 3 r t tr s❹ r r t ès s à éq rt ss rs r s q été rés r é é ér s té s s rt r s r rs s s t r t s s rs r à s t s s r t s ss s t t s s très s t s t rr2 t t s r t s r s t t s t t s rt t rès t r 2 ❹ ç été t s éq ré éré ❹ r à t r t t r t t s t s tt ❹ r à P rr r r à s tr s r tr s2 ré éré t r à r é t P r s s rt s t q èr t têt ❹ r à t 2 t r à s s s t t r à r à s r 1 r t s été ss s s s q t s r r tt r 1 t s r r r t s 1 ré ss t r s s❹ t r à q té s tt t s à r r r tr
5 èr t é ér s s rét r r ss à 2 r t r s s r s q ré ss à r ❹ t r à r r t s té r t s été ss r t tt t ès s s t st t t ét r s t t é 1 s r s t r r s r r ss tt ré ss t à t rt èr t à s r ts t r s rs q s 3 q é s t q s 3 r é s s s é t ès
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7 és é r ç s tr t r rt t st r s r t s s é à rés t s r r é s q t s s t rs st r s é t P ss t s é rs s2stè à é r s é tt rs ré t rs 1trê t 1 s t s r s rs st r s ér ts st rt èr t r s s st t s s ù ût r é t st t s st rt t st t t s s t r r r s2st ù tr t t q st sé q s q tr t t s é q s st r s st ré sé r r t rt ér q tr s rt r ss t s t s t rs à é r à s t s t é rs té é s rt s r t rs rt s t tt s ss t s é r t rs à r s r s rés 1 r s s s r té é t st s s r s ér t rs r r s rés 1 t é t s rt t t trô r st q s t é r ét q s é s r s r s s rs r str t r s rés 1 r s s s s st r r s éq ts r t s é t s s t é r ét q t t té tr s ér ts st r s s ts tt t r ss ss é ét t tr s ss r é î tr s ss
8 r r rés t r t t r tr s ss s r t t sé s s st t s s rt ss r q ér q s t t r tr st très rt t q s t s è à r t tr s s t tr s ttr s r t é ss t t s t s r P r rt ss r q ér q tt t t ss t q té r t s r t t r q s ét s ré é ts s r q 2 q tré rt ss r P r r à r è t r r r t î ré t 1 s t s t r réq é t r r t t t rt ss r tr t à s s r r t t r q t r t q t t t t s rés t P r t à é r té st t st ss ré s r tr s s t s t s tr 1 t ès é r ts s t st ét r t r t t ss s s t rés t ts r s t s st t s t s rt èr t s î ré t r r 1 t s r r s st t q s t 2 q s très r ss t t t 2 t s t ss q r ttr r té r t t ss s rés rs s r ètr s és r rt ss r à ré s r r s 1 s tr s ss é ss 1 t ré t 1 à s r t ss réq r rés t s é é r ss ss é rt ss r t t s t s s s ts t t s MHz 94 10MHz MHz MHz t t s MHz 88 10MHz MHz MHz é t rt ss r t s r r s à ré s r 1 r t t r t s r t r è t t rt s r r t t r éq t à t sé t êtr t 1 s s é t s t é r té r rt s s r r t ss t é é t ss ét t rt été t é s r s s 1 st ts r s r s s ér t s r t t r s s s t sé s s r é s s é s à s r s P t t r r ît rs q st r t t r q s st s r s t t ss r s rés t s é é s P r rs r tr q 1 st r s t ss rés t r tt r t t r t q r s rés t s t é ss s t ss s s
9 r s t s t ss s s s ttér t r r t t r ts t r t t t r ts r tr s t r ts 2st r t t s r r t t tt r t t r st é r t s r ù s tré 1 t st rt s ss t r s rt ss rs t st s t r str t à t 1 r r t rs t r t ss r r 1 r r réq é t s é é f s t t sq t ss s té s s r rt ss r à ts rés t st à tt r 1 r t t r à tr t t r t s ér r 1 s t tt r s r r s s t s té s à tr t t r st r 1 r t t r r s réq s ér t é é s t r t q é r tr q s s s é r rt ss r r 1 t t réq é t r t t r à tr t t r r t rs r tér s t q é r ss s é s t t ss t r séq t ss ss é st r t s t s r r r 1 t r t t r à tr t t r s r r s t ss t ss ss é q s êtr r 1 r r ss r tr r è rt ss r q ér q à tr t t r tr t t r q 2 t s t s t ss s t ss é rés t t t s s r t s s 1 és r ts tr s
10 Analog input x(t) x[n] CLK 0 ( =0x2 /M) M s /M ADC 0 z -1 z -1 CLK 1 ( =1x2 /M) M CLK M-1 ( =(M-1)x2 /M) s /M ADC 1 s /M MULTIPLEXER s Digital output y[n] M ADC M-1 CLK TIADC T*M Ts*M Clk ADC 0 CLK 0 Clk ADC 1 CLK 1 Ts T Clk ADC CLK M-1 M-1 Timing diagram of a TI ADC with M channels r rt ss r à tr t t r s és 1 ts r t s q tr rr rs s s s s t é t s s t rr r st t é t s t rr r s ss t s tr s tr s tré s ér ts rt ss rs t rs rt ss rs s tr é t t à t ss ω s /M r s rt q st t t rt ss r à tr t t r té y i t st 1 r é r y i [k] = g i x ( (km +i)t t i ) hτi (t)+o i. ù o i r rés t rr r s t g i rr r t i rr r st t é t t H τi tr tré q ré s réq s rt t t t s s rr rs st é r [ ] Y(e jω ) = 1 T + 1 M k= T k= M 1 i=0 g i H i (j(ω k ω s M ))e j(ω kωs M )t i.e jki2π M M 1 1 ω o i e jki2π s M δ(ω k M M ). i=0 X(j(ω k ω s M )) t s rr rs s r s tr s rt st r rés té s r r ù s 2 s r îtr s r s st rs r t 1 t t r q r
11 Analog input x(t) x[n] CLK 0 ( =0x2 /M) M s /M ADC 0 z -1 z -1 CLK 1 ( =1x2 /M) M CLK M-1 ( =(M-1)x2 /M) s /M ADC 1 s /M MULTIPLEXER s Digital output y[n] Power power M ADC M-1 Single channel M channels Linear dependence Exponential dependence 125Msps 250Msps op fs s r rt ss r à tr t t s t r t q é x(t) x[n] z -1 CLK 0 (t o ) M CLK 1 (t 1 ) M H τ 0 M. z -1 CLK M-1 (t M-1 ) H τ 1.. H τm-1 g 0 g 1 g M-1 o 0 o 1 o M-1 ω s /M ADC 0 ω s /M ADC 1 ω s /M ADC M-1 MULTIPLEXER y[n] r à tr t t r à 1
12 r s st rs é r s st ss tré s r tt r q s t st rr r q st é t s tré t r t t s s ω/m q r s s t ss 3 tr q r s rr rs s t rr r ss t s é èr t s r s st rs 1 réq s ±ω in +k ωs M r t s rr rs à s rt tr t t r t é r té rt ss r r rés té r st é r é r r st rs s é é t rs é ss r s r s rr rs r ts q rt ss r tt s r r s sé s s q s t rs été tr és é r s rés t s é ss r s r s ér t s rr rs tt r s r r s sé s r tr q rr r t s é ss r s tr 1 1 rt ss r à tr t t r t s q s t êtr ér r à s r r s réq s é é 3 r s ttér t r s rs tr 1 s t à s r s 1 rr rs t s t r tt t rs tt r s r r s t rr r ss t r ss t s t s très r s s t tér r s rr t s s rr rs t s t rr r ss t st sé r s r ts tr s tr s tré s 1 st t t rt ss r à tr t t r rés t s tr t s t s q é t réq tré q r r t s à ré s r rès tr 1 tr t t tt rr r t à r à tr ss ét 1tr t tt rr r été r sé s ttér t r s s s s rs tér ssés à tt rr r t s s t s q s t ér q s t été r sé s r t t ès r s r rr r ss t
13 r rs s rr r st t q r rs s rr r s rr r ss t s 2s rr r ss t P t s é t q rés tré à tés tés s rt tr ss P r rt ss r à tr t t r à 1 s s r rés t s s H 0 t H 1 s tr s tré 2 t s réq s r s ér t s r 2 t ès tr ét st s ér r tr r ss s r r r r t
14 r à tr t t r à 1 1 s rt q s 1 r r y i [k] = (g(τ i ))x((km +i)t +f(τ i )). ù τ i r rés t st t t s t g(τ i ) = 1 1+(ωτi )) 2, f(τ i ) = arctan(ωτ i )). t s s tr tré t tt rr r s r s r r s t réq st rés té s r r t r t s é r rés t s té r tt r s r r s s té t r t st t s sé rr r tr 1 1 t s é ss r r s réq s tré sq à 3 réq r 2 st 3 t s s t s t r tr t q rr r r t tr s tr s tré s r t t é ss r q é r rt t s r r s tr t s t q s r t rr r ss t s s é t t r s rr r ét 1 s r t t été s érés r s r s s t s r t rr r ss t s ér r s rr rs sé ré s s s r t rs q s rr rs s t é t s t t êtr tr té s sé ré t r rr r r ît s t s s s rt t s s t s é t réq tré ç é r tr rt s tr t s t s û s à s t t r s t t st t q t s P r séq t t s t q s r t s t s r sé s s ttér t r t s èt s t s t ê é s r rés rr r ss t t s s t s t tré q s ér t s rr rs sé ré s
15 r rs s rr r ss t st tt t r s rés t s rr r s rr r s t rr r ss t t t s ss s rr t s s s s ss t rés t t s s rr rs t r s ê s rés t s s séq st rt t q s t q s q é s r s rr t s t s tè r t rr r t r s r st t rr r ç ss é s tr s rr rs st ér t q s s t s rr t s t s t s 1 è s ré t st t rr r t s s q rr r ss t t t s rr t à r r t ér q P r s rés t s é à é q é s r s r s t r rr r ss t t tr s r r t t très rt t r t s t rr t à s q r rés t r r t ré à s t sé st rs ré ér s ér r rr t q r tt t r ss ss é s t ét st t rr r st s té à rr t q ù s rr rs s t tr té s sé ré t t 1 t t s q rés t t s s t s 1 st t s r r t rr r s s r sé s s t s r é r r s q s t sé t t r t ss t t ss ér t s s s t s rés 1 é t tt s t q s st à t r s rs rés 1 é t r s r t 2 q rr r s r t t r à tr t t r è r sé st é r t s r r t ét r s r s r s t s s r t t t é r r t s s r t r st st t tr r tt s t s st 1 st t ù s 1 t rs s t tés r t r r s t t s r t s ss t s r t s t q s r s s st s té 1 rr rs s s t t t s
16 q r t té é r s s s t f s /2 input f s /2 f s /2 a 1 a 2 a 3 2 channel selection ADC 0 ADC 1 y 1 [n] y 2 [n] Additional sampler Random selection r è r s t s rés 1 é t r sé r é r t rès r s t s rés 1 é t tré s t rr r ss t st t t rr t s é r s st à 1tr r rr r ç ér q t rr r s t q 1 st à r s t q r t st r rr r èr t s t 1 s t s tr t t tt r é t q st t r èr s t s s t r 1tr r rr r s r s st t st à r t t s s rr rs t tt r èr r t s rr t q s rr rs q st ré éré à rr t ér q q rés t ss s é s é é Pr t t s t 1tr t r sé s tt t ès rr r ss t
17 st sé s r st t rr r tr s 1 s st t t rt ss r s r r t s s s éré s t t s s tr s rr rs s t t s ré t sé t s rr s r s t t s rr rs s r s t r sé r t t r st é r t s r ù ér s 1 ss s y0 2 t y2 1 r rés t t t ût t rr r st rsq s 1 rt ss rs rés t t s rr r ss t s 2 t ès r r r r t r s s s à tré tt t s 1 r r loss[k] = y 2 0 [k] y 2 1 [k] = 1 { } (ωτ 0 ) (ωτ 1 ) (1+(ωτ 0 ) 2 ) cos[2ωt(km +0) 2arctan(ωτ 0)] 1 2(1+(ωτ 1 ) 2 ) cos[2ωt(km +1) 2arctan(ωτ 1)]. t êtr s t 2 tt t rr r s té ré s rt té r t r r ttr 1tr r q rt r t rr r ss t t à s rt té r t r t té s r r r rés t t s 1 r r Slope = 1 2(1+(ωτ 0 ) 2 ) 1 2(1+(ωτ 1 ) 2 ) t r tt t r t té ré r rés té r tr é rr r ss t t réq tré t é t s é s r té r t r rsq s rt té r t r é ss s s r s rs é s rr r s 1 s s t r 2 s rés t t à tré té r t r sq à q t ω s /2 H 0 (j ) x(t) ω s /2 H 1 (j ) y[n] Notch at s /4 y 0 y 1 y 0 2 y Slope Correction r st t rr r ss t st à t r q t st s r r r à tr t t r séq r s à réq ω s /4 r st rs r t à ê réq q r s 1tr t ss ù térêt t s r tr t r tt réq s r r r è r r t s t rés t ts è é té r st t rr r ss t été é é
18 t t r r s t s r t t2 ré r s r r st ss t q q s s r sé s s été tr té r s t t tr té tt s t s rés t ts s t r rés tés r r ù s 2 s t s r s st rs t é r t q ss à rès rr t q é rr r 1tr t r r té r t r r rès rt t s rs r r rr r s t t r 3 r t r q r st ré sé rès t r s t s r s s rt t s rt t rt ss r s tr t t r st t rr r ss t r s r rt té r t r r s s P r rs s s s éré é t tt ét q s rr rs t s s t ré t rr é s rés s r èr s tt s t st té r rés rr r st t q sq sé s r 1tr t s ss s s 1 rt ss rs q ss r t rs s t t rr r ss t t st à t r q rr r st t q r t r t s r té tr s t t s s 1 rt ss rs t s s r è t s t rs ré ér tr s s s rt t t r q s t st t r sé s r t r è s q s à rr r rès r é s t r s t s s ré sé r t t2 q
19 à r t ré s r s s t t s rés tr s s r s rr rs Pr t t2 t s t r sé t s t s é s r t é t s rés t ts s t s s ts r t t sé st sé 1 rt ss rs t t à s s r èr ét s st q s t s é t s à s rt rt ss r st tr t t st s t q é r st r rr r ss t t s t s t r sé r tr s rés t ts t s r r rés t r 1tr t à s t r sé sé s r q t à r r r rés t rr r ss t s s t s r s r s t rès r s r é rr r s q t êtr s ré ss s réq s s s r r 1tr t ss t à rt r s t r sé r r réq s t r q t r rés t r t t r 1tr t rr r r s réq s tré très é é s r è st t q r r r rès ét s r r st t rr r ss t sé s r s t r sé r rs s rr r à s r s r r r t t sé t s s r s ss t s s st té q s t t s s ss t s t s 1 r t rs r s rs r t tré q é ss t rs t t é r s r r t tr r rés t rs t r s tr 1 t rs s ré s r rt ss r q ér q à t s r r s t ss t é r té r t r st t s r t t r à tr t t r été s r t tt r s t ss s rt t s r é s t s rs rt ss rs q t t à t ss ré t t t 2 t tr s s r s t rt ss r t tt r t t r rés t s
20 rr rs r t tr s s st t t t q ré ss t ér t 1 r t s r t s rr rs s s s s t s t t s t q s t r t tr té s s ttér t r t r s t s r s s rr r ss t tr s s t s t s t s r s r r s é r té rt t s s rs tré q r tt r à 3 tré rr r ss t t êtr ér r à q à ré s r rès tr 1 tr t t tt rr r t s s s r sés rt r s t s r r r è r èr s st à ré r t rr r ss t r s t s rés 1 tré t t s r ts tré s é t r s r t ét r s r s st rs s r t t s ss r t s r st st t t tt s t t êtr t sé é t à tr s s t s q ré r t rr r ré t s t st t rr r ss t é t été r sé st sé s r 1tr t tr t tt s t été é r s t à s r t r t t2 s r été s t r s ér r r st ss tt s t t s ré 1 s s ss t r t 1tr t s ré s t t st rt t r s r ts tés t t s r s t q s 1tr t ss t P rs t s rs t r à r t st tr r s t sé r t t t s s rr rs r st t s t r t rr r s rr rs sé ré t s q r r st t tr s rt t t rr t q r t s r s q rr t t t rés t r rés t s s r t s rr r ss t 1tr t r rés t rr t q q r r r r ttr st t ré s r s à 2 t r s tr 1 r r r tt r r s r r s s r t t r s à tr t t r r rs t s r s tr 1 t rs
21
22 str t r t r ss t s s s t t t rt r s t t t r r t r ss t st r tr s rs r t r t t s s st t s r q r s r s t t t rt r t r r t t r s t 2 t r s t s r q 2 t s sts t r 3 t s r s r t t r t r t s 2 t r s r t r ss t r t r r t s s t s t t s r t rr rs t t r t2 t rt r r t r s t s t t r s s t t s rr rs 2 r s s r t t s t r s rr r s r t t t t r t s r t s t r s r t 2 s ss t rs r t t t r q s t s t t rs s t s t rr r s rr r t r s s s t t s t ts t t r q 2 r r t t t s t rr r r t s t r s s r r t s ss r2 t s r s t t s t rr r r s s s t s t t t r s r s rst s sts r t t t t s t rr r 2 r 3 t t s t r s t s t rr r t t r r t t r s s 2 2 tt r t s st 2 t r t s 2 r t r st s sts r 3 t s s r t t 2 t s rs r t t t t s r s s t s t r s t t r 3 t st t r s r t 1 st t s t r s t t s r r s t r r r t s ss t s t rr rs t s t s s t s s t s rr r s r s sts s t t t s t rr r s st t rr t s t rr r st t s t s r2 rt t t r t 2 1tr t t rr r t s t rr r s r s t t t t s rr r ts r s t t t ts s s t t t s rr rs t t s t r r s q t 2 t rr r st t s t r r s 1tr t s t s 2 s s r st t t t s t s 1tr t s r s t s t t t r t r t s s t t s t 2 t st t rr r s tt r r t r 2 s r s r q s s t t q s rt ss t st t t s st t rr r s t r s s t r r t s t t s rr r st t t q t r r t rr t t tr r2 t r 1 st s t s s 2 r 1 t r ss rr r s ts t r t t t rr t r s s t s rst t 2 s t t r st ss s t s s s r st s s s r st r rt s t r s t s2 tr s s t t s t s tt r r t r t s s r s rs t t s r q s r t 2 t t r t r r t r st s s 2 t t s r tr s rr rs t s s s r t t t r s st t t q
23 s t èr s str t 2 s r t s és é r ç s tr t s t t t rt rs tr t t t rt rs rt rs r t 3 t rs s t s t t s t s s t rr r r t2 2 s t s r s r t t r s 2q st s s rt rs s P s rs s t r s r rt rs tr r t r r t tst r t t r s r ss s st t t r r r q r ts t r s t r s tr t t t s t rr rs
24 s t s t s t s s t t s t r P r r t t s t r s t s t rr r r t q t r t r r r s r 3 t t q s t s rs t t t r t s rs s t s t r t q s tr t r r t t q s rr t t q s r t t t q s s t r s Pr s t t q t s t st t tr t Pr s q r Pr s 1tr t t q 2st t t t t s t t 1tr t s Pr t t2 tr t r s r t t st s t s r ts r s ts t r s s 1 t s t s t r 2
25 st r s t t rt r s t 3 t r s q t 3 r r s s s t 3 s r t s s t r q 2 s s r t t s tr t 3 r t r t r st q t 3 t rr r s t rr r rr r r t r t2 t r r t2 tt r t 2 s t s t t t t s tr ts s ss r 1 t r t t r 2 t t r st P r t t r rst r r Σ t r t r t t rt r t t t rt r r s r t t t t rt r r s r t r s P r r t t r s t s s r r t r s t t r r t r s t s t s st t tr s r r s r t r t t t 1 st t t r s t r s rs s M s t t r s s i t st rt rr rs s t s t s t t r rt r st rt rr rs s t s t s t t t s tr s t rr rs s t s t r 2 4 s s t rr r t t s t t t r q 2 rr r s t t t t t r q 2 rs s s t rr r str t t t s s 2 r r s r t s P r r rs s s rr r s rr r t t t t r q 2
26 P r r rs s s rr r t r ts q t ss t r t s t s r On t t t s t rr r t t t t r q 2 s P r r rs s t s t rr r t t str t s s t q t t t t s P r r rs s t s t rr r r r t st t rr rs r t s rr rs P r r rs s t s t rr r r rr r s rr r s r s q t t t t t t r r 3 t t r r 3 t rs r s r r t t rs s s s rs r s s s r r t s q t r r t r r 3 t s t q s t r s t t r s t r s σ tau (%) r t r s t t st t 1 rr t s s r t s t rr r Bw rr t t rr t s s2st P r r rs s t s t rr r r t r r s t rr t s ss t rs rr t s r t t t r rr t s r t t t r 2 r 1 t str t r r t r 2 t r tr r r s t t t t t st s [(1 ǫ)ω s /2;ω s /2] s t rr r s 1tr t r 3 r t s2st r 3 s2st rr t t t t rr t r r t 2s u 0, 1, 2 V loss1 r t t t t rr t rs s t s s t V loss1 r r t V loss2 rs s s t r r t ω in /ω nyq V loss1 rs s r s t rr r s s2st r s t t rr r t t s rr r ts t t s t r tau τ = 0.02% r s t s t 1tr t s r s t s t 1tr t s t t t r r ω s /4
27 t t r t ω s /4 t r t r t t r s s r t t t r s t r t s t t r t t t r r s t t r s t t r t r t t r s s t t st t t t s t 1tr t t t st t t t s t 1tr t r s r t s s r r t t st s t s r t s tr t t t t r f in = tr t t t t r f in = 4.43MHz t r st t s rr t t t s t s t rr r t t tr t t t t r f in = t r st t s rr t r rr r rr s s t t t s t rr r t r t r t t r t t rq s f in = f in = t s t st t s t r s s t r rr r t s s s r ts r r t s r ts t t t t t t t t t s t s t s t s s r t s t t r t s t t s r t t t t t t s t t t t s t r s ADc 0 ADC 1
28
29 st s ts s tr t t t t rt rs r s r r s t r r t t r t r r r ss 2 t r s t t t r s s r r Σ rt rs t s t s t s r s st t t A in = 1dBFS tt r s r s r t rr rs t t s t rr rs s t rr rs s t s t s r s t rr t s t s r r t r st t s s t s t
30
31 2 s r t s r t s t t rt r r t r2 t 1 s t r t r2 t 1 s t r t s t t rt r r t t rr r r t r t2 2 s r t t r ts st r r tr s r r r t P r r t rr 2 2 r t r r st rt r r st rt t r t r q 2 t r r t2 st t t s r t 2 t t rt r rs t r t r s t r P P r r ss r 1 t st r t r r s r 2 r t s st rt t s t t r st rt s t ss s t t r2
32 t t s rs t 2st t t 3 t s t Σ t 2 s 1 s x s s 1 t s ω r r tr s r K b ol t3 st t o s t rr r g rr r t t s rr r τ t st t rr r h τ (t) t s r s s H τi (ω) r q 2 r s s
33 és é r ç s r é t s st r s r t s s rt t tr é à r t s r t t r s é tt rs ré t rs r r s r tt t r ss r s rs st r s ê t s st t t s ttr t r s t s st t s s ù ût r é t st très é é s râ à r t r sé t s 1 t st ré sé r s tés s q r t très r 1 té s tés tér s é t r ss t s r t t r s s rs s s tr t s 1 rt ss rs q ér q q ré s t t r tr s s tér t s t êtr très r s t très ré s q st s s sé q s r s t q r rt s t s r rés t t r t q r ré s t P r r s r t t r s r è s s t r s r tt t t r t ss é t s rt ss rs t t 2 t trô s r s t q r 1 s tr t s s r à à tr t t r s st r é s t s rs 1 t t à t ss sé r r 1 s tré st é t é s rt r s s ss t r êtr r st t é s t t s 1 st t t tt r t t r ré ss t s ê èr à s r t s 1tér r s s rr rs tr sèq s à q é t ér t q é èr s rr rs r t tr s 1 t é r s r r s rt ss r r è s rr rs s s s s t s t t rr r s s r s é t s s t r t tr té s s ttér t r t s t q s st t t rr t t été r sé s t t q s q ér q s t s s t s r s s s st t s s t r îtr s rr rs sé s r és r t tr s rés 1 é t s 1 st t t rt ss r à tr t t r ét t tt rr r s r s r r s rt ss r tré é ss té s r tt rr r s r tér st q s tt rr r s tr t té à s r t s ré r s r s s s t s rt tt rr r é réq tré s q é ss t s t s r t t à tr s t t s tr rt rr r r t s t s s s rt r s 1tr t s t t rés s rr rs st t q t s é r rès tr 1 tr t t r t tt rr r r t s r s r s s s s t é s st 1 tt r é t q t r t t ès r t é r s s tt t ès st ssé r ér t s ét s t r ét t rt s rt ss rs é ér t s rt ss rs à tr t t r rt r été ré sé P r s s r sé s r t t r s 1 st t s s ttér t r s t s ré rs r r s t ss rés t t é r té s t ét r s r s rr rs sé s r és r t tr
34 t t s s s rt ss r à tr t t r r s r r îtr é ss té rr r s rr rs s tr s s s t s r s sé s tt r s r r s à 3 réq tré rès r ét é s ér t s t q s s t 1 st t s s s r sé 1 s t s t s r èr q s st à r s r s rés 1 é t tré q s t r s s s tt rr r r t ét r s r s r s t s s r t t t s é r r s s é r r s é r s st à 1tr r rr r ç ér q t rr r s t q ér q 1 st à r t à tr ss s t q r t st r rr r èr s s rs r sé t q st t sé s r 1tr t rr r tr s 1 s t tt s t été ré sé rt r s t r s r tr rt t ér r r st ss st t tt rr r s é s r t r t ré ù t t s s rr rs tr sèq s rt ss r s t rés t s t été t sé s
35 tr t t t r t r ss t s2st s s t t 2 t 1 s r t r q r ts t r s s t s t r s t r st r s r t ss s r s t t2 t r s t t r t rt ss t t t 1 st st r s s t r ss s t 3 t t r r t t t s 2 r s st t st r r rs t r r s r t r t 2 t t s sts s t r r r r r t r s t r s t t 1 t r r t r r s r s2st t s t s r t t s s2st s s t s t t t rt r s t t t r r t t t t t r ss s 2 t s r s s rt t r s t t s t t r t s r s r r r r t r 3 r rs t s t st t t rt r q r s t t tr t s s r t t s t s t st t t t r s 2 r s s s r t t t t r t t r t 2 r r s t r 2 t s ts t r s t t rt r 1 st t r s r t t r s r ss r t t s r t t r r q r ts rst rs 2q st s r tt r s t r t s t 2 s r t t r s s 2 s s rs s r r s t s t 2 s sts t t rs r s st t t s r q r s r s t s r t s tt t t r rt r s t 2 t r s t s t r 2 s s t s sts t r 3 t s r s r t t r t r t s 2 t r s t t s r s t r s t rs t t t s r t r q 2 t s r r t s rt t t t t t t r s t t s s 2 q s t t s t r s t s r t r s s 1 t 2 t t s r q 2 r t s r s s s t st s t r t t r t t r q r ts r t r r t r ss r t r t s s r t 2 r t s t rr rs t t t t t s s t s r t s r s tr ts s t 2 r t r t2 t r s t t s2st s rs r s 2 s 2 r s t t rs s s s t t t r s t t r s
36 t t s rt ss s t r t r 2 tr t t t r t r s s t rr r r s t t t t t s rr r r s s t t t r q 2 t s r r t s s s s r2 t tr t r t r t s t r t r q r s t t st t s s t r r t r s st t t s r t q s r r s t r t t s rr r s t r r t rr t rs r s ts r t t s t t s sts t r t t t s r ts ss t rs t t s rr r s s t t r t t s r t t t s r2 r s r s s t r s t s rr r t r s r st 2 t r t2 t rt r r t s r s s r r t s t 2 2 t t s s s t t r r t t q s r t s t rr r s t s s r r t 90 r t r q s t 3 t 94 t r q s r2 t q s r ss t s r s t r s s rst t s rr r s t t r q 2 t t s t rr r r t s s ts r r t t t rr r s q t 2 t r t s t r q r s r s t s r 3 t t r tr t t t t r t t s s s r 3 s s t r 1 s rts t s r t t rt ts t r t r r s t s t r s s r t2 r r t s t t st s t r t t r r r r q r ts r s t 1 s t r t t r s t r rs s r t st s r s t t st s s t t r t t tr s r s 1 t r t str ts r s s t r t t r r s r t 2 t r q r s t s t r2 s r s t r s st t t r r t r t s t t s t t r r t t r s r s t t s s r t t s t r rr rs s t s t s t rr rs t t rr r t t t s r s t s r t 2 t s s t t r q 2 s tt r 2s s s t q t 2 t r t t t t t r q 2 r rr r st s s t s t t q t 2 t r t t r s s t s t r t s rr r r r t t r s s r t rr r 2s s t r s r 1 st r t t q s r t s t rr r rst t t r r 3 t s r s r t t 1 st s t s r t t q s st t rr t r tr t t s t r r r r s s r t t r t t rr t t rs s 2 r 1 t t t s r s r s ts r
37 t st t t st r 2 t t s r s t 1tr t t rst s s t s s t r 1 st rr rs t t t q s r t t r r s r r s t 2 t st s s t ts t ss t2 s ss t r r r t s r t s r rr r st t t r 1 s s t r s s t r t s t rr r st t t rt r r t t t r s s t s t s r s t s r r s t t t s tr t s tt r r r t r st ss t r s t s t s r r s r ts s s sts t s tr s rr rs 2 t st t r t s rs t s r t r t tr t s tr t s t s r r r s [Conf1] P s r 2s P s P 2 r 1tr t q r t s t rr r t r t r t [Conf2] r P s r 2s P r P 2 t t q r t s t s s r ts r t r t 2st s [Conf 3] P r 2s P r2 P 2 r t2 s t r t s s t s s t t r s t t s st rs [P resentation1] s t rr r st t t r t t rt r Pr s t t P r é t [P oster1] t s t rr r t r P st r P t rs 2 [P oster2] t r t s r t t r s rt ss rs q r q s t s r r s P st r r s P s r 2s P s P 2 r 1tr t q r t s t rr r t r r r r r t
38 tr t
39 tr s t t t rt rs tr t r t t r ss t s r s t t t tr s t r s t r t s r s s s t r2 t t rts s r t t t t t rt r s t t r t t t r s t s 2 t st t s s t s rt t t r t t 2 tr 2 rs t str2 s s st t 2 s t r s s rr t t tr t t tr rst t tr r r s t 2 r s rs t r t t t t r t s2st s s 2 t 2 r 2 s t s s r s t t s t r t s t t t r st r t t r s t t s t r t t s s t r s r 3 s t 1 s r t s t rt t t s s t t s t r tr2 s q t 3 t t t r r s t rt r r t r 3 t t t r s s t s s t t t r t st 2 s t t rt rs s r s t s P t r s r 2 t st t t rt s r r t t r t q t t t r s t r r r t t t t tr t s r s t r ss t s 1 s t t t t s s t s r 2 t r t t t s ts t s s t r s r s t r t t r s t t t r r r t r s r r s rt r 2 r r t t r s t s st 2 t r t s 2 r 3 t rt rs 2 t s r s ts t 2 ts t s r t t r t r r r t t s t t t rt rs rt rs t t rt r tr s r s t x(t) t t s y[nt s ] t rst s s t t 1 s t rt r t t s r s s
40 s t t t rt rs s s s r t q t 3 t rt r s t t r t 3 s ss r ss s str t t s 1 r t t rt r s t 3 t r s q t 3 r r s x a (t) x s (KT) x q [k] t 0 T 2T 3T... t 0 t i) ii) iii) r s s t 3 s r r t s 2 s t r t s s t r r T/2 t t s s t r t T/2 r s t t rs r ts t s s r r t t s t s S r t r t C s t rs s r tr s r st rts t s t s r t t s t s r s t s t t r t r s r tr s rr r C s t r t C f t rs r t r T/2 2t 2 t t s t s s t 2 t tr s s 2 2 T t s s s x s (t) = + k= x(t)δ(t kt). s s q t t t s tr s r t r F s = 1/T s s X s (ω) = 1 + T k= X ( ω k T ).
41 r r t x(t) Time domain Frequency domain X(f) 0 t i) X multiplication δ Ts (t) 0 f max f iv) convolution δ Ts (f) 1 0 ii) t - f max 0 f max v) x s (k T) X s (f)t 0 iii) - f max v) f max f r s s t r q 2 s t 2 B t t t s s rs r t r s t r s t s q t 2 t t s t r str t s s
42 s t t t rt rs str t r B > f s /2 r t s r t s t r s r t s r r s r t t s tr t 3 t r r t tr t t s s t t s r t 3 t t t s s r q r t s s q t 3 t s s s r 1 t 2 t r t r ts t t r r s ts t t rr s s t t r s t t r r t s r s t 2 N t t t r 1 t s t t 2 N ss q t 3 s str t s t r t r st t t t t r V FS t s t r r s ts t 2 r t t s t r s t s s 2 s t r s t t t s r 2 t q t 3 t st s q t V FS 2 N 1 r r s t t st s t t t r 1 t t s r t s q t 3 t rr r s tt r r r s ts t r t t t r t r st t q t 3 t r t r st q t 3 t rr r t rs s t s r t t t s tr t t s rr r t t s t 2 t s t s r t 2 s r s t t t t r t s P s s t q t A 2 /2 r t q t 3 t s t r r r s ts t r t r q t 3 t rr r s t s P noise = LSB/2 LSB/2 1 LSB e2 de = LSB2 de 12 r LSB = V FS 2 N s ss s s rt s t2 r t t 1 t r s s 2 P noise = 1 f s B 2 B 2 LSB 2 df 12 P noise = B f s LSB 2 12
43 Output Codes LSB= V FS 2 N V 1 V 2 V 3 V 4 V 5 V 6 V 7 Input Voltage e q V FS LSB/2 -LSB/2 Input Voltage r t 3 r t r t r st q t 3 t rr r r t r t fs B s t rs r t s t s t s t s r t s 2 SNR = P signal P noise t r s t s t 1 r ss t q t 3 t 2 t 2 1 r ss s SQNR(dB) = 6.02N Log(OSR) r N s t r ts t s 1 r ss t t t t t t s A s q t V FS /2 r r r 2q st rt rs t s q t s t t r t t t s r 2 6
44 s t t t rt rs rs s t s s s q t 3 t s t t s t t s t r t t s t s2st r r s t s s st r 2 2 r r r rst s st t s t s t s t t t s r q 2 t s r t s r t t s 2s s r ts rt ss r s t s r r t r st t r r t t t s s s st s s t r r s t t s t t s t s t t s t s s t rr r s rr r r t r t2 t r r t2 t r t r 2 t rt r s t rr r s t rr r s r t t tt t t r t r st r t t s rr r s t t t s s s t r s s s s rr r s s s rr r s t rr r s r t s sts r s t t t r r t r st P s t s t r t tr s r t s s s 2 r s t r t t t t r s t rr r rr r r t2 2 t s t r t t s ss s s t s r t r t2 s r s t t t r t t s ss t t s r t s s s s t r st t rr r s r s 1 r ss
45 s DNL = V n+1 V n LSB 1. s t t rr r s t ss t t r t ss s r r t r t2 t r r t2 t r r t2 s s t t r t t s sts t t t tr s r t r t r t r st t 1 r ss s INL = V n+1 V 0 LSB IdealCharacteristic. s s s r t t t t t t r t r t t r 2 t 1 t s t s s t t t s t ss t t r t r t2 2 s t s st t t s s r r r t rt r s 2 r t r q s 2 r r s r t t r q 2 r t s s r t t t s r t st rt t 2 t s t s s t q t 3 t s t r tr t rs t r t s r t r s 1/f s tt r r s s t t r r ts t r s s r t s t s t s st t t rs r t s s s t t t t r s r s PSD Thermal = K boltt (o) C
46 s t t t rt rs s q t t2 s st r r t s r r r r t r t t r t r s s t 2 rt r r t s t 1 t t t r t t r s r r t t r t t q t t r r t 1 r ss r s r s s r s t t rs tr s s t s r s s r s st t t s r s s t r r q s r s t s s t r r r q s t t t t s t r q s tt r s s s t r t 2 t 1 t r t s s T r st t st t rs r t s s s tt r s t s r 2 s ss r ss t 3 r r s σ jitter s r t tt r 1 r ss s PSD jitter = 2πf in σ jitter r f in s t t r q 2 t s 1 r ss t t t s r tt r t 2 t r 1 r ss t t rr rs s SNR = P signal P Quantization +P Thermal +P jitter. t s st rt t s t t t t t2 s st rt s r s s s t s r t t r ts s t t r s t t ENOB(bits) = SNDR db
47 t r st rt r r s s t2 t t r t r st t t s s t t s t s x(t) = sin(ω in t) s s r s r s t t a 1 x(t)+a 2 x(t) 2 +a 3 x(t) = A 1 sin(ω in t)+a 2 sin(2ω in t)+a 3 sin(3ω in t)+... s q t 2 t t s r t kf in k {2,3,...} s s r t s r r s t t s r s 2 r r t q t 2 t t t r s t r r s t 1 r ss 2 + k=2 THD = A2 k Fundamental. s 1 r ss s s 2 t rt r t r ts t r t r 2 t t rst r s t t t r s r 2 t s s t s r t t st rt t s t t t t s 2 t r t t t t 1 s r t 2q st 3 SFDR(dB) = 20Log 10 A fundamental A spurmax. t t s tr s s t 2 A 0 t t s t rr r A k k {2,3,...} t r s t s 2 Spur t t t st t t s 1 s t t t t r 2 s t s t t t t s tr r s r t t r s r r s t r t t rt r t r s s t s rt ss t r t t r tr t s r t rs t
48 s t t t rt rs V in < 0,125V ref 0,125V ref < V in < 0,250V ref 0,250V ref < V in < 0,375V ref 0,375V ref < V in < 0,500V ref 0,500V ref < V in < 0,625V ref 0,625V ref < V in < 0,750V ref 0,750V ref < V in < 0,875V ref V in > 0.875V ref ts s tr t t t t t t r r r r t s s t s t t r r r r t t r s t r t s rst t r2 s t t t r 2q st rt rs t s P ss r 1 t rt rs s t r2 r s t rs rt rs t rt r 2q st s s rt rs s s r t st st 2 t rt s t t s r s t r t s r q r r2 r t r s rt rs s t r r t 2 r s t q t 1 s s ts t t r q 2 t s s s t q s t s t t t r r r ss s s s s s t2 s r s n t t t s rt r r q r s 2 n 1 r t rs 2 n r s st rs r r s r V ref r t s t 2 n 1 r r s s 2 t r t rs t r t s t s r t r s t t s s t t r t r t s s r t r r s r t t r r ss t ts s s s t r t r r s ts t t t s t r t rs r t r t s s r2 st t rs s 2 r t t s s 2 t t t s t s t s t r t rs t s rt r s s r r t rs r r q r t t rs t r rts t r t rs t ts t r2 s s s r r t s r s t t s rt rs r q r r r r t rs t t st r 2 t t s r t r t2 t r t t r s t r t r t rs t t r s s 1 t 2 t t r s t t r s t s 3 t r t t t st s t s 3 t r r tr2 s ss r 1 t st r s 2 r t t r r t r s t t s t s r t ts r s
49 V ref R + 7/8 V ref _ W 7 3/4 V ref R + _ W 6 5/8 V ref R + _ W 5 MSB 1/2 V ref R + _ W 4 Encoder 3/8 V ref R + _ W 3 LSB 1/4 V ref R + _ W 2 Analog Input 1/8 R V ref R + _ W 1 3 bit ADC V in r ts s r s t rt rs r s 2 s r t s q s t str tr s rt tt r2 r str ts rt r t 2 s s s r t r r 2 2 s t rs s s s r st r r s r2 t t t t rt r 2 tr2 s ts st rt t t st s t t s t t r t t t r ss t r st r t rs t r t r s t t t s t r2 t s ss r r t r t t s t r s s t t r 1 t s t t s rst r s V ref /2 r r s ts t st s t t t s s s r t t t s t 1/2 s s r t t st s t t s s t t t r s t s r t s q t r st r s ts t 1t t t r ts t r ss s s r s st s s r t n t s s s ss 2 s r ts r2 r r ss t t s r r s t n s tt t r s t r t t r s t t t r r 2 2 s r
50 s t t t rt rs Clock SAR Output D N-1 D N-2 D 2 D 1 D 0 V REF DAC Comparator + V IN S/H _ r ss r 1 t r t t r s t rt t n t rt r n r 1 t s r s s st r r s r r t 2 r s rt r r t s r s rt rs r r t s t r s s r s t t s r r t s t st r t t t t s t t s t t s s 2 t 2 t s tt t t st s tt t t t r s t t r rt r s s t r 2 t rs s 2 t r 2 t P s P r t t r t 2 r s t t t s t s r t t r rt r s t rs t s t s r s t st s t s sts s r t m t s s 2 s m t rt r s s tr t t r r t t t t t 2 t t rt r rst t s t rst st r q r s t t s t t s rt r rts t s s t t t rs r s t r s t st s t ts t t t t s s t t t s s t t m t t t rt r ts t t s s tr t r t r s s r s s s t s t t t 1t st t t s rt s t s t rst st s r ss s r t t r s 2 st s r ss r2 t t s r n r s t r t t r s s r r t t t st t r 1 t q t 3 t r 2 s t s t s 2 r t t t st r s t s r s 2 t s q t 3 t t s t t s r r t r t t t t t ts r t st s r s t t rr t r tr2 s sts t r r 2 2 st s t ts t r t t r t t r t r t s t t r t st s s t r r st s r 1 t 2 r t r s t t r t t r t t r s t t t r 2 r q r ts r t tt r st s r r t 2 r 1 r t t rst st s t ss t
51 r t t t r s t INPUT SAMPLING STAGE 1 STAGE 2... STAGE N 1.5-b 1.5-b 2-b DIGITAL CORRECTION DIGITAL OUTPUT VOUT VIN SHA + - x2 VOUT VREF/4 VIN ADC 1.5-b DAC MDAC -VREF/4 r 2 t t r st P r t t r s t r s s t t s r rr rs t s 2 s r t s s t s t s r r s s r t 2 2 t r t s t r s t t r s 3 t r r s s t r s t rs ss t t r s r t rs t r s r s rr rs r s t rr rs s r r t r rr r s r 2 t 2 s r t t q s rs s rs s t st 2 t r r s t r t t r t rs t s s t s t q t r 2 t t r s t r r2 t s r t r q 2 r r t rs s t 2 t t s t r q 2 s t r t 2 t r t s r s t s t t r t s r s t rt rs r s 2 s t r t s r q r tr t s r s t 2 rs s s s str t t s r t rt r s sts t Σ t r 2 t t t r t r s s s t t s t r t r t t 2q st r q 2 2 t rs r t t t t s t r s tr t r t t s r s t t s tr t s t t r t r t 2 q t 3 2 rs q t 3 t s s ss t r t s r s t r q s s r ss s q t 3 t s s r r t r t2 s rr rs r t r t r t r s s s rt 2 r 2 t t r r t s s t t r t t t t t rt r s s rst r r Σ t r s t s s 2 t r t r r s t r s s 2 t r r2 t s r q 2 s t t t s s t t r s t s t t st t 2 r t r t rs t t r r t t r r s s t str t s s t t r
52 s t t t rt rs r rst r r Σ t r s t t r r r t t r 2 st t s s s t s r r s t t r t rs r r s t s r r s t t t r s r s 2 r s t r s t t q t 3 r r r t2 rr rs t t t r r t t 2 s t rr rs s r r s r t t q s s s s 2 s t t r st s t r t r t s t q s t t s t t t t r t ts t r r s t t s t r t s r t t r s s s t s t rt r t s r r s r r s 2 r s t t t t rt r t q r s s t t r t s 1 t s s t t r s 2s t r r s s t t rt r r t t r s r t 2 r s t s r r q r ts t 2 t t s st r s ss t2 t r t s r r ts s t s r s t ttr t 2 t r s t rs r t s s t t t r t q s r t t r t s s t t s r r s r t s t 2 t t t t t t 1 r t 2 r t t t t str t s t t t t t r s r s r t s t f s r f s s t t t s r q 2 r t t t t r rt r s s t t s s q t t s t t t s
53 r s r t s r q r t s t r 1 2 t t r t r t r s t t t s s s t t t rt s r q 2 t 2 t t s s r t s 1 t 2 s s r t s t t t t r r t t r r t r s t t r s t s t s s t t t t r 2 Analog input x(t) x[n] CLK 0 ( =0x2 /M) M s /M ADC 0 z -1 z -1 CLK 1 ( =1x2 /M) M CLK M-1 ( =(M-1)x2 /M) s /M ADC 1 s /M MULTIPLEXER s Digital output y[n] Power power M ADC M-1 Single channel M channels Linear dependence Exponential dependence 125Msps 250Msps op fs s r t r t t rt r r r t t t r rt r s rs t 2 t r 2 t t t r r t rr rs s 2 t s t t t s s 2 r t r t t st r r ts t t r r t s rr rs s t rr rs st s t t s t r t 2 r t t r2 t s r r s r t q s t r t t t t r rst s s t rr r r 2 r t r s s rr rs r r r t s t t r str t t t r t t r s st t t q t r t s r s t s s t s r t s 2 s t t r s t t s t s r t r r r s rts t r t r r
54 s t t t rt rs r 2 s s r t q s t s sts s s r 2 s t s s r t r 2 t t r r t s t q t s r s t s t s r s t r s t r t s s t ss st s s r t s t rr rs s t s t r t r st r2 r s r ss t s r s s ss t s t s t q s r r s r s s t r 2q st rs rt rs s t r r r s t t s t 2 r s t r r r r r t t r t t t t r rs s r s t t s t r s t s r t t r t r s t str t s t st t t rt r t t r t r t t r rs s r s s t t t r r s rt r t st t t rt r rt rs tr r t s r 2 r t t rt rs s r 3 s t t r t s t r t r t r r rt rs s r t r s s t t r t t r rs s 2 r r tr t t r s t t r s t s s s t r s t t r t t r s t t t r t t t rt r r s r t s s r r r r r2 s r t t s r 3 3
55 t r t r s t tt s t t s s r 2 r t s r q r r r s t t s rt r s s 2 s st t t st t t tr t s t s P s s r r r t r t r r s t s r t ts t t r rt r r ss t 2 r t r2 s t t st t r s t r t r t t r s r s t s s ss t r r st t st t s t 2 r s t ss t q r r t r t r ss t r t r t2 t 1 t rst r ts t t t s r s t 3 t s s r rt rs t r s tr t r r t r s t r t t 3 r t t r r t t r s tt r r s t r2 s s t t st r s t s r r t t r s s t s 2 t r s t t 3 t s r2 t q s s r rs r t t r s t t rt r s r s t r t s r q r r2 r s t s t t r s s t tr t s r s t st s s r t s r t t r t s t t r s r t t rs t r t t r s r r t t s r q r ts t r r s 1 t s t rt r r s t r t t s r t t r t t r s r s t s r t tr t r t r t t r s s r r t s r r s r r t r s r s t s t s P t s t s t t t rt rs r s r t s 2s s s t r t t r s tt r s t r s st t t t r s t s r s t t r r t t r s s2 2 r r t r s r q 2 t t r s t r s t ts t t t r r t t r s r t s t s rt t t t t t t s t rr rs r r t t r st rt rs s r t r r s r r s t t s 2 t r t t s s s s r t t s s r t s r r t s t t t r rt rs t r r s t s
56 s t t t rt rs r t t t rt r r s r t r s P r r t t r s t s r r t r r t t t r s t r r r t t r s r t t s t r s r s t s ss r2 rst r t s r 2 s t r st r r t r r t 3 t s s t t r s r s t s P t P r s t r r s ts rt t t r r t t r t st 2 s s t t r r t t s t t r st r t t r s r t t r r t s 2 s s FOM = P diss (2 ENOB.f s ). r s t t r ts f s t 2q st r q 2 P diss s t r ss t r r t t s t r 2 t r s t s s s r s t t r t s s r r t r r r t t t r s t rt rs r r ts t r r s t r t P Σ rt rs rt r r t s s t t Σ r s ts t st tr t s r s t s t tst r t t r s s s st r t t r s r t t r t r t t r r s ts t st r r s t r s s r q 2 r r r s t
57 r s r r t r s t t r r t r s t r Pr ss s P r s s 3 st P P P P P r r s t r r t t r t r r r ss 2 t r s t t t r s s r r Σ rt rs t s t r r ts r t rs r t t r r t r t s rt rs s r s t
58 s t t t rt rs r ss s st t t r r r q r ts st t r ss s2st s r r 1 tr s tt r 1 t s r t t r r r t t r s r s2st s t r ss t s2st s s t t t 1 t tr s r r t t r s r r t r ss r t st r s s s rt r 2 r t s st t t s r t 2 t st s s t s s s s st t tr s r t r r r s ts t r r r t s r t s st t t s t r 2 t s r t r t t t 1 r s ts t s t r r q s r r t t 3 2 t tr t 2 t t s r ss t r s t r2 s r t t r s r r t r t t t 2 r t s tt r s t st str t t t t r t rr rs st r s t s t s t rt r s s s ss t t t r r t r 3 t st r r r r s t r r t t s t s t s s t t s q t 2 r s s t s t st t r 2 r r r r s ts t tr s tt r rt r r s t s st t tr s r t t rt P rst rs t t s ss r2 t s t s t r t s s s s t t r r q s s t 1 rs r t t st r r t t r s t r s s t t r st r t r q ts t t r s s st t s s r q ts t tr s tt s s t r t s r s s t
59 2 P r t rs t s 2 f s r q 2 s s P r r s t s r t f in = 10MHz 73 f in = 380MHz 71 r s r 2 f in = 10MHz 94 f in = 380MHz 90 P r s t P r P r s t < 650 s t s r s st t t A in = 1dBFS tt r s t st rts t s s t s 3 s ss t rs t st t r tr t t s s tt r s 2 t r r P r r t s str s t t t t t r t r t r t tt t s t t t s r s r tt t r rs rt ss t t s s t P s s t r t ts r r st rts t s r t s s r t s t t t t t r q 2 r s s t rr r s s t s t s r s t r 2 t tr s ss s 3 t t t s s r r t t t t r t t r r r t2 t r s r r t t r t t t tr s ss t st r s r P r q r ts ttr t r tt t r r t r t t s r r 2 r r s r ss t s r t st r t q s s sts s t r st rt P t s sts r st rt t s t t r t s r s t t t t P t t r r t t t s t s t t t t P s t rt s s s t t s 2 t r s s r s t s 2 r s s t t t 3 s r s t t s t t r r rs r t r t2 r r t P r t st r s tr s tt rs t s t r t st r t t r 2 t rt r s t 3 t rr r t t s t tr s tt s r t s r s s s r s t rt rs r t r s t s t s t t r s r t 2 t r q r ts t r s s t tr s r s s t s t s t t t r t t s t s s t 2 t t 1 st r ts t r t r s r s r r s t t r t s t r s rs s t r s t s t r r r 2s s s r q t 3 t t t s t t s t t r t r t t t r s r r t s t s t r t t r r r
60 s t t t rt rs r r s r t r t t t 1 st t t r s t r s rs s r s r r s t 2q st s s rs s t rs s r s t 2 t Σ rt r r r 2s s s r r t t r t r t tr s t r r t t t t t t r t s t s t s r 2 t s r t t r s s r t st s s t t s s r t st st r t t r t s t r s t t 1 t r t t r t rs r t t r s t 2 r s 2 s r t t r s s s r st s t r t r s t t r ss t t s t r s t s r t t r s r s t r t t r s s t r t s t t r2 r s t t t s r t s r t t r st r s r s t s s s s st s r 1 2 t s t st r r t t s t t r2 r t t t t rs r t r t s r s t t r r t t r s r s r r t r t2 t r t s t s s t t t t r s t st r s st t t t r s t t r t t r s r t s t r s r t s tt r r s ts s r s t r t r t s t t rs t t r r t t r s s r st 2 r t t q s r r s t t t r t t t s t s r t t r
61 tr t r s tr t r r t r s t s r t t t rt r 2 rt r ss t 2 t t s t t r t t rt r s r s s r str t r r r s s ss 2 s t t s t s s s 2 2 r t t t t s s r 2 t r t r str t t s str t r t t t r s r t s t 2 t r s s ts t t t tr s2st s s s r r r t t r rs s st t r rs s s tr t t s r t t r s str t r s r r r t t t s s r t ω s /M r ω s s t r s r q 2 rt r s s t t s r MT/2 = 2π/ω s.m/2 t s s s r t 1t (M/2 1)T r s t r s r t 1t r t s t s 2 s t t t s r t s st ts rt ss s t s r MT t t r s2st s 2 t r s t s r t t r t 2 s r ts 2 t r str t t t t s t t t t r t ω s r r r r t r st s r r t t s t t t r r t t r t r t rr rs r t t r t r r t s s s t r t r s t r s s t s t t s s q t 2 t s s t rr rs r t s r s tr ts s t 2 r t r r s t s2st s s t t s t r s s rst t t t r r t t r s r s t t 2t 1 r ss s r 1 s t r q 2 s r t r t r t s t s r s t t t t r r s r r s q t s rr rs s 1 r ss t s s t s t rr rs r t s r t 2 t r t t t t t s tr s str t t s t t t st 2 r r t t s rr rs r t s r s t r 2 s t r t t 1 st s t r ts t t r t r r r st t
62 t r s Analog input x(t) x[n] CLK 0 ( =0x2 /M) M s /M ADC 0 z -1 z -1 CLK 1 ( =1x2 /M) M CLK M-1 ( =(M-1)x2 /M) s /M ADC 1 s /M MULTIPLEXER s Digital output y[n] M ADC M-1 CLK TIADC T*M Ts*M Clk ADC 0 CLK 0 Clk ADC 1 CLK 1 Ts T Clk ADC CLK M-1 M-1 Timing diagram of a TI ADC with M channels r M s t t r s s s s t r t t t t r t r 2 t t s t rr r r r t r 90 s s t i t t t t r r t t r t rr rs s 2 r t r t s s t s t rr r s t r t t s t s r s t st t s t t r s s t rr r t r s t s s st t t t r t r t s r s t rr r t t t r q 2 t t s s r t 2 t t s t s str t s r t r t t t st ts t s s t r s s rr r tr t s s r r q 2 t rr r st rts t t s t s s t s t st rr r r r r s r t q s t r t s r s t s r r t rst t t t s rr rs t t t s 23 t
63 T t i o i x(t) g i y i [k] Switch 'on' o R i o τ i= R i C i C i r i t st rt rr rs s t s t s t r t t t r t r q 2 2s s s t rr s r t s t s tr t s t rr rs s s M s t t r r t t r t r t s rr rs x(t) x[n] CLK 0 (t o ) M CLK 1 (t 1 ) z -1 H τ 0 M. z -1 CLK M-1 (t M-1 ) H τ 1.. g 0 g 1 o 0 o 1 o M-1 ω s /M ADC 0 ω s /M ADC 1 ω s /M MULTIPLEXER y[n] M H τm-1 g M-1 ADC M-1 r t r rt r st rt rr rs s t s t s t rst s r t t t s r s t r st t t t t s
64 t r s 1 i rr s s t t i t i {0;M 1} 1 r rr s s t t r r s t t s r r o i s t rr r t i t g i rr r t i t t i t rr r t i t τ i t st t rr r t i t t t r r τ i = τ r (1 + τi ) t i t t st t τ r t r r t st t τi /τ r r t t st t s t rr r h τi (t) t s r s s t i t t t r H τi (ω) r q 2 r s s t i t t t r r r tr s r h τi (t) δ(x) r str t x(t) t y i i t t t t t s r t s t 2 x(t) t t s t t s 2 y i [k] t i t s t t t s t rr rs r t t t s t 2 y[k] s s rst t s s s tr t t t t r t s r 2q st 3 s r t s s s s t t t B < π/t r r t t r t r t t s t t s tr X(ω) t r s s r t r ω s t t s t t s x(t) r str t s rs t t t t rr rs 1 r ss s x d (t) = + k= x(t)δ(t kt). i t t t t t rr rs t s k 1 r ss s y i [k] = x((km +i)t). s r t rr rs t i t s t t t 1 r ss s y i [k] = g i x ( (km +i)t t i ) hτi (t)+o i.
65 t 1 r ss t i t s 2 s t s s r t t 1 s y i (t) = y i (t) = + k= + k= y i [k]δ(t (km +i)t). r t t t s 2 y(t) = = M 1 i=0 M 1 i=0 y i (t). + k= (g i x(t t i ) h τi (t)+o i )δ(t (km +i)t). ( gi h τi (t) x(t t i )+o i ) } {{ } ˆx i.δ(t (km +i)t) }{{}. s i r ˆx i s 1 t 2 t i t rr rs ŝ i s tr r s s q t 2 t t t s tr s t 2 t t s tr ˆx i s i s S i (e jω ) = 2π + δ ( ω k ω s) e jki 2π M. MT M ˆX i (jω) = g i }{{} Gain k= e jωt i }{{} H i (jω) }{{} Timingskew Bandwidth r t t s tr t 1 r ss s X(jω)+o i δ(ω). }{{} Offset Y(e jω ) = M 1 i=0 1 2π ˆX i (jω)s i (e jω ). 2 t t s Y(e jω ) = M 1 i=0 + k= 1 [ gi.h i (jω).x(jω)e jωt i +o i δ(ω) ] δ(ω k ω s MT M )e jki2π M. t t t r rt s t r s { X(ω) δ(ω ω 0 ) = X(ω ω 0 ) X(ω)δ(ω ω 0 ) = X(ω 0 )δ(ω ω 0 ). t r t t s tr t t rr rs s t t s t s t rr rs s 1 r ss s [ ] Y(e jω ) = 1 + M 1 1 g i H i (j(ω k ω s T M M ))e j(ω kωs M )t i.e jki2π M X(j(ω k ω s M )) k= i= M 1 1 ω o i e jki2π s M δ(ω k T M M ). k= i=0
66 t r s s 1 r ss s s t t t r s t rr rs t t s s t 2 t 1 r ss t r ts s t t s t rr rs s rr rs r t ±ω in +k ωs M r q 2 r ω in s t t r q 2 t 2 t s t s t t s t r s s t s r s t s t k ωs M s s str t r t r s t rts t t rr r t t t s tr s s r s r t t s tr s t rr rs s t s t r 2 4 s r t 2 s s r rr r t t t r r t r st s r t r r r r t s s rr rs s t rs s t r t s 2 s t rr r t t t r s t rr rs t s t s t rr r s t st s s ss t t t s t r t t s t rr rs s t s t s t rr r s s 1 tt r s s2st t t s s t 2 t s t r t t s s s tt r s t t t s t r q 2 s 2 s r 2 s t rr r q t g i = 0,t i = 0 h(t) = δ(t) t i t 1 r ss s s t t t s t rr r s t t t y i [k] = x((km +i)t)+o i. q t s t t t 1 r ss M 1 y(t) = x(t)+ i=0 + k= o i δ(t (km +i)t).
67 t t t s t rr r r t t s s t s s r t r q 2 r q t s 1 r ss s [ ] Y(e jω ) = 1 + X(j(ω k ω M 1 s T M )) 1 e jki2π M M k= T k= i=0 M 1 1 ω o i e jki2π s M δ(ω k M M ). t r t t t s t t s r s i=0 M 1 1 { e jki2π M 1 k = 0[M] = M 0 t r s i=0 t t q t s Y(e jω ) 1 T + k= X(j(ω kω s ))+ 1 T + M 1 1 M k= i=0 }{{} A offset o i.e jki2π M δ(ω k ω s M ) r t s q t t s s r s t s r t t ω s /M t s rt t t t t t t s tr s r s r t s t t t s t s t rr r π < ω in T < π r s A offset t 1 r ss s A offset = 1 2T (o 0 +o 1 )δ(ω)+ 1 2T (o 0 o 1 ) { δ(ω ω s 2 )+δ(ω + ω s 2 )} t t s t s t rr r s str t r s t s r s t rr r t t s t t t r q 2 r r s ts t s t rr r t t t st t
68 t r s t rr r t s tr s s t t t s t ω s /2 t s s s t t s t rr rs s 1 r s 2 s q t 2 t s t r s t r r t r rt r t r s t t s r st rt t s s rr r s t t t s s t st t r r ss t t r q 2 t t t t s s t rr r rs s r t t t r t r st r t s s rr r 2 r s ts r t s t rs s t t s t t r r tr2 s rr r s s r s st t s t s t r t ts t 2 r t t s t t r r t t r s t s sts t r t t s rr rs s r t t 2 rr r s r s t t i t r t t r tr t s o i = 0,t i = 0 h τi (t) = δ(t) q t s y(t) = M 1 i=0 y i (t) = M 1 i=0 + k= g i x(t)δ ( t (km +i)t ). s q t s s t t t s s t 2 t t t s rr rs s s q t s s t s r s r s t s r t s tr t 2 t t r q 2 r t r t2 r r t q t s s t t t t t s r r s t t ±ω in + k ωs M t t t s t t s s t r k = 0 s t 2 t rr rs s t t t s r r t 2 t 2 t t t s r q 2 s r Y(e jω ) = 1 T + k= [ 1 M M 1 i=0 g i e jki2π M ] X ( j(ω k ω s M )). r str t s t 1 t s t t r s s t t t t rr r t t s s t t s t s tr r t t r s t s t s t 2 s r t t s X(ω) r π < ω in T < π r s t q t s Y(e jω ) = 1 2T + 1 2T [ ] g0 +g 1 X(jω) }{{} Input gain [ g0 g 1 ] }{{} spur gain { δ(j(ω ω s 2 ))+δ(j(ω + ω s 2 )) }. s t ( ) g0 g 1 SFDR(dB) = 20Log10. g 0 +g 1
69 r rr r s t t t t t r q 2 s s t t t r q r r s t t 100 s t 0.002% r r t s rt t t t t t t s t t t s t r q 2 t r r tr t s 2 2 t r s t r s t t t s r t t r t ss t 0.001% rr s t r r t s t r rr r s t r rs s s t rr r t t s t q t t r t tr t r t s t rr r s t r t t r r s t s t r r s r s s t 2
70 t r s r t t t s t t s t t s r r t r 3 t rr r t t t s t t r t t r s t s r s r 3 r t r ss r t s s s t t s r t t s s s t t t t s q t 0 s t t r r r t t r t r s 25 o C t s s r q t r s t t s t str t s s t t t s t s t 0.88% r 1σ t t t rr r t r r s s t s t 2.64% s r t t r r s t s t r str t t t s s 2 r r s r t s s 2 s r t s r r t t s r rr r s r s st t rr r s t r t t s r s t s 1 s t t t s t r t s rr r t t t rr r 1tr t s t t r t r r s s t s s t s s s r s t rr r s st t t t s r t r t 2 t r t s s 2 2 tr t rs s s r t r t t t r t r r t t r t 2 t s t r s t s t t rs t t r r t t r s 2 r t 2 t r ss r t r t s s q t 2 t s r t s s t rr r t t r t t t t tt r s t s s t s s ss str t t s st ts s s r r t str t t t t s s t t r r s t
71 r t t r s t rr rs s s t t t i t s t 2 t i r t (km +i)t t st t s 1 r ss s r P r r rs s s rr r y i [k] = x((km +i)t t i ). s t r t t t r t s y(t) = = M 1 i=0 M 1 i=0 y i (t) + k= x(t t i )δ(t (km +i)t). s t r s t s t s t s t rr r rs t t t s s t s s r t r t r q 2 tr s r s r t t s r r t 2 t s t rr r t ±ω in + k ωs M r t r t2 r r s t t r r s s t t t s rr r t t r q 2 s t t s s t t t s s s s t s2st t t t r st rr r rs t t s s t r st s r t r r ss s 3 r rr s s t s t P s t t rr r s s r r t t 3 r r ss s t r M/fs r s t r s s s t s r q 2 t r q 2 s t t s t s t s rr r rs t ±ω in + k ωs M r r t
72 t r s r s t t s t s t t t s tr s [ ] Y(e jω ) = 1 + M 1 1 e j(ω kωs M )t i e jki2π M X(j(ω k ω s T M M )). k= i=0 r t t t t s s t rr r s t 2 s r s rr r t t t t r q 2 r t t s X(ω) r π < ω in T < π r s t q t s Y(e jω ) = 1 2T + 1 2T + 1 2T [ e jωt 0 +e jωt 1 ] X(jω) [ e j(ω ωs M )t 0 e j(ω ωs M )t 1 [ e j(ω+ωs M )t 0 e j(ω+ωs M )t 1 ] ] δ(j(ω ω s 2 )) δ(j(ω + ω s )). 2 2 ss t t t t s t rr r s s 1 r ss s [ ωin ] SFDR(dB) = 20Log 10 2 (t 0 t 1 ) s s t r t t t t t r q 2 rs s t s t t t SFDR t s r s t s t 3 t r q 2 t rr r r s s r t s rt ss s rt r r t tr t s r 2 r t ss t s 2 s r t s t t s rr r r t r s s t s 2 t t t r rr rs s 2 t s t rr r t s t t t t s t rr r ts t r r t t s s t 1 st s t s t s t s t s t t rs s t t t r s s r t r t s s t t s t s t r t s s s r s st
73 r P r r rs s s rr r t t 3 t s tt t r t t st t s s t t s t r ts q t ss t r R i t s t q t r s st t i t s s t s t t t t st t t t r s τ i = R i C i t s r t t t t t t t t r s s tt t t t s s 2 t r q s s 2 t 2s s t s ss t t t r s st t s t s st t r t r ts q t ss t r t s t s r On r t 2 t tr s t s r t t s t s s t t r s st R s s t s t s tr s r s t rt t t t s tr t s r t s s s t s r 2 2 tstr t q s r r ss t t t r s st s r 1 t 2 st t s t t r2 r s st r t t t t r t t s t t t r t i t s r 2 t q t dy i (t) x(t) = y i (t)+τ i. dt
74 t r s t t t t 1 r ss s y i (t) = h i (t) x(t). r h i s t s r s s t t s t t t r y i (t) r r s ts t t s r r s t t t s r t t t t s 1 s r ts t t r r t t r r rst ss rst r r t t r r tr s r t t i t t t r tt s 1 H i (jω) = 1+jωτ i 1 = 1+(ωτi ) 2 arctan(ωτ i). t t r r t t r t R C 2 r r s t r t t t r t r t s t t r r ss r r t s r t s t s t s t rr r ts t t s t s s q t 2 r s t r t2 t r rt r r r t t t t t t s t t t t t s tr s t t t s rr r t r r s t s rst r t t r rr rs s t t s t s tt r t r r s t t t r r r r t r q t t t t t 1 r ss s y(t) = M 1 i=0 y i (t) = M 1 i=0 + k= h τi (t) x(t)δ(t (km +i)t) t t t s t rr r t t s tr s 2 [ ] Y(e jω ) = 1 + M 1 1 H i (j(ω k ω s T M M ))e jki2π M X(j(ω k ω s M )) k= i=0 }{{} Bandwidth mismatch q t s s t t t t s t r t s s r t s r s t s t ±ω in +k ωs 2 r t s s t t s r r t s tt r t t r q 2 rr r t s s r t s s t r str t s t tt t s 2 t t t rs r s s t t t s t rr r s s t s t s r r s ts t t t s tr t t t t r r t str t t t t t s t st t t r s t t t s t s t 2t 1 r ss t r t s s 2 [ ] H0 (jω) H 1 (jω) SFDR = 20Log 10. H 0 (jω)+h 1 (jω) t s t t t t r q 2 rs s t t s t s r s s r r t r q 2 s 2 r r t s t s
75 r t t t s t rr r t t t t r q 2 s r P r r rs s t s t rr r t s t q t t r t s t s 2 rst t t t r r t t t t s t t t s t r s t r s t r s s t t rr r s t 0.8% t t s s t t t r ts s s s 3 r s r t r s t ss t2 t s t t s rr r t t t r r s s r r r2 r q s r t s t s t s r t t s s r r t r q s t 3 rr s s t ω in /ω c q t t 2 t t t t t s t r t t s r 1 t 2 3 s s 1 s q t 2 r r t r t t s t rr r s t ss t 0.02%
76 t r s r t t str t s s t q t t t t s r P r r t t s t s s t t t r r r t t rr rs r r t t t t s t t t s t s 2 r r t t s t st s r t r t t t t t t s t 1 t t s t rs t k ωs M t rr rs s t s t rr rs t t ±ω in + k ωs M r ω in s t t r q 2 t r r r s r ss t r s t rr r s s2 t s t s t t 2 t rr r t s s r t r rr rs ss t t t s t s rr t t t t s 1 r ss s SFDR(dB) = 20Log 10 [ ] g 0 e j(ω)t 0 H 0 (j(ω)) g 1 e j(ω)t 1 H 1 (j(ω)) g 0 e jωt 0 H0 (jω)+g 1 e jωt. 1 H1 (jω) t rs t t t s 2 s r ts r 400 s r 65 r ss s r r s ts % r t t s r q s s r t t s rr r s t r t r q r r t s s t t t s t s t st % s t r t 40 q t 2 t t s t s r 1 t 2 1% t t s t r t 50 r t t s s t s rt t t t t t t r t s r t r s r t rr rs s r 3 s t r r tr t s r t 2 t 2 t t t t rr rs t 2 s q t t s r t t t s rr rs s t r t r t r t2 t t s rr rs tr t s r r s r t t s rr r 2s r 20 s rr s s t 92 t r rr r s r s t t s t t t
77 rr r rr r t rr r rr r 1% 0.02% 1% r s r t rr rs t t s t rr rs t t s t rr rs r s t s rr t r t 2 r s tr t t s t t s st t rr r t 0.002% r 2 s t r r q t 100 s r s s r t t 2 t s s t t t s r s t t r t t s t t t t t r rr rs s str t t s s t s t t r t s s t 2 t 1tr r P r r rs s t s t rr r r r t st t rr rs r t s rr rs t t s t r s t st t 2 t r t s t rr r r s s r 2 t s t s r s t r s t 0.02% s t 85 st s s rt t 2 r s r ss t r t s t t t r r t r st t t 2 t r t s t s t s t t s rr r r r t t t r t r r s s t q s r r s t r t t s t t r t r 2 r t t s t s s r r s 2 t s s r t r s t t t s t rr r s t ss t 0.02% t r t t r s t s t r s r t rr rs r s s t r t t r t2 r t r 3 2 t 2t 1 r ss s r 1 s t
78 t r s r P r r rs s t s t rr r r r r r s rr r s rr r rr r t rr r rr r 0.002% 0.001% 0.02% rr r s t rr rs s t s t s r s t rr t r q 2 s t str t t t s t t s t t s t t t t s s t rr r s t rr r r t s s r t s t ω s /M r r ss t t r q 2 t t s 2 r t r rr rs t s t r r t s r s r s t s t t t s tr t 2 t t r q 2 t ±ω in +kω s /M t t 2 s r s r t rr rs s r s t t s s t t 2 t s t st rr rs t s t 46 2 s r r t r ts tr t t t s t r s t t t s t s 2 t r t t r t 94 s rr r s t t t s ts r 2 t t t r q 2 r r st t 1 st r s t t tr t t t s t rr r s s t rr r r 2 1tr t r2 t q s r s t st t t s rr r t t t t r rr rs ts 1tr t t t rs s t t s t rr r s t 2 rst 1 s s t t t 3 ts t t t 2 rr t t s t s r 3 t t r t t 1 st rr t t s r r s t r t t 1 st t s r rr r st t r t t 2 1 s r s t t s t rr r 1tr t t r
79 tr t s t rr r r t t t 2 r s tr t t r t s t t t r t r s 1 2 t t t t t s r r r t 2 s r2 t s s s s st t t t r t s s t t t t s s t s s r q 2 t r s rr rs ts s t t t s r r t s rt t t t t t r s r r rr r r t r rr t t r r t q s s t t t s t st r t r t t s t r s ss t r t ss t s t s t r t t q s r r t t r st s t s t rr rs t r t r t rt r r r t s s s 2 2 s r 3 t t q tr t r t t r t t t r t s r s ss t r t t s r s t r t r s t 1 st r 3 t t q s t r ss r t s t t s t rr r 2 t r s t rr r t t s ss t t t t st t t s t rr r t t t r t r s r t 2 st t t st r str t r t s t r t r r rt t 2 r2 t s r s t st t t t s t t t s s st t t q t t q r s s 2 r 1 t s t t r t r t t s r t t t t s s t s t s t rr t s s t s ss t t ss t s t 1tr t t s t rr r t s t t t s rr t s r r s t 1tr t rr r 1 s t r s t t 1 st rr t t s s t t s t s t q s t t t r s 1tr t t t r q s t rr r t t r r t t r s s 2 2 tt r s s s t t tr t s t t r t t s r s t s t t t s tr r r t r t s 2 r t r st
80 t s t rr r r t r 3 t r r t s 2 s sts s r t s r s t s r t t 2 r 3 t s t t t t t t r str ts t r t r r r 3 t t t t s s r s t s sts 2 s s r t t s r 3 t r str t s t t s t s s r t t s t r t t r s t r s t t s s t t t t s r t s t t s s 1 t2 s r r 2 2 t t t s r q r t r 3 t s r s ts t t s t s t s t t t r ts r t s rs t s t s t t s s q t 2 t r s s t r t2 t r t t 2 s2 2 t r r t r 3 t s sts t st t t t r t t r t s r t s t t 1 st s t s r t s t ω s /M s r q 2 s t t t t st t s s t r r s t s s r r str t t r t st ts A B C A B C C B A C B (a) No additional ADC A B C A B C C A B C A A B C A B C A B (a) Single additional ADC r r s q t t t t t
81 s s r 3 t r r t r s t t t t t r r t t r t s r t t r 3 t t t t t rt rs t t t r s t 2 s q r st rs t 2 t t t r r t r st s t r s t s s t s s s t t t s t t 1t t r r 2s t t s s t s r t s s t str t t r r t r st t t t t t t r r s r s t t s r 3 t t st rt t s t s t rr rs r t 2 rt t r s r s s r 2 t s s s r t t t r s s r rr rs r r s t t s 1 t st t s t s s t t 0.1% t s s 0.01% t s t s t s t 0.1% t t r s t r s t r r s t s t t t s tt r t r r s s t s sts t r s 2 t t r t 2 r r s rs s s t t r t r r 3 t t r r 3 t rs r s r r t t
82 t s t rr r r t r s r 3 t t q s t s rs t t s s r t t r rt r t t s rs t s r 2 t s rs s s t t t t rt r s q t 2 t s s r t s r t (M 1)T r s t t t t r r t t r str t s s t r s rs r t r 2 t r t s t r t 2 t t t s f s /2 input f s /2 f s /2 a 1 a 2 a 3 2 channel selection ADC 0 ADC 1 y 1 [n] y 2 [n] Additional sampler Random selection r rs s s t s t r tr s r t t r s s t t r t r s s s s r s 2 S i r i 1,2,3 s t 1 s r r tr s r s r r 2 t H ij s t s r j 1,2 t s t 1 t t rt r rst r s t s s s r t t s s t t s t s s 2 s r s tt r s s t s t t rst t rt t t H 11 s t s t t s t r s t t 1t s r t s t s s t t s s 1t s r s t s t s t s H i2 r r s t s t s r r t s s r 2 t s t T s r s s r t 2 r t s rr t 2 t r s s r r r s t r s 1 1 t r s r s t t r s t s q s t s t s s r t s t r s t t r t r st s r s t s r s t t s r 3 t t st rt t s t t r t t t s str t r r t t t s t q s t t t t rr rs s 2 s t s t s rs s s t r rr rs r r s t t ts t s s t r q r s
83 DAC12 DAC11 H 12 H 11 S 1 H 12 S 1 DAC22 DAC21 H 11 H 22 H 21 S 2 y 1 S 2 H 22 V in MDAC 1 DAC32 DAC31 H 21 H 32 H 31 S 3 y 2 H 32 MDAC 2 S 3 H 31 r s rs r s s r t t q s 2 t s t q s t r q r r r t r r s t s t r s t 2 2 t s r t t r t s rs t t r t s rs s st s s t 1% s s t t t s tr s t s t t t t 2 t t r s t q s t st s r s t r s t t t s t s t s t r s t q s t t s r s t rr t t t t s t s t 2 r t t r s t t rt r t s s tr t r t r s t r t s rs 2 s r s t t r 3 t s r s t r ss s t s s t rt ss t s t t t s s t r t r s tr r r r t s t r s r t s s t r t 2 t t ts s r str ts t s r 2 s t
84 t s t rr r r t Clk T s S S S H H H 21 5 H 22 2 H 31 7 H 32 4 r s r r t s q r t r r t r r 3 t r s r s ts s t t 2 2 t s r t s r r s t s r ss t s rs s t s s s t 1 r t 2 t r t s r t r s t s s r r t r r s t s s ω c /ω s = 3 str t t 2 t r s s t r s s s t r s t t t r s t s s r s t r s t q s s 1 2 t t t t t s rs rt t s
85 r s t q s t r s t t r s t r t t r r s t s r r t t r s t s ss t t t s r t s r 2 r r t t s t r s s r 2 ts t r s σ tau (%) r t r s t
86 t s t rr r r t s t s s t r s t q s s ss t r t t t s t rr r s t s rs t s r t 2 tt r r t r q 2 t r t t 1 st t s t r s t t s r r s t t r t s s ss t s t rr rs t s t s s t s s t s rr r r t r t s r s t st s t r t t t t r st rt ss t s t s s t r2 s t r t rr rs r 3 r t r t t s t r t q s tr t rt r r 3 t t t t s s 2 t r t t t s t rr r t s r r r t s t t s rr r t t s s s r r 2 rst st t t s rr r t s t r t t t r r t t t t rs t t t rr t s s t r t s r s rst t t t st t s r r 2 t rt t t t s t s s 2 t s t r s s t t t r r r rs t rt r r r s t t t rr t t q s t s t t t t 2 t t r rt r r t st t 1 rr t s s r t s t rr r Bw rr t t rr t t s s t 1 s r t r s t t s 2 rst r t 1 st t q s r r rr r rr t s
87 t rr r t t t s r t 1 st t s t st t t q s r r s t r t t t t t 2 r s t s r s t s r s rr t t s 2 t s t t t s s t t s q s ss t t st t t rr r r r t t q s rr t t q s t t r t r r2 t q s r r s r t s t rr t t r t2 1 t2 r r t t r t r s sts st t t V gs t tstr s t r s s s t t s t r r r2 t r s st t s t r s r t s t t tt r2 r 2 2 t t r r t s 2 t 2s t s r t s t s t t r t 2 s t 3 t s s t s t r r s t s t s t t rr t t q s rst r s rr r 2s s s r r s s t t t s t r s t r t t rr t t q s s r 1 st r s t t t t s t rr r r r t rst s s 2 r t r r t t r r t t r t 2s s t r s s t 2 ts s2 t s s t r s t t t t t t t t rs r s t2 3 r s t r s 2 s s 2 r 1 t t r r t s 2 s t r t r s r s t r t 1 t2 t 1 st s t r s t 2s s r t s t rr r s s ss r s 2 t rr r t s t t t t t rs t s s s rr r t t s t t t s tr t t rs s 2 2 rst r r ss t rs s q t 2 t t s ts t t r q 2 r r t t s t rr r t tr t t t s t s rr r s t s rr r 2 r 3 t s t rr r s s s s s t r s t s t t t t rst r r t rs H i (ω) s t i t t 1 r ss s 1 H i (jω) = 1+jωτ i 1 = 1+(ωτi ) 2 arctan(ωτ i). s s t t t s t t r t s t r s ωτ i s t s rr r r t s r s 2 s r2 s rr r s r t r q s r r r t r q s t s s t s s ss
88 t s t rr r r t r s s2st r P r r rs s t s t rr r r t r r s t st 1 st rr t t q s tr t t r t s t s r q 2 r s s s r s r rr s t r2 r t r st t t t rs t t t t r q 2 t t t s s 2 s t t s t 2 rr r t t s rr r s t t s t t s s s t rr t r t r r s t t tr s r t s r r r t r t r 3 2 s t rr r t r rr t s t t rs r q r t t t ts r t rr r s
89 s r t r t s s s t t rr t t rs F 0 r rr t s ss t rs F 1 r s t s t t t r t t t t rs H 0 H 1 r s t 2 t rr t t rs s ss t rs r t r th i (jω)f i (jω) i {0,1} s s t2 3 r s s t t ω in t t s r s t ω s /2 ω in t t rs r t t s2st r s t t t r s t s s t t { H 0 (jω in )F 0 (e jω in )+H 1 (jω in )F 1 (e jω in ) = 2 H 0 (j(ω in ωs 2 )F 0(e jω in )+H 1 (j(ω in ωs 2 ))F 1(e jω in ) = 0 t s rt t t t t t t F i t rs r t t rs t H i r t rs r r t s r t t t rs F i r r ω s /2 < ω < ω s /2 r t r ω s s t s s r t q s r s t t r t rs s2s t r t t r2 t t r r t t r s t rs r q r t t t t ts s t q s rs r r tr s r s tr 1 rs s r t 3 t s 1 t s r r t s 2 2 t t rs s s t t s t t t s t rr r s t r q 2 2 r t s r s s t s s t s t s r t rr r s t t t t s s r rr P 2 r 1 t t q r s t t r t r s r t r r s sts s t 2 r t r r s t t t r t s t r t t rr r s s r r t t s r t t s s t r q t t r t t r r s s t t t s t 2 t r t r t 2 s t s s 2 r 1 t 2 st s sts s rr t rs st t t rs t t r t rr t r s s 2 s r t r 3 t st r t 2 t rs s 1
90 t s t rr r r t r rr t s r t t t r t s t 2 H(jω) t rr r t r s 1 r ss s H(jω) = 1+jωτ 0 1+jωτ 1. t t t r F(e jω ) s t s t t t r H(jω) t t tt r t t2 3 r s t r s t t s t t r s t rs s t t F(e jω )H(jω) = 1. F(e jω ) = 1+jωτ 1 1+jωτ 0. r tr s r t s t s t t t r s t 1 r ss r q 2 1 s s r t t [ ω s /2;ω s /2] t s t t s r s t 2q st r r t t r q 2 1 s s r t s r r t s r t s s t t t 2q st 1 s s t s s 2 r r 1 t t s r st s t t s t r r 1% s s r r t r r r 2 r 1 t 1 r ss s F(e jω ) = (1+jωτ 1 )[1 (jωτ 0 ) 1 +(jωτ 0 ) 2 (jωτ 0 ) 3 ] = 1 jω(τ 0 τ 1 )+(jω) 2 τ 0 (τ 0 τ 1 ) (jω) 2 (τ 2 0)(τ 0 τ 1 ) r r F(e jω ) = 1+ǫ τ (jωτ 0 ) 1 +ǫ τ (jωτ 0 ) 2 +ǫ τ (jωτ 0 ) 3 ǫ τ = τ τ 0 t s t r t t rr r t t t q t 3 r t t t t s
91 str t r q t s rr t r t r t t rs (jωτ 0 ) p r p = 1,2,3 t s 1 r s r t s rt t t t t t s t t r t t t r t t rs r r t rs s s s t 1 t r t t rs G p = (jω) p 2 t st t ts a p = τ p 0 s r s s G p = (jω) p 1 r ss s g p (n) = 1 π G p e jωn dω. 2π π = 1 π (jω) p e jωn dω. 2π π = (jπ)p 1 cos(πn π n 2 (p 1)) p 2πn g p 1(n). r p = 1,2,3 t s r s s s r 2 g 1 (n) = cos(πn). n g 2 (n) = 2 n g 1(n). g 3 (n) = π 2cos(πn) n 3 n g 2(n). s t rr t t r s str t s t t ǫ τ t s r t t r 2 r r t t s t t t r τ 1 st τ 0 q t t s rt t t t r t s str t r t t t rr r s t 2 1 t rs s r s s s r t t r s r t t t r s t s r t r s r q r r s t 1 t2 t t t ǫ τ s t st t t s r r 2 t rr t t s s r 1 t r t rr t s t t t ǫ τ r s s t r s t st 0.1% t t r r s tt t rr r s 0.53% t t t s 2 t s s t s t t rr t r str t s t t t t t rr r ǫ τ t t r rr t t r s s t 2 t t t r q 2 t s t ǫ τ r t rr r 0.53% t s s t ss s t r t t rs s r s s s r t s t rs r r tr s r s t r q 2 tr s r s (jω) i r i s t r 1 t2 t s s t s t r t t t t t t s t rs r r t s rt t t t t t t rr rs r rt t t t 2 r 1 t t t 2 t t q s t t r s t r rr rs s 2 s st t t 2 st t t rr r
92 t s t rr r r t ω s /2 x(t) H 0 (j ) ω s /2 y[n] 2 H 1 (j ) G 1 (e j ) G 2 (e j ) G 3 (e j ) a 1 a 2 a 3 y'[n] + z -1 2 r rr t s r t t t r 2 r 1 t str t r r r t r 2 t r r t t t q s t st t st t t q r r t 1 sts t 2 t r t t s t rr r s t r r q 2 2 t s r t rr r ss 2 t r rr r st t t s st t t q r s r t s s t t t rr r s r s sts st t t rr r s 2 r 1 t r s s tr t s ss t t ss t s t t t t s s t s s rt t t r
93 st t t s r rr r 2 t s s r tr s s r s r t s t t r st t s st t t q r s s t st t t r t rr r t t st ts t s r t t r t s sts t t s s rr 2 [(1 ǫ)ω s /2;ω s /2] s s t s t rr rs t t r r t t r s r s t rs t [ ǫω s /2;ǫω s /2] r t r t t t r t rr r s 1tr t 2 t r r t t t rs t t s r r q r t r r 2 1tr t t r tr r r s t t t t t st s [(1 ǫ)ω s /2;ω s /2] s t rr r s 1tr t r 3 r t s t rr r t rst ss s t t t t s s r q 2 t t s r 3 r r q 2 [ ǫω s /2;ǫω s /2] s s 2 t s r s t s 2 t t st s 1tr t t s t s t s sts t 2 s r 2 t st rst 2q st [(1 ǫ)ω s /2;π] s r t t s s rs t s t s s t s 2 t t st s s s 2 t st t t t s t ss 2 t r s t r t rs t t t r r t t r t r t t s t t st s s s r t t s r s t s r t t t s t r s t 2 t s 2 r t r r s t t s r t 2 2 ss t r t t t t r rr t t t t t st t r t r s r t s t rr r s s t s s t t t s t r q r 2 t r t t s r t t st s s t r rt ss t r s t t s r r s ts t t s t t rs s st s sq r s t st s s 2 r t 2 s r t s r t s t r s r q r t t s t r t t s t 2 r t t s t t t t t r t t t s t s r s t s r2 s s t t t r 2 t t r r t st s r t r q r s 1tr r tr
94 t s t rr r r t 2 t r t s s ts t st t s s t r s s t r t t st t r st t t t t t t s t q s t 1 t2 t s r t rs r t 1tr t t r 1 t s t ss t t t rr r s s s s t t t t s r rt r 2 t r st r r r t t q s t t 2 t s s s s ss P 2 st t s r s s sts st t rr r s 2 r 1 t t t t t rr r 2 t s t s t s s t s r s r t t rs s t r rt2 2 st t r2 t t s t t r r t t r t t ss t t t s 3 t 1tr t t rr r s r t s t st t t t s t t s rr rs 2 q r t r t t 2 st t r2 r ss s s st t st r rt s t t r s 2 2 t t t 2 st t r t2 r rt s s t t t rr t s r r st t st s s r t st t r2 rt t s t r r t s t s t t 2 r t st st st 1 t t s r s s 2 st t r2 s s ss r st r t s s 2s s s s t s r r t st t t rr r t t t s t s r r t s r t r q 2 r s s r t s s t s r r t 2 t t H(jω) = 1 t t s s r s 2 st t r2 t r T r s t r r t s s s s t t r2 s r r t t s2st t t rr rs t s 1 t s t t t s s r t r s s t s t s s sts s t rr t t t t t 3 s s 2 st t r2 s r s s t 2t 2 t t rr t t t rr t t t r r t s 2 t ss t s t 1tr t t rr r s s t H(jω) r tt s H(jω) = (1+g(ω))e jφ(ω) r g(ω) φ(ω) r r s s t r s t 2 r t s r s s t ss t t s t r 1 t s t rst t 2 r r r 1 s H(jω) = 1+g(ω)+jφ(ω) r q 2 r s s 2 r 1 t s t Q Q g(ω) = a k ω k,φ(ω) = b k ω k k=0 k=0
95 r t s2st r 3 s2st r r r s t t ts t t rr r t s rr r r s t 2 s t 2 r r 2 q t t t r r rs t t s r s s s Q h[n] = δ[n]+ α k h k [n] r α k s t t r t rs a k b k q t s t t t s t rr r 2 s t α k s t st t α k s t s t t rr t t r r t r str t s sts 3 t rr r t r st r t s r rt2 s s t t rr t s t r t t s s r t r t t s ts s q t 2 r 2 2 t t rr t s R z [u + 1,1] R z [u,0] r q r r t rr r t s t 3 J = U max u=0 k=0 (R z [u+1,1] R z [u,0]) 2 r U max s t 1 t t s r s s t r t t r s r 2 (U max = 2) t t t t t t t s t t s s r r s t 2 t r rr s s t
96 t s t rr r r t s s r r s t 2 t t s r t 2 s s s q t 2 R z [m,n] = R z [m+2,n+2] r t s t t r rr t t t t rr t r r t 2s u 0, 1, 2 r s t ss t s sts t r t t r s t t s s t r t t s t r ss rr t s t t t s s t 1tr t t s rr r t t t 3 t t ss t s t 2 3 r ts r t dj d α k r r t r t 2 s t st q r s s 1 t2 t s s t r s s t t r q r t t t t rr t s R z [u+1,1] R z [u,0] r r t s s t s s 2 r 1 t 2 t t r 2 t t r s ts t s t rr r s s t s ss 2 t t rs s t t s s ss r t s t 2 t 2 r 1 t 2 t r t s s t s t t t r s t st t r s s rr rs t t 2 ss st t t t rr t s t ss t t s r t 2 t s t r t rs t st s t ss t rr r ts t t t t rt s ss t s q s r r t ss t t r s t r t t t 1tr t t t s t rr r ss t st 2 r q r t ss t s t st rt t rt rr r 1tr t t t 1 st r t s t st t t s r r t r 2 3 rt t s tt r s ss t s t r r s ts rr r rt ss t s ss t s s q t 2 t r t st t t s s r t s s t r s rr r t t t t ss t t r r s t s t rr r r rts 1 s t tr t s t r s st t r t t r r r s rr r t 2 t s t s s t y i [k] = cos(ωt(km +i+ ti )). r i t s t t r r t t r t rr t r s t r s s s 1 r ss s
97 R yi [n] = 1 N N y i [k]y i [k +n]. k=1 s t t r t t r s 2 st t r2 r ss t r r t t rr t s 2 t r t t s s r t r q 2 ω in s R yi [n] = 1 N N cos(ω in T(kM +i)+ ti )cos(ω in T(kM +i+nm)+ ti ). k=1 2 t i th t rr t s R yi [n] = 1 2 cos(nmπω in) + 1 2N sin(ω in T.NM) sin ( π N in N M ) cos(ω in T {(N 1)M +nm +2i+2 ti }). t t s r r t 2 t t t rr t s st t s 1 t t rr t s t r 2 ss t t t 2 s tr t t t s t rr t s V loss1 = (R yj [0] R yi [0]) 2. R yj [0] R yi [0] = 1 N sin(ω in TNM) sin(ω in TM) sin( ω in T { j i+( tj ti ) }) sin ( ω in T { (N 1)M +nm +(i+j)+ tj + ti }). r t s 1 r ss t s t t r N t r t s t s t r 2 t 1tr t t r2 s s t ss t q t rs s t s t rr r s s r r t t r q s s ss t r s ts r t s r t s r s t rr r s r t r q rr r st t r r t t ss t t t0 = 0.2% s t s t 1tr t s s s r r s ts t 3 r r t s rr r t s rt t t t t t 0.8% s r t t t t s s r t s t t s ss s s r t rst t r q t i j + tj ti r t s r s r r t r t t rs t ss t s t s rr r ss s rt s r t q t s t t t s s t t t 1tr t t q rr r 1 t2 t s r s t t t r2 t t t t r t r t rs t r q 2 s t rr r
98 t s t rr r r t r V loss1 r t t t t rr t rs s t s s t r V loss1 r r t
99 s r s sts t t t r t ss t s r ss rr t t s t 1 r ss 2 s r s s s R yi y j [n] = 1 2 cos( ω in T { nm +(j i)+( tj ti ) }) + sin(ω intnm) sin(ω in TM) 1 2N cos( ω in T { }) (N 1)M +nm +(i+j)+ tj + ti. t s q t 2 t s t r s t 2 s t t r r s rs t rst t r s 1tr t s t s t rr r s t t t t s t s tt r r t t r ss rr t t s t t t rr t t 3 t rr r t t t t s t ss t s s t r t t r ss rr t q t t t t rr t s t t s q t V loss2 = t r s t s t s ( R yi y j [0] R ) y j [0] R yi [0] 2. 2 R yi y j [0] R y j [0] R yi [0] = 1 { ( cos ωin T { (j i)+( tj ti ) }) 1 } { sin(ω in TNM) 2N sin(ω in TM) cos( ω in T { (N 1)M +nm +(i+j)+( tj + ti ) }) }. r N t s t r t s t 3 r t rst t r s t s t R yi y j [0] R y j [0] R yi [0] { cos ( ωin T { (j i)+( tj ti ) }) 1 }. t s t t t r s [ 1;0] t t q t s q s r s t s t r t s s r t r r q 2 t s rr rs t t s t t s s t t t rst ss t r t t t s t rr t t s s q t t rt r 2 t ss t s r r r t r t 1 t ss t s t 10 7 t ss t s t s ss t t s t r t 3 r t r t s r r r rr t r t r t 1t t r 1 s t r r t r ss t r ss t 3 t t ss t s s s t s s t ss t t s t s t t q s s s ss rst r s t 1 st rr t t q s s s
100 t s t rr r r t r V loss2 rs s s t r r t ω in /ω nyq r V loss1 rs s r s t rr r 2 t t r t t s s t t t s r2 rt t t s s t t r t t r r t 2 t r
101 r s t st r 2 t s t s r s t t r t r rst r ss s t r 2 s s s t 1 tr t t s t rr r r r t r t 1tr t t rr r 2 s r r ss s t r 2 s t t t rr rs r t s r t t t s 2 t rr t 2 t t s t rr t t ss t s t 3 t st t t rr r t r s t s t r t 2s t r ss t r t s t 1 s rst r s t s s2 2 t 3 t t t s t t t s t s sts t r ts t t r 3 t t s r t s r s rs r t t t t s r s t s s r 3 2 t t s t r s r t r t t r s s s t s r s t r t t t s r r s s t t t t t r s r r s t s s t t t s t r t s rt t s t r t s t rr r r t s s t t t st t rr r rr t r s 1 st t rr t t s s t t2 t r t t t s t rr r s t r t2 t 2 r t r st t s s t t rr t s r s t s t s t r r q 2 rr rs t s rt 2 r s t s r t t s r s r t t r s t r t t 1 st st t t q s r t s t s r t rst s s s st t r t st s s s t 1tr t t rr r s t s s s 2 r 1 t t rr r t s t st t rr r s t s r 1 r t t q s 2 t ss t s s ss tr s t t r r 1tr t s t r t s t rr r s r s t
102 t s t rr r r t
103 tr Pr s t t q t s t st t tr t t s s t t t t t s t rr r t r s t t t s t t t s t r s t r rr rs t rr r t s t t st t rr r t s rr r t s t 2 t t s rr r rt r r t s ts r r t t r q 2 s s q rr rs s r t s s rr r r t s 1tr t r t t ss r2 s t r s s 1tr t t rr t t t ss t s q t s t r s rr s s t t t s t rr r rt ss t r s t s rr r s r t t s t t s t r s ts s t r rr r rr t t s t r r s t s t st t t q s 1tr t s r 1 t s s s t r r s t s 1tr t s r s t s t t t t t s t 2 s t s s s tt r rt r r t t st t s rr rs t st t s t st s t t s t t tr s rr rs t r t t2 s t s r t r t s s s str t s r ts t r t r q s r s t t t r s st t t q Pr s q r t s s r t t t r r r t 1 t r s st t t q rt ss t s t 1t t 2 s r r r st t t rr r r t t s r r r s s r t s t r s t t 2 r 1 t t t s s t rst s s t s s t t t rr rs 1 t t s t r r 2 rr t t t s rr r t r s t q s s ss t r t t
104 Pr s t t q t s t st t Pr s 1tr t t q 2st t s s ss t t t r t s s t i t t s t r s s ss t r s 2 t q t R on t s t s t q t t r r s t2 s r r st 2 rst r r ss t t r str t s s2st t t s t t rs t 2 H 0 H 1 2 t rt rs ADC 0 ADC 1 r s t 2 s t r t s t (km +i)t r i s q t 3 r r t t r t tt M s t r s 2 t s s r r s ts t s r t t 1 r s r q 2 s t 2 1/T t t s s t t π/t s t t t 2q st r t r s r s s2st r r t i t t t 1 r ss s y i [k] = (1+g(ǫ τi ))x((km +i)t +f(ǫ τi )). r 1+g(ǫ τi ) f(ǫ τi ) r r s t 2 t t s t t t T r r s ts t r s r ǫ τi = (τ i τ r )/τ r s t r t t st t rr r r τ r t s t r r t st t t s r rst r r t t r s 1+g(ǫ τi ) = 1 1+(ωτr(1+ǫτi )) 2, f(ǫ τi ) = arctan(ωτ r (1+ǫ τi )). ω r rs t t t r q 2 r s t s q t r tt s y i [k] = 1 1+(ωτi ) 2 cos[ωt(km +i) arctan(ωτ i)].
105 r r t t t t s tr t s s r t 2 t t t s t s t 1 r ss q t y i [k] = 1 1+(ωτi ) 2 { cos[ωt(km +i)]cos[arctan(ωτi )] +sin[ωt(km +i)]sin[arctan(ωτ i )] }. r cos(arctan(ωτ i )) = 1 1+(ωτi ) 2,sin(arctan(ωτ i)) = ωτ i 1+(ωτi ) 2. s s 2 π/2 < ωτ i < π/2 s t s s ωτ i s 2s ss t 2 q t t q t t s 1 ωτ i y i [k] = cos[ωt(km +i)] + 1+(ωτ i ) 2 }{{} 1+(ωτ i ) 2 sin[ωt(km +i)]. }{{} input signal input signal shifted by π 2 r t q t t t s ts t t rr r r r q 2 t r t t t st t s t t 1tr t r t t rr r r 2 t t q t t s t t 2 t t s t t t r tr t t t ts rst s s t t t s rr s s t t sq r t t s t s s r 2 s t t t 2 π/2 s q t 2 t t s t rr r t t t s s r r s t 2 t r t t t st ts t t s t 2 st t t st t tt r s r tr 2 1tr t t r t r t s r t t t s s q t t s r s t t r q 2 2s s t t 1 rs t tr s r t t i 1 r ss s H i (jω) = g(ǫ τi )e f(ǫτ i ) = 1 1+(ωτi ) 2e( arctan(ωτ i)). rr r t t t s t r q 2 s t r t t t t tr s r t s s t H i (jω) H j (jω) = 1+(ωτj ) 2 1+(ωτi ) 2e( arctan(ωτ j ) arctan(ωτ i )). t s r r t 2 t t 1+(ωτj ) 2 1+(ωτi ) 2 = 1, arctan(ωτ j ) arctan(ωτ i ) = 0. rst t s t t t t t t r s r q t s r rs t t s tr t s s q t 2 t t s t rr r
106 Pr s t t q t s t st t st t s t r rr r 1tr t r s rr r 1tr t r t r rr rs t s ts r t t st t t s rr rs r s t 2 s q t 2 t rr rs s r t s s s s t t t st t t s r r s 2 s t t r s t t s s s t ss t t tr t t t s t rr r t t 1tr t t s t r r s t t tr t t rr r t t s t s str t t s s t t t 2q st t t ts r r r 0.02% t s t rr r s r 2 r r s s t t t r t r r 90dB t r q s r t s s r t s s t rr r st t r tr r t r r s 1tr t r t r rr rs t rr t r st t s t rr r t st t s s 1tr t s rr r t st t s s s 1tr t rt ss st t rr r s s r t s t s r t s r r t t t s s s ss t t t r s t st t t s 1tr t rst t sq r 1 r ss t i t t t r r s ts t r r r s t t rr r t t s rr r ts t t s t r tau τ = 0.02% t s s 1 r ss s y i 2 [k] = 1 1+(ωτ i ) (ωτ i ) 2 cos[2ωt(km +i) 2arctan(ωτ i)]. r i {0;1} t s q t t t 1 r ss s t t t s t t t r t t 3 r r q 2 s s t s t r t s t t st t s t st t t rr r t t t r t r t s t t s t r s 3 r s s t t t s t s r r rt r r t t t t s r r t 2 t
107 t t r t t t s r t t s s t t 3 t r t t t s rs r r s ts t ss t r t s 1 r ss s loss[k] = y 2 0 [k] y 2 1 [k] = 1 { } (ωτ 0 ) (ωτ 1 ) (1+(ωτ 0 ) 2 ) cos[2ωt(km +0) 2arctan(ωτ 0)] 1 2(1+(ωτ 1 ) 2 ) cos[2ωt(km +1) 2arctan(ωτ 1)]. s r 2 s ss t rst t r r r s ts t ts t s t rr r t s r s sts r t s t r t s t t s 1 r ss t 1tr t t t r str t s t r s s t t s rt t t t t t t r t r st s r s t 2 t s t r q t s r t t t s s t s s r t r t r t s t r t s s t t t 1tr t ω s /2 H 0 (j ) x(t) ω s /2 H 1 (j ) y 0 y 1 y 0 2 y Slope Correction r r s t s t 1tr t s t r t r r t r st s r t 1 r ss q t s r r s t r t r t t t s t r t r s r t r 3 2 s tr r t s s s t t s r s r t s s t r t t sq r s s r q t 1 r ss t s s Slope = 1 2(1+(ωτ 0 ) 2 ) 1 2(1+(ωτ 1 ) 2 ) t s r t 2 t t s r t t t s st q t 3 r r r t s s r t t s r t t t 2 t t r t r rr s s t t t t 2 t t r t r t
108 Pr s t t q t s t st t tt t s r r s t r t rr t t s 2 t t t t rs t r t s s tr 2 t r t r s 0.02% s t t s r t s t t t rr t t t st r s t 1 t2 t tr t ss t s r r s t 2 t s t r q t s 1 r ss s Trace(τ 0,τ 1,ω,k) = 1 N { 1 N 2(1+(ωτ 0 ) 2 ) cos[2ωt(km +0) 2arctan(ωτ 0)] k=0 1 2(1+(ωτ 1 ) 2 ) cos[2ωt(km +1) 2arctan(ωτ 1)] }. r N s t r s s t s t t s t rr r t t r q 2 1 t ss t s tr 1 s t t r s t t st s r t t r t r s t r t t t r t r t r r t t tr q t 3 r t r s t 3 r t s r t r tr t r t st t t s rt ss t s r r t t r t r t 3 t tr s str t t t r s t s t t r t t r s 2 t r t t t r t r t s t s t t r t 3 r t r rr t t t s t t t r s rs t t t r q 2 ω in = ω s /4 r t t s t s r r t 2 str t r r s r t ω s /2 ω in = ω s /4 s q t 2 t t r t r s t st s t s r t s r t r s r r t t s t ω s /4 t tr t 2 t t r t r s t t r s 2 s t st t s t r t t t r t s r t t s r s t t r s s t r t r t r ω s /4 s s s s t s t t t t t r s t t t s t ω s /2 H 0 (j ) x(t) ω s /2 H 1 (j ) y[n] Notch at s /4 y 0 y 1 y 0 2 y Slope Correction r r s t s t 1tr t s t t t r r ω s /4
109 t r s r ω s /4 t t t s r q 2 ω in T = π/2 s t sin(2ω in T(kM + i)) = 0 cos(2ω in T(kM + i)) = ±1 t r r rs t r s q t 2 t tr s Trace(τ 0,τ 1,ω s /4,k) = 1 N 1 { 1 N 2(1+(ω s τ 0 ) 2 ) cos[2kπ 2arctan(ω sτ 0 )] k=0 1 2(1+(ω s τ 1 ) 2 ) cos[π(2k +1) 2arctan(ω sτ 1 )] }. r { cos[2kπ 2arctan(ω s τ 0 )] = cos[2arctan(ω s τ 0 )] cos[π(2k +1) 2arctan(ω s τ 1 )] = cos[2arctan(ω s τ 1 )]. s s t 1 r ss t t s tr s t 1 r ss s Trace(τ 0,τ 1,ω s /4) = 1 2(1+(ω s τ 0 ) 2 ) cos[2arctan(ω 1 sτ 0 )]+ 2(1+(ω s τ 1 ) 2 ) cos[2arctan(ω sτ 1 )]. 2 t r s t s s q t t tr s st t s q t Trace(τ 0,τ 1,ω s /4) = 1 (ω sτ 0 ) 2 2(1+(ω s τ 0 ) 2 ) (ω sτ 1 ) 2 2(1+(ω s τ 1 ) 2 ) 2. s s t 1 t tr s t s 1 r ss s q t r 1 r t t s t tr t ss s 1 t t r s s t r2 t ω s /4 r t s r t t t r t tr t ss r s t s ss 1 r t t r s 2 r r r s ts t tr t ss t t r q s s 1 r ts s 1 r ω s /4 t t r s r t t 3 t r t r t t rs r r r t r t rr st r ω s /4 s r t s st t t r s t t r s t t r 1+z 2 s s s t t r t s r r r r ω s /4 s t r s t s r t t s t s s tt t s r s t t t t t t t 1 s r s s s t t r q s t rst s s t t ω in t s s s t t ω s /2 ω in t t s t s r 2s t t s r s t t s rt t 2 t s t ss t t t s r t rst tr t t [0,ω s /4] t t s r s t s t s [ω s /4;ω s /2] s t r s t r t r s t s r s ts t t t s 2 ss t rt r t s s t s r t s s t rr rs t s2st t s t s t t t st t st r t s t
110 Pr s t t q t s t st t r t t r t ω s /4 s r s t s t r s s t t s ts r t2 t t t t s s r r r 2 r s t t t s t r t t s s t s r t r s q t s t rr r t s r t s t s s s t s t s t t r t r t t t t t r rr rs s s ss t s sts t t t st t rr r t s rr r t 1tr t t t t s s t r s t t r r s t r s 1tr t t q r t t t t r rt r rst s r rr t q t t t t t rs t s st 2 st t s r ss t r s 2 s t t s t s s t t 0.53% t t r q 2 t t t t r s 2 ω c = ω s /2 t s 1 t s s s rst 1 str t s t s s s t t ω in = 0.2ω s t r s s q t t r t s t tr t ss t s 1 t rr t st s 0.1% t r ts t s t s t s 1 s t t r s t 2 s r 3 r t r t s s s s s t rr r t t t s r s 0.03% q t t 95 r t s t r q 2 s s s s s s r s t s s 1 s s t t t r t t t s r s 2 t t t t rr r 1tr t s 2 t s s r s t s t rt r t2
111 r t r t r t t r s s r r t t t r s t r t r s s s r tt r s s t s s r 0.2ω s s t r s t s r ω s /4 r t s r s t s r s t s t st t r r s t t t t t r t t t r s r s t s t r s t s r s t s t t s t rr rs rr s t ω ± ω s /2 s t r s t s s t t 1.3% t s 1 t r t t r t r s t r s t t t r r r t s t r t t r t rr t s s r t s t r s t s t rr r st t t q t s rst s ss t t t t s rr r t s 1 tr t r s t r rr rs s s s r st rt rr rs s s r rt s s r t
112 Pr s t t q t s t st t r s t t r t t t r r s t t r s t r t r t r t t r s s t t s t t 1tr t t rr r st t t q r s t s t r s s 1 tr t t t s r s t t st t rr rs r s r t s t t s rr rs t s t st r st t st t t q s s s 1tr t r t r t t t st t rr r t t s t rr r st t s str t ss t t 2 st t rr r s r s t 1% t s 1 t t s r t t r s t s t t s t st t r t ts t rr r s q t 2 t rr t s t t st t t r t s s rr r r r s t r s s ss t t st t s 2 r r t r r r t rs 2 s r t s r r 3 s t r s t s rr r r r t s rr r s t t t r q 2 r t 2 t r r 2 s r t t s t s str t r r t t t s rr r s t t r t t r s t s t st t s t tt r s s 1tr t s s str t r t st t s s s t
113 r t t st t t t s t 1tr t s t t s t rr r s s t t 0.53% r t s s s t s r s t t 1%,0% 1% r t t s r q 2 r t t r t r s t r t t r s s s rr rs r t s t s t tt r rr t rt t s s r t t st t t t s t 1tr t s t s s t st t t q r t s t rr r s r t s s 1tr t t 3 t t r r t t t s t t r s t t t s rr r ts t t rr r s s t t t 2 r r t t s r r % s q t 2 t rr r t r r tr r r s rr r r t s r q r s t st t s t rr r t rr t r s r t s r s r s t r q r s t s t t r r t r q 2 ω s /4 s t t s ts r t s r r t t s r q 2 t t r t r t st s t t t s rt t t t t t r s s t t r st s t r s t t s t t ω s /2M r q r s r tt t ts s
114 Pr s t t q t s t st t r s s t s t s t rst s s s t rr t ss t s2 tr s s t s t ts st t st r t r st 2 t t st t s s t rr rs s ss t st s t s t t st t r t r 2 t r t t t s t st t t 1t s t t t t r s t q s r r s r r t t2 t t s r t r t s s tr s rr rs t r r s r t r st ss t r s s t Pr t t2 tr t t 2 t t t t r s s t s P t t t t s t s r r t s s r r t t s r s s rt t 2 s t t2 t r t t t t r s st t t q s 2 st r ss t s r t r t s t s r t r t ts s s ss t r s s t t s t st t r q r s st t s t r r r r t q s t r t r st r r t 2 q ts t r r s r t t r t t 3 t st s t t t r t q ts s s r s t st s s t s t t t r s ts t 2 st r ss t s r t r s r t t st s t rr s s t t r s r t t t r s st t t q t s sts t s r t s s t r s t ts r r r r t r s t t t t r r t t r t s t t r s t s s t t t t s s 2 s t s s t t st s t s r t s r 1 s t st s t t t s r t t t s r r r t t2 s t s r t t t s s r r t r s q ts r 1 s s r t r s t tt r s 2 r r2 t r q s 3 s r t rs t s2 r 3 t s r t s r r s 3 s t s r r 2 r t s s ss t rs r t r2 r t s r q 2 t t r t r s r t 2 t s r t r t r s t t
115 r r s r t s s r r r t t st s t s r t s t t ss t r r t s r q 2 s r q r t 3 t s r r s t t P rs t r s s t t t s r t r st r ss r t t st t
116 Pr s t t q t s t st t 2 t s s tt s r s r ts r s r q 2 s 1 t F s s s r t s s s t s t s s t t t s t t s t s s t s s s s r t t t s s q t 2 t t t t s 2 s r 1 t 2 q t 3 s r ts r s ts q s t s t s r t r q s rst t r ss t r q s s t 1tr t t st t s t rr r st t r q s t r s st t t s r t s t 1tr t st s r s r t rst t s t s t rr r t s s 2 r 2 s tr t t t r t t r q 2 t st t rr r s 1tr t t r q s t r q 2 f in = 4.43MHz s s r t s rst st r ss r t r t s r t fs 2 f in s q t s str t t t t t r t f in f c = 4.43MHz 600M s q t t t s t t s t s t r r t 1tr t t st t s t t t t s t r s s t r t s t st t s s t s s t 1tr t t t s t st t rr r s st t s t r t r s t 2 rt rr t t r t 2 t t s s s t 2 3 s st r t s r t s s t t 0.002% rr s t t s t rr r q t s s t 2 t r s t st t r s t q t 0.056% r s t s r r t s s s 1tr t s r s st t t r q s tr r2 t t t s t rr r t s 1tr t t r q s t t st t s s t t s r t t t t r s r s r 1 t 2 q t 90 t rr s s t t s s t rr r s r 2 1 s t s s r s q t r r t 1tr t t t s rr r q t s s t t s t rr r s s s s t t t r q 2 s t r q s t t t r t s t rr r t t t t t q 1 s s s s t s t t s r 2 21 r 75 t 96 t t t t s t rr r t r s s t t r rr r s ss t t t s t r s t t r q s t r q 2 s s t t t s t st s t t s r t
117 r tr t t t t r f in = r tr t t t t r f in = 4.43MHz t r st t s rr t t t s t s t rr r t t s t s t s t q t r rr t s s t s tr t t t t t t t s r2 s r t s s r t r st t s t t 1tr t t r 0.056% s s r r t st t t t s t rr r s ss t s r t t t
118 Pr s t t q t s t st t r tr t t t t r f in = t r st t s rr t r rr r rr s s t t t s t rr r rst ss t t t s r s t s 2 t t s t rr r r r t 2 t r s t q t s r rst r r t t rs r r t s t t t r t r t t q t s 1 r ss s Slope = A 2 1 max 2(1+(f in /f c ) 2 ) 1 2(1+(f in /f c (1+ǫ tau )) 2 ) r f c r r s ts t t t r ǫ tau t s t r t t s t rr r A max s t t 1 t t t s r t q t t 1 r ss ǫ tau s ǫ tau = f c f 1 in 1+( f in fc ) 2Slope 2 A 2 max r r t t t q ss t 1tr t t s s r r r t t r q s s 1 r ss q t t s t st A max = 3.62V t t r q 2 s q t 3 str t s t t r t r t t t s r s s r t t r q s f in = 3 f in = s s t s r s r f in = 3 s q t V 2 s rr s s t 1tr t t s t rr r % t s r t t r t s r s r f in = 3 s q t % s t st t t s t rr r % s r r t 2 t t
119 r t r t r t t r t t rq s f in = f in = t r s t st 2 t r s t s 1tr t r t t t s t rr r st t s t s 1tr t t t s s s r r q s t r s rr r r rs t t t rr r s s r t s t s r ts s r t r 1 t t st t s 1 2 t t t t t t s r t r r s s t r t t st t t t r t r s s t s t s s s s r t t s t t s r t s t r s r 2 s t s r r r rr r r t s t r r t r t s t st t s t r s s t r rr r t s s s r ts r r t t st t t s r t 3 t t s t t s r t s t t r rr r t r s s t s t t q r s ts r s t rs r s
120 Pr s t t q t s t st t t s t t t s 2 90 o r r t st t t s t t r t s r r t t s t ts t s t s t t 2 t s t r rr r r t s t s t t t rt t s t t t s t s s t rt ss t s t r s rr t r t s t s t rr rs f in 3 s t s r spur wogain ˆǫ τ ǫ τ s t s r r t r st t s s t s t r offset s t s t s r t spur s t s t s r t spur wogain t s t s r t ˆσ τ st t t s t r s s t t s t r σ τ t rr r t r s rr t r s t r s t s t r r s t s t st t t q t s s t 1tr t t t rr r s t r s t t s t s t rst s t t t r s s t r s t t t s ts t s t rr r s s t t t 2 r r r t s r rr r r 2 r t r s t r rr rs t st t s s t s t st t s r t rt ss st t rr r s s r t s t t t s r t s r rr r r r t t s r r t st t s s t t r r 2 s r 2 t st t t t rr r t s s t s s t t ss t2 s t t r r t r q 2 ω s /4 r t s ts r t s r r t t s r q 2 s s 1 t t s r t s t r q 2 t ω s /2M r t s r t t t r s t q s s s tt r s r t t t 1tr t s t t 2 t r s s2 tr s s r 2s t t s rs t t t s rst s t t t t st t t st t s t t s s t rr r s t t r t 1tr t t s s t r t t2 s r s t t t t r s s t r tr s rr rs t s t t t t st s t t s r s t t r s s r st t rr r s rst 2 s t t r q s s t s t q 1 t rst s t r s r t t s r q 2 s 2 t s s t rr r s t t s t t 1 r ss q t t r t t t
121 r ss t r q s s t 1tr t t t s t rr r s t r s st t t q s r s t t r s t st t rr r 0.056% t r s r t f in = s q t 46 r rr s s t t s t rr r st t s t r s s t s s t rr r t 0.47%
122 Pr s t t q t s t st t
123 s P rs t s s t r ss t s s t r s r t r t t t rt rs s r t s tt t t r s t 2 t r s t s t r 2 ts s sts str t s s s t s r t t t r s r q 2 2 t r s t t s r s t r s t rs r t t t s r t r q 2 t s rt t t t r str t t s t t t r t t r s t t s st t rt t 2 t r ss r t r t s s r t r s s t s s r t s r s tr ts s t 2 r t r t2 t r s t t s2st s st rt s r r t 2 r s t t rs s s s t t t r s t t r s t r st t s t s s t st rr r s r t t s t ss st t t r rr rs rst t tr t t s t t t s t t s s r s t st t r t tr t s r t s t s s t r 1 s t r t r r r t rs st t 2 s t s s tt r r s t r t r r s 1 st r t t r s t r s r s t s r s t r t t r r t t r s s t s t s s t t s t st s t r t t r t s st t t rt r r r r t st r t t r r t t r s t r 3 t t s r s rt 2 t s t s r s r s t s q t 2 r s t r r t t t t t s t r t s r s t r ss s st t tr s r s st 2 t t t t r t s t t s t st 1 s t st t 2 t s r s t s s t s t r s t r s t t t r t t r t r ss r t r t s s t s r t t r t s rst 2 s r s s t t t t s r t rr rs t t r q 2 s rr r s t s r t 2 r r t t t r t t t r s rr r r r
124 Pr s t t q t s t st t q t t t t s t rr rs s r s s t rt s t t s rr r t s s s t t t s t rr r s r q 2 t r s ts s ts 1tr t t s 2 t r s t r rr rs s s st t s s t rr rs st s s t t s t r s s t r t t rr rs r st t s t s t t s 1 st r t r ts r s rr rs 2s s r t r r t 2 t s t rr r s r t r r 1 st r t t q s r t t s t rr r s r t s st t rr t st t s r 2 t rt rr t t r t r s tt r s r rr t t s t r ts r s t r t s t t tt r2 r s t t t s t s s rr t s s t t t s t t r s t t s t s r t r 2 t s t rr t r q r s r 1 t rs s r t 2 r 1 t t rs s rr str t r s r s t s t r s ts r r2 r s r t st t r2 s t s r s t t r t r s t st r 2 t t q s 1 st r t t s t s t r rst s t q s sts t st s t t s s t 1tr t t s t rr r ts r s t r t t t st s s t t t t tt r s rr rs r r s s t t s r t r t s r r r t s r q r r t s t r str t t s s t s s 2 r 1 t r rr r s 1tr t r rr t t s t rr rs t st s 2 t r q r ts r t ss t r st t 2 s t t r r s t s 1tr t t t s s t st t t t s t rr r t rst s t t s s st 2 r t t t t s s t t t t t s t rr r t r s s t s t s t t s t rst r s t t t t t t r q 2 q t ω s /4 t r t s r rs t t s r q 2 t t r t r s r s s r t ss t r s s t t s r t r s s2 tr s s t t s t r t s rs t t s r q s s rt ss t s t s t tt r s s t t t tt r t t t t t st t t s s t t r s t s t s t s r t r t r tr s rr rs r r s t st t s r r t r q s s t ts t t rr r 1tr t 2 s s r t r q s t st t t r s t 0.47% t s t rr r 2 t s rt t t t t t t s s t s t t s rst r r t rs r s r t r s st t t q
125 P rs t s s s rt t r rs t s s t t r s s t P 1 t2 t t t t r t t r s s t t s r r 2 s t r t t t r t r t 1 t2 t t t r t t r r r t r t s t t s r q r ts r s 2 t r s t t s2st s t q t r t rr t t t t t r s s t t r t s t r s s t s t 2 st r r t t r t r t t t r 1 t s t t r t t rs r s t s s t r t 2 s rs r r tr s r s s t r st s t t rs t s s t t t rr t s 2 q t 85 r r t s t s t r t t rs s s s ss t t r t t t t s r t rst r s t st t r t s t t t t r t st t t t s t rr r r r t r s st t s t s st s t t rr t s r t s r s t r s rr t t q t tt r2 r s t s t st t t t s t rr r
126 s
127 1 s 1 s t t s r t t t s r t s ss t t st t t t s t rr r s t s s r s r s t t t r q 2 r r t t s t rr r s 1 t 2 t r t t t t r q s t s t t s 1 s t t s r t rr r s r ts s t t t t s r ts s r ts s tt r s r t rst t t s ss r2 t t t 1 r tr s r r t s r t t t t t s r t t t s r t t r s st s t q t t t r q 2 t s s r t t t t r t t t s 1 t s r 1 s r q 2 s s r q 2 s s r 3 t r 3 3 r t s r ts t t t t
128 s r s t t s rst s t s r ts s s r s 2 t s t s t r t t r t s t t t r q 2 s s r rr tr s ss s 2 s t t r st t t t t tr s ss s t t ts t r t s s r s s q t r t r st t tr s ss s t s 3 s s r t s r s t t t r t t s r s st s t s t s t t s t t t r s st t t t tt r s r t t t s ts 2 t t r q 2 s s t rr s s t t r t t r t t r s t s t t r t r t s t s t r t r s 1 t t s s st t t t str t t s t s s t t t t r s 2 t r t r t t t s s q t 2 s r 2 s r t r t t s r s r t s r t r t t t t t s t s t s t s s r t s t t r t s t t t t s t r2 t s t t s t t ts t r t t s r r s t r t r s r q r t s t t r t t r t t t 2 t t s 2 r r t t t t r r s s rt r r s t t t t t r r s r2 r t s t t r s t
129 t t t t 3 s t r t r t r r t s r t t t r t s r 2 tt t r s t t t t r t t s r t r t s s r t s r r t t r 3 r t s r t t t t t t s t s t r t t s t rr r s r t t r t t rs t r s t rt ss t t s s t t r s ts r s s t r q 2 3 s s t t t t s t s 3 rr s s t s t 0.8% r σ r 2.4% r σ s t s r st t t r s t t2 t s t r t r t s r ts r
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