31 9 Vol.31, No Systems Engineering Theory & Practice Sept., 2011 : (2011)

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1 ÿ Ÿ a þ î µ D ý û 31 9 Vol31 No Systems ngineering Teory & Practice Sept 2011 : ( : O226 :!"#$ RCH *+-/01 %&'( GI/D M SP/1/N :<; 3 =<><? 2 OP ; SUT ; 3 VWFGYXZ[MGBJ\]^ _` bdcfefgffifjlknmfolpnqfrfsftfufvfwfxlynzfl nf~ olpn l f nƒf f f f ˆf fq RCH Šl nœl fžn l f GI/D M SP/1/N l f n f n l nšf fœf f f fˆf fž f f n l f n f f f fªl n«l f n n f f±l²n³f fµ n f~ n f f l n fļ f f ¹fºf»f¼ff¾f fà šf fœl náfâfãfäfåfl nçfãfolpnè fél Ê fëfì ÍfÎfÏÐifjlknmfolp f~ ; Žn l f ; ÑfÒf¼fÓ f f ; ; RCH Šl nœl Discrete-time GI/D M SP/1/N queuing system wit negative customer arrival and RCH killing policy bstract YU Miao-miao 12 TNG Ying-ui 1 FU Yong-ong 3 LIU Qiang-guo 2 (1 Scool of Matematics and Software Science Sicuan Normal University Cengdu Cina; 2 Scool of Science Sicuan University of Science and ngineering Zigong Cina; 3 Department of Computer Science & Tecnology Tsingua University Beijing Cina pplying te supplementary variable tecnique and embedded cain metod based on te iteration of conditional probability matrix we studied a discrete-time GI/D MSP/1/N queuing system wit negative customer arrival and RCH killing policy Tree kinds of queue lengt distributions namely te queue lengt distribution at positive customer pre-arrival arbitrary and outside observer s observation epocs are obtained Furtermore we also considered te waiting time distribution of te accessible positive customer Finally we presented several numerical examples under some special cases to demonstrate te correctness of te teoretical analysis of tis algoritm Keywords supplementary variable tecnique; embedded cain; discrete-time ian service process; negative customer; RCH killing policy 1 ÔÖÕ føfùfúfûfü f fýfþfßfàfáfâfãfäfåfæfçfèféfêfëfìfífîfïfðfàfñfòfófôfõ ÙfÚfÛfÜ öf føfùfúfûfüfæfýfþ î f é f f fû fî fâf fòfó fý fò fîfàfñ føfùfúfûfü f fî f! " # $ % Hunter [1] [2] û&' ( * î + - / Glenbe [3] 4 ÛfÜ Ù ;9< =9>?9@ 9B C9D ÛfÜ 6nî 7 89 : f " # F Gfî H I J K Lf Mf 6nî N O P Q R SfÝfà T Uf Mf 6nî VXW Y Z [ \fö 4 f f6 ] ^ _ ` afîfß b c d Harrison Pitel [4] [] e f g û i j [6] * < k l b m n o p q r f s t u v k ~ D " # x y t ufû z M/G/1 f fý ƒ fé fî Yang û Cae [7] >? b Poisson fî ˆ Šfû Œ f fý r Ž : : š œ ž Ÿ ( ; ª «Ÿ ( ; ± œ ž Ÿ ² ª ³ (10Z136 µ : ¹ º» ¼ ¾ -mail: mmyu7@163com; À Á» Â ¾ Ã -mail: tangy@ uestceducn; Ä Å Ç ¼ È «¾ ; É Ê» Ë È

2 g K O ø î z - ~! o î G Y + ; c Ç S s Ì D < k 7 k p f * Z ` k Ø Ø S 174 ÌÎÍÎÏÑÐÎÒÎÓÎÔÎÕÎÖ Ø â ã î ÛfÜ [8] GI/M/1 f Ù Ú e f g * Û b Ü Ý Þ ß H f fý r à á GI/M/1 R ä å f ÛfÜ æ ç èfýf f fîfïf é 9ê ë d è ì ífîfý Ú 20 1fí Ø Ù Ú9>9?9@ Û Ü 99î î q9ï9ð 9ñ9 î9ï9 î 9R ø9 tencia Moreno [9 10] û9e9f føfùfú føfùfú ò [11] Geom/Geom/1 f fîfòfó Û Ü é î ø føfùfú 9 9ò óô fò ð % ö q ù úfîfï ûýüþë ÿfý f fî (RC F ˆ Ù b m n o p fû Ü Ý 2fî Œ fí f s ò ï ú 6 9å S à Tfî t9u MfÝ ï 9M ÙfÚ à T fî t u é χ n n 1!fë sfò " 4 q # p $ t u % & * ' ( ñ * B F I J / : ; 4<6= % G H N 7 8 S T U V WX _ ` S T a b c436d e f g % L M G O P Q R Y6Z [ \ ] ^ Poisson 9 Bernoulli 9 i j k l m n 9 o p q r s g t u v 7 8 v 1 w H x y4z6 ~ ~ 90 ƒ 36 [12] Bocarov V ˆ Š S T ] ^ MSP U 9 n Ž > Œ Ž š Š S œ ž Š Ÿ 1 ~ ª «Samanta [13] Gupta ± ² - _ ` Bocarov ~ ³ ] ^ MSP µ - ˆ Š _ ` S T D-MSP U u v ˆ» Š m ¼ ¹ º 1 w H x y4z6 ¾ k Ç È É j Ê _ ` S T À Á D-MSP Â Ã À Ä Å Ë e Ì Bernoulli 9 _ ` Í Î Bernoulli 9 _ ` PH m n 9 Ð Ñ _ ` S T O Ï Ò Ó Ô Õ a b Ö k Ø Ù Ú 2 ÛÝÜßÞáàÝâÝãåäåæèçåéåêèë 21 D-MSP ì í î _ ` (D-MSP Neuts [14] lfa [1] ï ð _ ` 9 ñ (D-MP a b Ö 7 8 ó ô _ ` - ö ø ù _ ` / L ò õ6 Ò Ó ú û ü H ý ( þ _ ` S ÿ k k = 0 1 ³ / D-MSP š Ú k p ú û T S ÿ í î S = 1 2 m Z k 9 ú û i 1 i k S ÿ Ø k m k + 1 ( þ : 1 k + 1 S ÿ ú û i j Á / Ó ( þ U V L ij Ê 3 1 i m 1 j m; 2 k + 1 S ÿ ú û i j Á / [ Ó ( þ U V M ij Ê 3 1 i m 1 j m! ' " # $ v % Ø _ ` ~ m & ˆ + -UV ' ( * Ú Ç m & / 0 1 L M Ê 3 L = (L ij M = (M ij 1 i m 1 j m ³ (L M " _ ` (D-MSP L M # $ (L + M e m = e m Å 3 e m * m 4 67 p : ; 1 = L + M m & Z / 7 8 9? = ú û < G H L + M o ú û T S ú û - U W X 0 1 > π = ( π 1 π 2 π m π # $ π (L + M = π πe m = 1 ú û a b c43b e 1 G H " 7 8 Ž > Ž > 0 ñ G H a b Ö 43G 7 8 I J S 7 8 Ž > ü 2 C D [13] F / H H K L P M N Ï P 8 S T µ À ( þ N C û W S s g T G U Å ; P Q L M x y4z6 R H X Y 7 8 Z O [ 36 IP V W z6 K P 8 z6 \ L M y S ] 1 y À ( þ B C 22 ^ _ ` a b c d e f : ; Â C / / ñ RCH - g i GI/D-MSP/1/N a b Ö š u v : Ö 1 j k (S ðlm n o p q / ñ r ( þ S s t u (t t + (t = _ y Á / / ñ v w x / ñ / x ( þ S s z u (t t Ì > ( 1; 2 Ç T ST > ~ W X [ / ñ 8 9 G T Ê U V W X a k =

3 Î W v H ~ W P Š 7 Ž 4 Ç 7 9ƒ ˆ : Š Œ Ž RCH GI/D MSP/1/N š œ 17 Pr T = k k 1 r W X 3 > Ç / / 1/λ; ñ T S T œ H Pr T = k = η η k 1 (k 1 η = 1 η; W X [ 8 9 G 7 ž T T 1 Ÿ η : Œ ; : Œ Ž ; : Œ Ž ; : œ ª «1 ± (S ² ³ µ 7 8 º» W ¼ 4 ¹ þ t + t S ÿ 7 8 Á / m & (L M _ ` I j ¾ FCFS o 7 8 / ; / / ñ x j ¾ - g i À Á b t 7 8 Ö S RCH / > / / ñ Ö p Â þ Ö Ã 7 Q R ; È Ä 7 8 D6Ö Ã 6 / Å N Ž / ; p 9 > ~ 7 / / ñ Ö S ÿ t(t = 1 2 ú û i Ç 7 ¼ i u v õ6z 8 9 G N(t: * t S ÿ Ö 43 / 1 È Ä 7 8 ( / ; U(t: * t S ÿ È É S T / ñ ; : J(t: * t S ÿ 7 8 I 7 8 Ž > k Ç Í Ê N(t U(t J(t Ë Ì _ ` S T a b Ö S ÿ t ú û U V Ú Z P nj (u t = Pr N(t = n U(t = u J(t = j 0 n N 1 j m x C Î Ï P n (u t = P n1 (u t P n2 (u t P nm (u t 0 n N u 0 C 9 3Ð f g Z P n (u= lim P n (u t= t P n = lim t P N(t = n= k + Ñ Ò û - Ö 43 / : lim P n1(u t lim P nm (u t 0 n N u 0; t t lim P N(t = n J(t = 1 lim P N(t = n J(t = m t t b Ó W X 0 n N; Pn (z= P n (uz u z 1 0 n N; a(z = a k z k z 1; I m u=0 W ¼ 0 m * m & Ô 0 1 Õ k=1 0 1 e m * m ÖØ ØÙØÚØÛØÜÞÝàßàáÞâàãàäÞåàæ 9 Ö 43 Å 3 ³ / 1 7 ç Ö K è ú û : ; Ö S T «t t+1 K è

4 Ô S ' Î ' 176 œà àéþêàëàìàíàîàï ú û - 9 Î U V W i ñ ò ó ô Ö K è ú û ü [ H k õ 67 ö W P 0 (u 1 t + 1 = P 0 (u t + P 1 (u tη + P 1 (u t ηm + P 1 (0 tηa u M + P 0 (0 ta u η +P 0 (0 ta u ηm + P 2 (u tηm (1 P n (u 1 t + 1 = P n 1 (0 t ηa u L + P n (u t ηl + P n (0 tηa u L + P n (0 t ηa u M +P n+1 (u tηl + P n+1 (u t ηm + P n+1 (0 tηa u M + P n+2 (u tηm 31 ð 1 n N 3 (2 P N 2 (u 1 t + 1 = P N 3 (0 t ηa u L + P N 2 (u t ηl + P N 2 (0 tηa u L + P N 2 (0 t ηa u M +P N 1 (u tηl + P N 1 (u t ηm + P N 1 (0 tηa u M + P N (u tηm +P N (0 tηa u M (3 P N 1 (u 1 t + 1 = P N 2 (0 t ηa u L + P N 1 (u t ηl + P N 1 (0 tηa u L + P N 1 (0 t ηa u û - (6 (10 ø ù +P N (u tηl + P N (u t ηm + P N (0 tηa u L + P N (0 t ηa u M (4 P N (u 1 t + 1 = P N 1 (0 t ηa u L + P N (0 t ηa u L + P N (u t ηl ( H t S ~ v67 ö W P 0 (u 1 = P 0 (u + P 1 (uη + P 1 (u ηm + P 1 (0ηa u M + P 0 (0a u η + P 0 (0a u ηm +P 2 (uηm (6 P n (u 1 = P n 1 (0 ηa u L + P n (u ηl + P n (0ηa u L + P n (0 ηa u M + P n+1 (uηl +P n+1 (u ηm + P n+1 (0ηa u M + P n+2 (uηm 1 n N 3 (7 P N 2 (u 1 = P N 3 (0 ηa u L + P N 2 (u ηl + P N 2 (0ηa u L + P N 2 (0 ηa u M +P N 1 (uηl + P N 1 (u ηm + P N 1 (0ηa u M + P N (uηm +P N (0ηa u M (8 P N 1 (u 1 = P N 2 (0 ηa u L + P N 1 (u ηl + P N 1 (0ηa u L + P N 1 (0 ηa u M +P N (uηl + P N (u ηm + P N (0ηa u L + P N (0 ηa u M (9 P N (u 1 = P N 1 (0 ηa u L + P N (0 ηa u L + P N (u ηl (10 u Z G ú x zp 0 (z = P 0 (z+p 1 (zη+p 1 (z ηm +P 1 (0ηa(zM +P 0 (0a(zη+P 0 (0a(z ηm +P 2 (zηm P 0(0 P 1 (0η P 1 (0 ηm P 2 (0ηM (11 zp n(z = P n 1 (0 ηa(zl+p n(z ηl+p n (0ηa(zL+P n (0 ηa(zm +P n+1(zηl +P n+1(z ηm +P n+1 (0ηa(zM +P n+2(zηm P n (0 ηl P n+1 (0ηL P n+1 (0 ηm P n+2 (0ηM 1 n N 3 (12 zp N 2(z = P N 3 (0 ηa(zl+p N 2(z ηl+p N 2 (0ηa(zL+P N 2 (0 ηa(zm +P N 1 (zηl+p N 1 (z ηm +P N 1(0ηa(zM +P N (zηm +P N(0ηa(zM P N 2 (0 ηl P N 1 (0ηL P N 1 (0 ηm P N (0ηM (13 zp N 1 (z = P N 2(0 ηa(zl+p N 1 (z ηl+p N 1(0ηa(zL+P N 1 (0 ηa(zm +P N (zηl ³ (11 (1 ø ù +P N(z ηm +P N (0ηa(zL+P N (0 ηa(zm P N 1 (0 ηl P N (0ηL P N (0 ηm (14 zp N (z = P N 1(0 ηa(zl+p N (0 ηa(zl+p N (z ηl P N(0 ηl (1 u ù û e m x > ¼ [ H N Pn (ze m = ü [a(z 1] z 1 N P n (0e m (16

5 X 7! % Ê g ü H W 9ƒ ˆ : Š Œ Ž RCH GI/D MSP/1/N š œ 177 (16 u S ý þ > Pn = Pn1 P nm 4õ Bayes z 1 ÿ g k % û - (0 n N * L-Hospital x N P n (0e m = λ (17 / ñ Ö 3 / UVW X Pn = lim P N(t = n J(t = 1 U(t = 0 lim P N(t = n J(t = m U(t = 0 t t P N(t = n J(t = 1 U(t = 0 P N(t = n J(t = m U(t = 0 = lim lim t P U(t = 0 t P U(t = 0 P n (0 1 = = N λ P n(0 0 n N (18 P n (0e m 3 (11 (1! i ü k õ ÿ Z x P 0 i z = 1 (18 P n P n T? Ö P n Ù P n (0 T? Ö ÿ ñ 67 P n (1= u=0 P n(u=p n P N = λp N 1 ηl (I m ηl 1 (19 P N 1 = [ λp N 2 ηl + ( λp N 1 +P N (ηl+ ηm λp N 1 ηl] (I m ηl 1 (20 P N 2 = [ λp N 3 ηl+( λp N 2 +P N 1 λp N 1 (ηl+ ηm+λp N 1ηM λpn 2 ηl] (I m ηl 1 (21 P n = [ λp n 1 ηl+( λp n +P n+1 λp n+1 (ηl + ηm + λp n+1 ηm + P n+2 ηm õ' λp n ηl λp n+2 ηm] (I m ηl 1 n = N 3 N 4 1 (22 N P n = π À Å 3 π H Ö 3 õ (19 (22 < / ñ / i B 9 ƒ û - Ù S ÿ Ö 43 U V W X67 ' / P n Ò Ó š Y ' 4 àöà àã τ r (r 1 * " r Ç S ÿ # $ ñ N r = N(τr * " r Ç # $ ñ k ( J r = J(τr * " r Ç Ö Ž + Ÿ # $ ñ * õ ¹ b Ó k % - ð Ê ú û / 0 Ω = (i j i = 0 1 N j = 1 2 m m & (L M W U VWX6 7 ò Ö &% ³ P n ( P n # $ ' Ê (N r J r r 1 P = P0 P 1 P N Pn = Pn1 P nm = lim P N r = n J r = 1 lim P N r = n J r = m r r p P 6 7 ' 8 9 : ; < = > P P = P P e m(n+1 = 1? B C D 0 n N F G U V < Y I P J K L M N O P Q R S T W X P Z [ \ ] ^ _ ` a b c d U V P Z > g J K e f Z i j&k l m n ] ^ o p a 2 q N O P U V r s t u v w = > x Q R S T n y z : D V ( S n (k (n 0 k 1 m ~ I& i j ƒ S n (k Z J K ˆ Z 6 7 Š : r n Œ r + 1 n Ž Z k n a m &š œ ž Ÿ n n Ž r n Ž œ Z i F a r + 1 n Ž œ Z j; ij

6 V µ w q r Ì ö Ì Ð Ø T 178 ª«31 D V ± S n (n 0 m ~ I& i j ƒ (S n Z ² ³ ij J K I 6 7 Š : a r Œ r + 1 n Ž &š œ ž Ÿ n n Ž r n Ž œ Z i F a r + 1 n Ž œ Z j 3 œ Ž Z ž ¹ º :» Ž ¼ Z T L Ž ¾ ¼ ZÁÀÃÂ Ä p Å Ç È z Š Z < É H d = > _ S n = a k S (k n n 0 (23 U V S n J Ê N O P Q R S T Z _ ` Ë G H S n Z 6 7 J D Ì u Ï Í U Å Ñ Ò Ó Ô 8 Õ S n (k Ð» Ž Z Ö Ø η Z Bernoulli Ö» Ž Z 8 9 œ a Ù Ú Z Ž W X a n &š œ ž Z Ž Ø Ë 8 9 = > Û ζ º Ü Ý ( Þ ß 2: 1 U V (P ζ = 0 J(t + 1 = j J(t = i (1 i m 1 j m J K a n &š à Ž ž Å i á â j; 2 U V (P ζ = 1 J(t + 1 = j J(t = i (1 i m 1 j m J K a n &š 1 n Ž ž Å i á â j; 3 U V (P ζ = 2 J(t + 1 = j J(t = i (1 i m 1 j m J K a n &š 2 n Ž ž Å i á â j ã Õ Ç Û U V ä Ð å (P ζ = 0 J(t + 1 = j J(t = i = ηl (P ζ = 1 J(t + 1 = j J(t = i = ηm + ηl (P ζ = 2 J(t + 1 = j J(t = i = ηm : æèçêéêëêìêíêîêïêéêëêðêñ : æèòêóêôêõêìêíêîêïêéêëêðêñ 2 êøêùêúêûêüêýêþêÿ m a k n Z n ¼ Å b» Ž Z i œ Ž Z Ø Ë Û º < D ã G H = > U V Ì S (k 0 = ηls (k 1 0 k 1 (24 S (k 1 = ηls (k ( ηm + ηl S (k 1 0 k 1 (2 S (k n = ηls(k 1 n + ( ηm + ηl S (k 1 n 1 + ηms (k 1 n 2 n 2 k 1 ( (24 (26 I& S (0 0 = I m S n (0 = 0 m (n 1 n > 2k S n (k = 0 m (23 Ì Ç Ì G H S n (n 0 Z 6 7 J U V U V S n (n 0 m ~ S n (n U V J Ê N O P Q R S T Z n _ ` ( Ë ˆ Z i j ƒ Sn Z J K I 6 7 Š : a r Œ r + 1 n Ž ij &š œ ž Ÿ (n + 1 n Ž r n Ž œ Z i F a r + 1 n Ž œ Z j c d U V S n (n 0 Z 6 7 J m Š! " Ì (24 (26 ã H S (k (z = S (k (z = = > S (k n zn S(z = ¹ n U V S n z n [ S (1 (z] k = [ ηl + ( ηm + ηl z + ηmz 2 ] k

7 R Å Å < w w Ð q Ð Ì ; 9 # $ % & ' : ( êçêéêë * + RCH - / 0êî GI/D MSP/1/N ê ê a (27 Ì : z = 1 ; (28 Ì Í Î Ç 8 9 c d S(z = S n z n = a k S n (k z n = S(z = k=1 a k k=1 a k [ ηl + ( ηm + ηl z + ηmz 2 ] k k=1 S (k n z n (27 S(1 = S n = a k [ ηl + ( ηm + ηl + ηm] k (28 k=1 S n = S(1 n S k k=0 = j œ Q R B C ¼ N O P Z Q R S T P = S 0 S S 1 S 1 S S 2 S 2 S S N 2 S N 2 S N 3 S 1 S 0 0 S N 1 S N 1 S N 2 S 2 S 1 S U V 6 = > D j U V P F O? B C D S N 1 S N 1 S N 2 S 2 S 1 S 0 8 ; H Ð H P n w F G H I 8 J K L Ð H P n MONOPOQOROSUTWVYX[ZW\W]U^W_WÙaWbWcUd e f Þ e œ f g e J Z R KiL ÐiH y Pn out (n 0 = ß 9 1 K n Z f g e J j a t + Œ (t + 1 r j f g e J Œ I 8 J t ; Ð k Z Q R l m n ã o p = > _ Ì P 0 = P out 1 M + P out 0 (29 P n = P out n+1m + P out n L 1 n N 1 (30 P N = P out N L (31 (29 (31 Ì 8 H P out N = P NL 1 (32 P out n = ( P n P out n+1m L 1 n = N 1 N 2 1 (33 P0 out = P 0 P1 out M (34 (32 (34 Ì 8 Õ I 8 Ð k q : 8 9 G H R á r F s t f g e J œ Ž 9 w Õ Ð H v a» Ž C K Ñ Ò Ž a œ Z xzÿ Ð H i b G Z ; ~ < xzÿ Ð H Z? ã Z Ü a Ç Ÿ Ð H ¼ Í Î 8 9 Ù Ì ƒ Little G H Ž a œ xzÿ Z 6 O OTOVOZO\U]W^W UŴRW UcWd Å b C K œ Z Š Œ D Z Ž Ži œ Ž Ø Ëi b i b N 1 n O œ e f j 9 4 f& Š U V S n (k (n 0 k < n š 8 O œ Z Ž Z Ð H

8 9 > µ µ º š Ð 8 O B c 1760 ª«31 T q J K n 8 O œ Ž a K & Z y ˆ Z Ð H Å w k = P T q = k k 0 b» Ž œ RCH T ž Ÿ T q Z = > Ð H J w 0 = w k = ( P 0 + P 1 η e m 1 P loss P 1 S(k 1 0 ( ηm+ ηηl+p2 S(k 1 + N 1 n=3 m P loss J K œ P n S(k 1 n 1 ( ηm + ηηl+p n S(k 1 n 2 P loss = P N e m (3 1 ( ηm + ηηl+p2 ( S(k 1 0 ηm + ηηm +η 2 L ( ηm + ηηm +η 2 L e +Pn m S(k 1 n 3 η2 M (36 1 P loss 7 O O O D q z s t Z i ª o K s t Z «á e f Matlab Ø s t d» Ž RCH T ž Z ¹ n C K œ Z Ø = J 1 J 2 Ð å c d Ÿ R Ü Geom/D MSP/1/N œ P H/D MSP/1/N œ a Û º? J Z K L Ð H ± I œ Ž Z " Ð H J& Ø ² t ¼ ³zy Ø Z Ó Ô = 1 (Geom/D MSP/1/N Ž Z Ö Ø λ = 032 Z Bernoulli Ö» Ž Z Ø η = 01 Z x Ð H œ U V á 2 ~ D-MSP I J Ê œ Z Ë N = 1 j Ç L = ( Ø O M = ( B ¼ Z ² t = ¹ J Geom/D MSP/1/1» ¼ êþ ¾ êü À Á Â Ã Ä Å Ç È É» ¼ êøêù ü Ê ËÌ¾ Í ÄÌÅ n P nj P nj Pnj out k w k j = 1 j = 2 j = 1 j = 2 j = 1 j = (P H/D MSP/1/N» Ž á Ž á ± I Ø U V J Ê Z Ô Ó Ô Ž Z á? Ï Ð J K (T α Z 3 ~ Ä Ñ PH á I& T = œ Z Ë N = 16 j Ø O B ¼ Z ² t = ¹ J 2 α = ( : ŒiÎ 1

9 ë n š Ð q : ö º " 9 ö 9 # $ % & ' : ( êçêéêë * + RCH - / 0êî GI/D MSP/1/N ê ê P H/D MSP/1/16» ¼ êþ ¾ êü À Á Â Ã Ä Å Ç È É» ¼ êøêù ü Ê ËÌ¾ Í ÄÌÅ n P nj P nj Pnj out k w k j = 1 j = 2 j = 1 j = 2 j = 1 j = gie J 1 Z Ø? iži Ž Z ÐiHi iò yióiª a sitii= ³ÔyÕ i Ø Z Ö Geom/D MSP/1/1 œ Ž s Ø K L Ð H I 8 Ðik q Z KiL ÐiH ¾i m Ù Ú Œ Û Bernoulli Ü O C K œ Z BST ª Ý Þ 9 ß Ø t Î 1 n à g D z Ÿ e á s t f Ð Ò â Z Å b J ã ä å a J 1 D J 2 Í Î c d Ÿ Ï O œ Ž f Ð Ð H æ a ç è C s t é Ziê ; > Í Î Ž 60 k=0 w k m = w z Ÿ e á Ð H Z Ì s t (3 (36 Z ª Ï O œ Ž a K & Z ì ß : D Ì Ï á ¹ º s t I Ù Ì (3 (36 ; < Z ; I L á Û Z Little Ì ; [W q ] = [W q ] = kw k k=1 N (n 1P out n=1 n λ(1 P loss G H Ï Ø t Î 2 Ð å ~ Ç D ¹ º s t Í Î Ž ¹ º [W q ] = m ± î z e á ï ð Z D s t ñ Z e m D s t Z = ¾ í 12 x 10 4 PH/D MSP/1/16 4 PH/D MSP/1/ P loss [W q ] η 3 òêøêù ó ô õ ö» ¼ ø ù õêü ú û η 4 òêøêù ó ô õ ö È É» ¼ê êøêù Ê Ë ¾ ÍêüÌú û

10 ß ß 1762 ª«31 ß 3 ß 4 Ð å ü ý Ÿ» Ž η Ï Ï O œ Ž Ziþ ÿ ß&Ï ß d P loss [W q ] ¹ n Ë Ï Ø η Z G Ø η Z» Ž n Å b» Ž Ï T K t a Ù Ú Z Ž W X œ Z ß Ï ë b 0 Ž w O œ C K ¼ Å b» Ž Z Ï ñ a Ù Ú Z Ž Z 9 ß K Ž a K & Z æ ß Ï 8!#" ÄiÑ%$%& G Ë%' iö b %(% U V iîirif Z%*%+%-0/%' iš Ÿi» Ž á 1 D-MSP Z Š C K œ 2 å b 3 œ 4 á 1 j 4 D-MSP ß 6 Ç 7 Ú 4 «d á Â ªi 9iª æ : á 1& 4 ; < Øi = ³ > = G 4? 9 Ç f Ð 4 B œ f C D &š f F 4 G H I J%K í%l M %4 ;%< N O P%Q R%S%T%U%V%L%M%W%X%Y%Z %[%\%]%^%_%` 4%a%b%c%d%: L%M%C%e%f%g%%i%j%k%l 4%m%n%o%p%q%r s t u v c d w x y z v ~ ƒ [1] Hunter J J Matematical Tecniques of pplied Probability Vol II [M] New York: cademic Press 1983 [2] ˆ Š Œ Ž [M] : š œ 2008 Tian N S Xu X L Ma Z Y Discrete-time Queueing Teory[M] Beijing: Science Press 2008 [3] Gelenbe Queues wit negative arrivals[j] Journal of pplied Probability : [4] Harrison P G Pitel Te M/G/1 queue wit negative customers[j] dvances in pplied Probability (2: [] Zu Y J nalysis on a type of M/G/1 models wit negative arrivals[c]//proceeding of te 27t Stocastic Process Conference UK 2001 [6] ž Ÿ ª «[M] : š œ 1999 Si D H Te Density volvement Metod of Stocastic Models[M] Beijing: Science Press 1999 [7] Yang W S Cae K C note on te GI/M/1 queue wit poisson negative arrivals[j] Journal of pplied Probability : [8] ± ² RC ³ µ GI/M/1 ¹ º» ¼ [J] ¾ š š À : Zu Y J Gu Q F GI/M/1 queue wit RC strategy of negative customers and working vacation[j] Journal of Jiangsu University : [9] tencia I Moreno P Te discrete-time Geo/Geo/1 queue wit negative customers and disasters[j] Computers & Operations Researc : [10] tencia I Moreno P single-server G-queue in discrete-time wit geometrical arrival and service process[j] Performance valuation 200 9: 8 97 [11] Œ Á Â Ã Ä Å Ç Geom/Geom/1 [J] ¾ š š À : Zu Y J Ma L Qu Z F et al class of Geom/Geom/1 discrete-time queueing system wit negative customers[j] Journal of Jiangsu University : [12] Bocarov P P Stationary distribution of a finite queue wit recurrent flow and ian service[j] utomat Remote Control : [13] Samanta S K Gupta U C Caudry M L nalysis of stationary discrete-time GI/D MSP/1 queue wit finite and infinite buffers[j] 4OR: Quarterly Journal of Operations Researc 2009(7: [14] Neuts M F Matrix-geometric Solutions in Stocastic Models[M] Baltimore: Te Jons Hopkins University Press 1981 [1] lfa S Discrete time queues and matrix-analytic metods[j] Top 2002(10: