,, 2015

Transcript

1 ,, 2015

2

3 ,

4

5 5 4.7., ё γ

6 6 Щ ; ; ; ; ; ; ; ; ; ; ; - ; ; ; ; ; ; ; ; ; ; ; ; ; ; ; ;

7 7 А. 50 %. -, ( ) - ( ) ( ) [1] , % , - [2]., 50 % -,, - [3]., ,,., - ( ).

8 8, ( -320), % [4]., ( ) - ( ). ω( ) [5]., ω( ),,,,.. -, - ω( ) ( ), -., -,, ( ) [6] ,

9 9, -. ( ) , -. я ( 0109U002620), % - ( 0109U008453). Ц я ,. : -1000; ω( ) - B U ( ), ; ω( ) B U ( ) -1000;

10 10 γ- - ; я: я: я:, - ω( ), ω( ) - - ω( ) B U ( ) -1000;, - - γ- -, я : -1000, -,, - ω( ),, - ω( ) B U ( )

11 11, ω( ) B U ( ), ω( ) B U ( ), ω( ) B U ( ) -1000;,,, - -, -, ; -1000, -, ω( ) B U ( ),,, я. - ω( ) B U ( ) -, -1000,

12 12 ω( ) B U ( ) ω( ) B U ( ), ( ) - ω( ). 1. -,, -. я. [7]. - : [8] - - ; [9, 15, 16] - ; Д11Ж - - ; [12] ; [10, 13 14], ω( ) B U ( ); [17] А я. :,, 2010, ; The 3rd International Conference Current Problems in Nuclear Physics and Atomic Energy, 2010, Kyiv, Ukraine;

13 , 2011, ; 7-,, 2011,, ; XXI., -,, 2011,,.. 12, 8, (2 SCOPUS), 1.. c,, 49, 9,,,

14 , (. 1.1) , 235 U,, -, - [18, 19] , -,, -, - ( ), - [20, 21]

15 15, -,, :, - ( ) ( ), [22]., ( ) ( ) - ( ) - ( )., -,,, , - [9, 15, 19] ( ) I-131, Cs-134, Cs-137, - U-235,,.

16 16 I-131, Cs-134, Cs-137 -, ( ). - -, ( I , Cs-134 Cs ,1 - (. 1.2). 1.2 : 1 ; 2

17 17 : 1) 5. 0,4 0,5 ; 2), -, 4., 0,1. - [23]. - x , ,, -. - (. 1.3).,, -, -. [24].

18 : 1 ; 2 ; 3 ; 4 ; , , -,, ,,

19 19 ( ) Kr-85 Xe-133, -., -, (. 1.4) : 1 ; 2 ; 3 ; 4 ; 5,,. -, KЫ-85 Xe , - Kr-85 БО , -,.

20 20, , - -, ( )., γ- - (. 1.5). 1.5 γ-

21 21-331, (312) (19). -. γ-, [8]., n, - γ-, -. -, -, ( γ- ). -, - γ-, - [25, 26]. - (. 1.6) : 1 ; 2 ; 3

22 [25] [9]. 1.8

23 23 -, -. -, ,.,, -1000, : ; ; [8, 11, 24 26] , -., -1000, [5, 7, 16, 24, 27].

24 ( ), : N, AO N N 24, (1.1) N N N -,,., -1000, H Q ( t = const ) ( t Q = const ) H H ( - ) H ( ) Q Q H H -, - / t 0 -, - / t 0 ( t = const Q = const) ( t = const ) ( t = const ) ( Q) G G C H 3 BO 3 C H 3 BO 3

25 ( ), N (. 1.9). 1.9 : 1 ; 2, 1-,, -. [12, 27 29] , - -., ,

26 26,, - [30] c -1000, [31, 32]. -,,, - - [0 38]., -1000,,, ( ) [5] - -88/97 ( ) [39]. [5]., - - 0,2 %, 0,02 %.

27 27, 1 %, 0,1 %., [5]: 1200 C; -, ; 1 % ;.,, -. ω( ) -1000, ω( ), - ( - ), ω( ). -,. -, -, - [40].,

28 28 ω( ),, [6]., ( ),,. -,, -. -,, -, [40]., , , - -,, -.

29 EPRI ( ), - PWR , PWR [41]: - ; ; (20 %). [40], - 20 %., , , - [42] (100 %), - ( ),,

30 30, - ( ) [43 45] , -,, - [46, 47]., 20, ( ) «-.,,» , -, 10 % [21]., %,,, -.,, -.

31 31 [21] : «,»., : -,,, [30, 37, 48] ,, -, 1,5-2, - [22, 30] , [49 55] , -, , ( ), -, [40].,, -

32 , - [56, 57].,, ( ), [13, 22, 40, 51, 58]. -, [49, 50, 59].,, -, -,,.. [19, 60].,,, [30, 34 36, 38, 46]., - - (,, ) [61, 62]. [47] -, : 1) ; 2), ; 3).

33 33, -,,,,,,. 50 % -,,,, -, ( - ), - ( ) ( -1) [47, 51]., [47]. [47], -1000,, -, -1000, , -. [6, 22, 40, 56, 57, 63, 64] -

34 34, -1000,. ( ) -, «- - - ω( ) - -» [40]. - - ω( ) -1000, - ω( ) [6, 22].,, - ( ), -. Eff -, -, - -, - Eff. -, [40] ω( ) [64]. -, : 1) ,,

35 35,, -. 2) ) -1000, -,, -. 4) ω( ), -1000,. 5) - - ω( ), ω( ). 6) , -1000,,,, etc. -. -,,

36 ,, [18, 19, 27, 67, 68] ,. - [52]., , ( ) :, - [33, 49, 51]., , -, , 26, 30, 37, 54,

37 : 1). 2) ё. 3), /. 4),,. 5). 6) ω( ),,.

38 , -,, -. ω( ), -, ,, -.,...., [70]. -. -

39 , [40] : «-,,, -,» , [66] - N: m i 1 39 min ( t t ), (1.2) i N ( N); m N - N. (1.2) -, -. ( ) N, % N t const, 2- p II = [5,8 6] [22]. 2- ( -2), e ( - ) -1000, -

40 (1.2),, 40 t const [66]. [66] [71] t const 1,5, t const ( ), - I - q l, [13, 14, 40] [19, 33] , - [5]. щ : :,, [22];,, - [6, 9, 15, 56, 57, 73].

41 41 C , - [72]. щ c : [74] c : ; [75]., -, -1000, - -, [16, 17, 22, 28, 57, 66] , -. - : ω( ) -

42 42 B U ( ) ω( ) B U ( ) γ ,, -,,. 2., ω( ),., ,

43 43 - t const, ω( ), «-».,

44 ( -, -,, -, ) ( ), ( ) [40]., -, - ( ), - [76]. 2.1., , - [22, 51, 70, 77, 78]:,,, - 10-, -..

45 45 -, -1000, 9- [51].,,, [9, 15]. 2.1 : 1 - ; 2, - - ; 3, ; (1/6 ): 1 - ; 2

46 ω( ) -1000, [40]. [6, 22, 40, 63, 64], -, : ( ) ; ( ) 1, 2, 3 4-,, : ( 82) - ; 1, 2, 3-7, 4-6 [40].

47 47 : « » -, 1-5, 2-30, 3-10, 4-43., 7 : ( 3) - Eff - [40], ( 18) [79] [55, 70]. : ; -1000;

48 48 ;, , % Д99]. : -,., m= 8 ( ). i- ( ) j (i, j). :, i j (i, j) q l,, i, j kv, i j ql, (2.1) q l, k v i, j, (i, j); < q l > ( / ), < q l > = 168,5 134,8 / N = %,. [60],, i j q l, (i, j) :, (2.2) q l, i, j ql, j,max ki, j e q l, j, max j- ; k, (i, j). i j k v i, j, -, - ( ), [55].

49 B ( ) (i, j) : i, j Q, ( ) d i j B, ( ) i j, (2.3) m 0 i, j Q ( ) (i, j), ; i, j m, (i, j), ; i j, -1000, j-, ё,, , 16 ё,. 6 ё, 365, 1460, 9,1, 7,73, 0,69, 7,57, 0,24, 0,08

50 2.2 ё,, 10,6, 1,385, 11,8, 12,75, % 100, 0,1, 20 -, 25, 2, / 3 10,4-4 SR 8, 44,25, 10 U-235, % 4,4, 3 0,21, 3 0, 3 / N = N, ,, / 5, , : 50 - t const

51 2.2 ё N = % II Г я : N N 1 =100 % N 2 =90 % 0,5 ( ) N N 2 =90 / ) % N 3 =80 % 2,5 ( ) N 3 =80 % 4 ( ) N N 3 =80 % N 1 =100 % 2 ( ) 51 p II = dn 1-2 /Н = 2 %/6 dn 2-3 /Н = 0,4 %/6 N 3 =80 % dn 3-1 /Н = 1,0 %/6 Г я я УЗ: N = % max H =4 % я У [16]: N = N - 15 N N 90 % N 0,5 N 80 % 2,5 ё N = 80 % 4 N N 2. А З: :, 1/6 ( ), 1/6, N; 1, 2 3-7, 4-6 ; 82 ( ) -. Q ( ) (i, j) i, j (2.3) B ( ) i, j 4-, - (. 2.1), -,, (. 2.2) [80].

52 ( ) /, - - ( ), - - -, [60]. «Femaxi», [81]. - :,, ;, ;, - [7, 15 17, 22].

53 ω( ) -1000, -, -, ( ) -1000, ω( ) [16] , [82]: ; ; - SC4, ω( ) - : [83, 84]: ( ) i NC i d 1 lim, lim (2.4) N Ci 0

54 N C i lim N C i i-, ;, ; lim -. K SC4 10, ( 2.) [40, 82 84]: K SC1 SC2 SC3 SC4 SC lim, lim 250 max e 1,2 < ( T, ) 0 lim P P 1, ( ) - (2.4) lim, 1,5 10 lim 0,5 % 1,2, SC1 SC5 - [83]: SC1

55 , ( ) ; SC2 max e ( T, ), - 0 «-»; SC3 - P, - ; SC5 - -,,, -., SC4 SC1 SC3, SC5 ω( ), -1000,, SC4, SC4 [40] , - SC4, [84]., 6 8 SC4 [83]. SC4-1000, -, ω( ) SC4 - : 55

56 , 56 lim N C i lim ω( ), ( - ) [40]; SC4, ω( ),,, - щ ν << 1 [61, 85]., SC4,, SC4, ω( ) - [10, 12, 16]. - : ;,,

57 ,, [40]; A 3 [5]; ω( ), [22, 40, 56]. ω( ) SC4, K = 10, 57 -, SC , щ [22, 87]: ω( ); ω( ) ν << 1, [61, 62, 85]; 5 K - [40]: K SC4 [28, 29, 60]. - ( ) e p e d / A0 1 ; 0 A0 : lim( da/ d ) 1 0 0, (2.5) ( ) ; A 0 A( ) - 0, / 3 ; e ( ), p ( e ) ( ) - ( -1 ),.

58 -, A A 0 = 55 / 3 [40]. - A 0 = 30 / 3 5 ( ). A 0 -, [7, 10, 12, 17, 22, 56, 57] ( ) - p e -110, - MATPRτ-A, -4, : -1000; ;, -110 [13]. ); p e ( -1 ) t ( ) [86]: C e 1/ 2 p e K ( e B e )exp( 10000/ R T) t, (2.6) K = 5, ; B = 7, ; C = 4, (,,

59 (E > 1 ), 1/ 2 ; e, a; R ; T, K;, [60]:,, e 59 e ,5[( z) z ], (2.7) z, - d ( P P ) d P ]/( d d ), (2.8) [ ci co [ d ( P P ) d P ]/( d d ), (2.9) z ci d ci, ; P co ; P, a; d co, ; P, a.,, : co co ci ci P 2 Ec uc ( rco rci )/ rci, (2.10) r ci, r co, ; u c, ; E c, ; u, (2.11) c u f u f, ; o, o,.

60 ω( ) B U [6 8, 10 14, 22, 29, 60, 63 66, 81]: ; ; 1. ; 2. ; 3. ; ; ; , [60]: q > ; < l, i, j ; -1000;.

61 :, [40] FEMAБI, , - NEA Data Bank [60]., 50 / -U, -1000, [81] ω( ) B U, -1000,, ω( ) B ( ) U

62 ё ω( ) B ( ) U

63 ω( ) B U -1000,, ω( ) B U ω( ), - -,, ω( ), ω( ), -1000, A ω( ) B ( ) U ω( ) B ( ), U ω( ) B ( ), - U

64 [6, 22, 63], ( )., ω( ) B ( ) [40]. U : 1) ω( ), ω( ) ; 2) B ( ), - U (1- B Lj max{ Effj 1- }, lim L max,* 2 Lj (1- j ) (1 - lim lim,* 2 L (1- ) (1- * j ) 2 lim,* (1 - B ) 2 min,* j ω( ). : (.. 2.1). -, -1000, [87]: ) 2 lim,* ; ) 2 (3.1) lim, lim ω( ) lim B B ( ) : opt max lim j ; opt lim j ; lim min opt B Bj B. (3.2)

65 : 65 lim,* max,* j lim,* 1; j 1; B B 1, (3.3) * lim,* min,* j max lim lim,* 1-1- max,* j ; ; opt j opt 1-1- lim lim,* 1-1- * j ; ; opt j opt 1-1- min,* min lim,* lim opt B B / B ; Bj Bj / B. (3.4) [87], : opt min{ max }; min{ j }; B opt max{ B min }. (3.5) j opt [87]: opt lim,* lim,* lim,* B. (3.6) j, lim, lim lim B : lim opt lim (1- )(1- ) lim (1- ) B 1- ; B. (3.7) opt opt 1-1- lim opt FEMAБI, MATPRO-A [60], - A 0 = 30 M / 3, (1460 ) B(1460 ) Д16, 22, 88Ж: 1) - ; 2) ; 3) N = %; 4) ( ) B( ) j = 3 18 = 365 М (I), 730 (II), 1095 М (III), 1460 М (IV). 3.1, 3.2.

66 3.1 - j ( ) A/ A0, B, % M / I II III IV I II III IV 7 1,125 2,976 5,771 6,099 16,28 33,70 48,66 55,76 6 1,169 3,941 7,186 7,512 18,55 37,95 54,66 62,49 5 1,173 3,398 5,991 6,232 19,62 39,86 57,13 65,29 4 1,120 1,923 4,200 4,383 20,10 40,54 57,85 66,05 3 1,036 1,118 1,617 1,710 19,97 40,01 56,86 64,86 7 1,244 1,569 2,720 3,979 11,95 29,20 42,34 54,74 6 1,397 1,931 3,237 4,636 13,72 32,79 46,80 60,47 5 1,404 1,516 2,149 3,212 14,60 34,23 48,43 62,39 4 1,357 1,375 1,441 1,657 14,95 34,62 48,56 62,37 3 0,564 0,636 0,797 0,895 14,84 33,98 47,37 60,76 7 1,144 3,306 6,112 17,29 34,79 49,32 6 1,167 4,115 7,222 18,98 38,44 54,67 5 1,169 3,355 5,839 19,59 39,86 56,91 4 1,090 1,700 3,936 19,51 39,96 57,26 3 0,706 0,995 1,452 19,03 39,06 56,07 7 1,137 1,577 3,630 3,722 16,22 31,50 46,10 50,42 6 1,186 2,116 4,644 4,738 18,42 35,70 51,97 56,80 5 1,179 1,608 4,050 4,139 19,52 37,76 54,65 59,75 4 0,922 1,126 2,395 2,467 19,96 38,53 55,48 60,61 3 0,841 0,916 0,921 0,943 19,77 38,01 54,53 59,56 7 1,220 2,140 3,646 3,739 13,63 31,06 44,66 49,25 6 1,328 2,795 4,525 4,624 15,75 35,16 49,87 55,04 5 1,315 2,066 3,657 3,746 16,72 36,77 51,81 57,20 4 1,059 1,262 1,856 1,899 17,24 37,34 52,26 57,68 3 0,715 0,759 0,815 0,828 17,20 36,82 51,18 56,48 7 1,220 2,168 3,328 4,674 13,54 31,04 43,53 55,92 6 1,333 2,844 4,283 5,740 15,68 35,18 49,09 62,69 5 1,324 2,164 3,599 4,937 16,70 36,89 51,48 65,49 4 1,065 1,275 1,812 2,614 17,17 37,34 52,07 65,96 3 0,735 0,767 0,835 0,983 17,06 36,68 51,05 64,44 7 1,233 1,779 3,671 5,128 12,02 29,28 43,75 56,55 6 1,389 2,646 5,036 6,585 13,85 33,70 49,91 63,88 5 1,394 2,045 4,462 5,908 14,74 35,35 52,27 66,70 4 1,075 1,352 2,632 3,794 15,15 35,81 52,91 67,28 3 1,020 1,191 1,261 1,482 15,06 35,23 51,96 65,90

67 j ( ) A/ A, - 0 B, % M / I II III IV I II III IV 7 1,243 1,726 3,699 5,033 11,95 29,37 43,90 56,31 6 1,396 2,238 4,696 6,128 13,72 33,14 49,37 63, ,402 1,565 4,021 5,313 14,60 34,66 51,70 65,66 4 1,026 1,356 2,311 3,236 14,95 35,05 52,36 66,17 3 0,952 1,223 1,263 1,308 14,84 34,47 51,47 64,85 7 1,126 1,603 3,657 3,760 16,28 31,55 46,16 50,75 6 1,170 2,183 4,707 4,810 18,55 35,83 52,10 57, ,174 1,657 4,110 4,207 19,62 37,86 54,76 60,14 4 0,932 1,122 2,447 2,527 20,10 38,67 55,62 61,04 3 0,807 0,901 0,941 0,973 19,97 38,21 54,73 60,04 7 1,219 2,222 3,733 5,143 13,63 31,13 44,73 57,54 6 1,328 2,879 4,613 6,143 15,75 35,20 49,91 63, ,315 2,312 3,932 5,382 16,72 36,99 52,03 66,46 4 1,185 1,269 2,107 3,108 17,24 37,69 52,60 66,97 3 0,834 0,941 1,011 1,158 17,20 37,23 51,58 65,52 7 1,137 2,942 5,718 7,405 16,22 33,64 48,60 61,00 6 1,186 3,871 7,075 8,840 18,42 37,82 54,53 68, ,179 3,353 5,946 7,246 19,52 39,76 57,03 71,04 4 1,126 1,860 4,128 5,187 19,96 40,41 57,71 71,61 3 0,722 1,041 1,572 2,162 19,77 39,81 56,65 70,05 7 1,233 1,779 2,881 12,02 29,28 41,76 6 1,389 2,646 4,031 13,85 33,70 47, ,394 2,045 3,405 14,74 35,35 49,94 4 1,070 1,351 1,710 15,15 35,81 50,54 3 0,734 0,857 0,960 15,06 35,23 49,61 7 1,144 2,979 5,516 5,660 17,29 34,54 49,01 53,33 6 1,167 3,632 6,386 6,516 18,98 38,05 54,26 59, ,169 2,679 5,099 5,190 19,59 39,22 56,14 61,24 4 1,090 1,219 3,121 3,199 19,51 39,18 56,28 61,41 3 0,808 0,995 1,088 1,117 19,03 38,17 54,90 59,93 7 1,220 2,168 3,481 3,718 13,54 31,04 44,18 51,28 6 1,333 2,844 4,313 4,559 15,68 35,18 49,19 57, ,324 2,164 3,402 3,606 16,70 36,89 51,09 59,26 4 1,065 1,275 1,661 1,751 17,17 37,34 51,29 59,48 3 0,689 0,767 0,813 0,862 17,06 36,68 50,08 58,08 67

68 ω( ) B ( ) - U , -,, : ω( ) B ( ) - U ω( ), B ( ) ; 3 -, ω( ), : 3( ) = [0,828 %; 7,512 %], 3 ( ) 3,93 % 1,944 %; 18 -, ω( ), : 18( ) = [0,862 %; 8,84 %], 18 ( ) 3,95 % 2,066 %; 3 -, ω( ), : B ) = [49,25 / -U; 67,28 / -U], - U ( 3 B ) 59,63 / -U U3 ( 3 5,028 / -U; 18, ω( ), : B ) = [41,76 / -U; 71,61 / -U], - U ( 18 B ) 59,63 / -U U18 ( 18 7,062 / -U; 3 18 ω( ) 6- ; U

69 3 18 B ( ) U 69 4-, [6, 22, 87], - ω( ) B ( ), ω( ) - U, B ( ) U,. : 1) ω( ) - ; 2) B ( ), ω( ) -. lim 13 %, (3.1), Eff. (3.5): opt 7,512 %; opt 3,93 %; B opt 49,25 / -U. (3.8) (3.7): lim (1-0,13)(1-0,0393) 1-0,096; (3.9) 1-0,07512

70 70 lim (1-0,13) 49,25 B 46,33( / -U) (3.10) 1-0,07512 (3.2): 0,07512 max j 0,13 (3.11) 0,0393 j 0,096 (3.12) min j 46,33 B 49,25 (3.13) (3.11) (3.13), (3.3), (3.4): lim lim,* 1-1 0,13 0,941 opt (3.14) ,07512 lim,* 1-1- lim opt 1 0,096 0, ,0393 (3.15) lim,* lim opt B B / B 46,33/ 49,25 0,941 (3.16) : max,* * min,* j 0,941 j 1; 0,941 j 1; 0,941 B 1, (3.17) max max,* ,07512 max,* , ; 0,986; opt 18 opt , ,07512 * ,0393 * , ; 1; opt 18 opt 1-1 0, ,0393 min,* min opt 3 3 B B / B 49,25/ 49,25 1; B B / B 41,76/ 49,25 0,848; max min,* min opt (3.1),. L lim 0,102 ; L 3 0 ; L 18 0,153; L3 0 L18 0,153 Eff ; Eff , 5 lim 18 (. 3.3). lim L 0,102 L 0,102 j T 3.3 min, % j, % B, M / Eff j max j 3 7,512 3,93 49, ,840 3,95 41,76-0,5 j

71 , - ω( ) 71 B U, -1000, -, 3 18., Eff 18 0,, min 18 B 41,76 M /,.. - B lim 46, 33 M /. min 3, B 49, 25 M /, B. lim N=100 % ё - [19] ё - [54]. ω( ) B ( ) (,, 290 ) , ω( ) , B ( ) 4- (. 3.2). U U

72 ω( ) B U ( ) -1000: 1, 2, 3, 4 1-, 2-, 3-4-, ,, ω( ) B ( ) U

73 , N % ( 3.) N [7, 10, 12 17]: N % 0,5, ; N % 2,5, - ( 3.)

74 %; «-», [51, 55, 71] , ω( ) 3 6-, 4- (. 3.5, 3.6). 3.5 ω( ) -1000: 1, 2, 3, 4 1-, 2-, 3-4-, B U ( ) 3.6 ω( ) B U ( )

75 N [7, 10, 12 17]: N= N 5 ; 5 N 50 %; N = 50 % 40 ; N % 3 ( 3.7) ,, %, 9-, (. 3.8)

76 , ω( ) , 4- (. 3.9, 3.10). 3.9 ω( ) B U ( ) -1000: 1, 2, 3, 4 1-, 2-, 3-4-, 3.10 ω( ) B U ( ) , -

77 4, N 50 % [7, 10, 12 17] , ω( ) 3 6-, - 4- (. 3.13, 3.14).

78 ω( ) B U ( ) -1000: 1, 2, 3, 4 1-, 2-, 3-4-, 3.14 ω( ) B U ( ) ω( ) B ( ) U, -1000,, ( 3)

79 79 ( 18) ω( ) - ω( ) : 3: ( ) = [0,828 %; 7,512 %], ( ) 3,93 % 1,944 %. 18: ( ) = [0,862 %; 8,84 %], ( ) 3,95 % 2,066% B ( ) ω( ), : ( ) U,3 B = [49,25 / -U; 67,28 / -U], - U B ) 59,63 / -U - U,3 ( 3 5,028 / -U; B ( ) = [41,76 / -U; 71,61 / -U], - U,18 B ) 59,63 / -U - U,18 ( 18 7,062 / -U. 3. Eff -1000, - ω( ), ω( ) B ( ) U ω( ). 4. ω( ) 6- -,. 5. B ( ) - U , 4-5-.

80 80 6. ω( ) B ( ) 3, U ω( ) 6-, B ( ) 4- U -1000: ; ; ;. 7. ω( ) B ( ), , - -, -, -, (~0,44 ) ,. U

81 [19, 33, 40]: (Δρ). ; - -. ( ) - ( ), - -. [19, 33]: ( 235 U 239 P) (, ). - ;

82 82, ;., B ( ) ( ) U ω( ) ( ). - (. 4.1) , (t). u(t), ё f(t). -, B ( ) ω( ). U

83 83, - -., - [89, 90] [33, 70, 77]:. Ш. N XE t, (4.1) ρ ; ρ, - 1- ; ρ, ; ρ, ; ρ N, ; ρ XE, - ( ) ; ρ t, -.,, ; ; 1- ;

84 84., ( ).,, -,, -, -.,,,,,, - ( ), [18, 91]. - N. - N N= const. - (. 4.2). 4.2

85 85, (ρ,0 ) (ρ,1 ), (t). u(t), ( 5 +5%) ρ. u(t) / -, ρ N, ρ. ρ,1 ( 290..), -, u(t) -, (ρ, ρ XE ) ρ.. const, : ρ t =0., f(t) ρ=ρ, [92].. 5 [79]

86 : 1, 2, 3 4 0, 80, c, - - [77]., [79]: ai ( h h0), (4.2) i i,,..; a і,

87 4.1, , , , , , , , , , , , -, i-, / ρ (C ), C 0 C [78, 93, 94]: C ( C ) dc, (4.3) 0 f ( C ) C [79]: 5-1,58 %, (4.4) / ( ). (. 4.5).

88 : 1, 2, 3, 4 N = 1500, 2100, 2700, 3000, - Д95 98]: 1) : dc T4 C k4 G,, (4.5) d

89 89 ) 4.5 2) : ) ( ) ( ) dc T5 C k5 GH O, (4.5) 2 d C, ; k 4, k 5, / ;

90 T 4, T 5, ; G, ; 90 G H2 O,., G 40 /, G H 2 O 40 /. : 3 3 k 4 40 ; k 16 ; 5 T 22,3 10 ; 47, T5, / - / k 4, k 5 2,5, T 4, T 5 2.,,. - :W W p k G TsC C s, (4.6) C бор, / ; k, ; G ( ) ( ), / ; T,., - ( r, ) q v. - ( r, ), - q v

91 91,. - ( ), ( ) , [33, 77, 78, 88 92, 95 97]. 4.6 щ : h ; C.

92 : Q ; t i і- ; ; t 1. щ : t ( ) : : (N) ; : B( ) ω( ). :.

93 93, -. - ( ), , - ( N ),,.. B( ) ω( ) ( ) -1000, - (. 4.9).

94 : (H ); (C ); (T =const); (P j ). : (Q); ; γ, , -, ( ) B( ) ω( ),.., / (. 4.10). : γ-. : B( ) ω( ).

95 ( ) -, -1000, [5, 39, 99]., -, :,, ; ; ;

96 4.11

97 , ( 0,25 /, -,, 0,0016 / );, - ; -,, - 16 / , -, -. ( ) -,,. ( ). ( ) -,. - щ ( ).,,

98 (. 4.13).

99 : ;,, - ;, - - ;, -. :, ;

100 100,, -, [24, 83]. -,,.,, -,,. ( ) -., -.,, - щ.,,. щ, :

101 101 ; ; ;. ( ) - ω( ) B( ).. ( ), , (290 ). 1- :. 2- : - ( ),.. ω( ) B( ). 3- : ω( ) B( ) :. -, -,. -.

102

103 , D ( 166) D,. - φ max 180º , - γ- D,. -

104 104,, -,.,.. [24, 26]. XOY , 331, ( 4.2) / UO 2 H 2 O Zr Cs 134 (1365 ) Cs 134 (1167 ) Cs 134 (1038 ) Cs 134 (802 ) Cs 134 (795 ) Cs 134 (604 ) Cs 134 (569 ) Cs 134 (563 ) Cs 137 (661 ) Ru 106 (1050 ) Ru 106 (622 ) Ru 106 (511 ) Eu 154 (996 ) Eu 154 (1004 ) Eu 154 (1274 )

105 105., , : 331 ; 22.5 ; 1º;, (φ ). - γ-. - γ-, n- γ- m- (x m, y m ) D (x 0n, y 0n ) : AD, - (x 0n, y 0n ) m- ; CD, - (x 0n, y 0n ) (x, y ). AD :, (4.7)

106 : ; 106 ; (4.8) CD : :. ; ;, (4.9) (4.10) 4.7.,, m- -, φ ( 4.) AD CD. φ :, (4.11) i- (x i, y i ), γ-, d i. : ; ; (4.12). :, (4.13) m- i- :

107 107 -, - φ, : A m ( ( y 2 m 4 x 2 m y m 3 x m 1.14) 1.15), (4.14) :, (4.15) -,, -,, γ- - ; : ( xi x0 n) ( yi y0 n) ( xm x0 n) ( ym y0 n), (4.16) 4.8. ё γ- m-, γ-, i-, γ (4.17) γ-

108 108, (4.17) R, ; d i,. i- γ-,., γ- UO 2. γ- m- - UO 2 :, (4.18) γ- :, (4.19) γ- m- : G ( xm x0 n) ( ym y0 n), (4.20) γ- (, ):, (4.21) γ- :, (4.22) γ- m- - :, (4.23), (4.24) ( - ) A m, m=1,..., 312, -

109 109 n- :, (4.25), Θ ΔΘ=1.,, :, ,, N E = , N E =3

110 , N E = º , N E = , N E = º

111 111.,, -., - 70º , -,. 2. -, -,,,

112 ,., - : , -,, - ω( ), -, ω( ) B ( ), - U ( ) ω( ) B ( ) - U -1000, 3 -, -, ω( ) B ( ) 6- - U ( ), 2,21 2,65, 4-, 1,33 1,77, -.

113 113 3., - B ( ) - U ω( ): 3 B ( ) ω( ) B ) = [49,25 / -U; 67,28 / -UЖ, - U ( 3 U B ) 59,63 / -U U3 ( 3 5,028 / -U, 18 B ) = [41,76 / -U; 71,61 / -UЖ, - U ( 18 B ) 59,63 / -U U18 ( 18 7,062 / -U. 4. ( ), -,,,,. - ω( ) , -, ω(τ) B U (τ),

114 114,, ω(τ) B U (τ), -.

115 / Д..,..,...Ж //. XX.. -. : -, ,. - /.,. // :,, /[..,..,..,..]..:, : 5,6 ( 6000 )...: -, ( / - - ; (. 1)) ( , -89)..:,, Pelykh, S.N. A method for minimization of cladding failure parameter accumulation probability in VVER fuel elements / S.N. Pelykh, M.V. Maksimov, M.V. Nikolsky // Problems of Atomic Science and Technology. Ser. Physics of Radiation Effect and Radiation Materials Science Iss. 4. P , /.. // (39)

116 116 8.,.. - /..,..,.. // (128) Pelykh, S. N. Estimation of local linear heat rate jump values in the variable loading mode / S. N. Pelykh, R. L. Gontar, T.. Tsiselskaya // Proc. of the 3-rd ТЧЭ. МШЧП. CЮЫЫОЧЭ ЩЫШЛХОЦЬ ШП ЧЮМХОКЫ ЩСвЬТМЬ КЧН КЭШЦТМ ОЧОЫРв. K.: Institute for Nuclear Research, P ,.. / M.. MК,..,.. -,.. // (36) , /..,..,.. // (35) MК, M.. - / MК M..,..,.. // (40) , /.., M.. MК,..,.. // C :, / C..,..,..,.. // C , 50-. «-» ББI.,.. 1. : ,

117 Pelykh, S. N. Estimation of local linear heat rate jump values in the variable loading mode / S. N. Pelykh, R. L. Gontar, T. V. Tsiselskaya // Nuclear Physics and Atomic Energy VШХ. 12, 3. P , /..,..,.. // , , /.. // (39) ,. /.,...:, ,.. /....: -, ,.. /..,..,..,.. // , , /..,..,... // , Pelykh, S. N. Grounds of VVER-1000 fuel cladding life control / S.N. Pelykh, M.V. Maksimov, V.E. Baskakov // Annals of Nuclear Energy Iss. 58. P : -, ,.. /..,..,..,..,.. // :,,

118 , G01σ 29/46. - /..,..,..;..,..,.. - Ю ; ; ,. 23/ , /..,..,..,.. // " -, "., 22-23, , :...:, Pelykh, S.N. Theory of fuel life control methods at Nuclear Power Plants (NPP) with Water-Water Energetic Reactor (WWER) / S.N. Pelykh, M.V. Maksimov // Nuclear Reactors / A.Z. Mesquita. Rijeka, Chapter 10. P Model of cladding failure estimation for a cycling nuclear unit / M.V. Maksimov, S.N. Pelykh, O.V. Maslov, V.E. Baskakov // Nuclear Engineering and Design VШХ. 239, 12. P / M.. MК,..,..,.. // ( -320): : : ( ): / :,

119 , //..,....: -, ,.. /..,..,.. // Щ... -., (16) , /..,..,.. // Щ , (17) : /.. 32/ , /..,..,.. // Щ (28) /.. 32/ , / ( ) /..,..,..,....: ( ), ,.. /... SККЫЛЫüМФОЧ: PКХЦКЫТЮЦ AМКНОЦТМ PЮЛХТЬСТЧР, Fuel R&D to Improve Fuel Reliability / R. Yang, B. Cheng, J. Deshon et al. // Journal of Nuclear Science and Technology Vol. 43. No

120 ,.. - /..,..,... // C :, /..,..,.. // /..,..,.. // : / /93.., ,.. /..,..,.. // Щ... -., (14) , /..,.. // І (8) ,.. /..,....:, , /.. //

121 , /.. // , /..,..,... // , ,... /..,..,....:, ,. - /.,.,.,. // , //.....: , /..,.. -,.. // , ,.. /..,..,.. // , ,.. - /..,..,.. // (44) , G 21 C 7/00.

122 122 /..,.., -.,..;.., -..,.Є, ; ; ,. 21/ , /..,..,... // ,. / :, ,.. /..,..,... : -, ,.. /..,..,.. //.... :.., Pelykh, S. N. Theory of VVER-1000 fuel rearrangement optimization taking into account both fuel cladding durability and burnup / S.N. Pelykh, M.V. Maksimov // Problems of Atomic Science and Technology. Ser. Physics of Radiation Effect and Radiation Materials Science Iss. 2(84). P ,.. - /.., M.. MК // (87) Pelykh, S.N. Model of cladding failure estimation under multiple cyclic reactor power changes / S.N. Pelykh, M.V. Maksimov, V.E. Baskakov // Proc. of

123 123 the 2-nd int. conf. CЮЫЫОЧЭ ЩЫШЛХОЦЬ ШП ЧЮМХОКЫ ЩСвЬТМЬ КЧН КЭШЦТМ ОЧОЫРв. K.: Institute for Nuclear Research, P Pelykh, S.N. Cladding rupture life control methods for a power-cycling WWER-1000 nuclear unit / S.N. Pelykh, M.V. Maksimov // Nuclear Engineering and Design VШХ. 241, 8. P ,.. /.. //. :, ,.. /..,..,.... :, , /..,.. - //..:, /..,..,..,....: -, , /.. -,.. // C ,. 1..: -, : -, c / M.. Ma,..,..,.. // ,. :.. /. //. :,

124 , /.. / ( -14) // , : ,.... /....:., ,.. /..,..,....:, ,....:, ,.. A Ш О ЩШ Ш- ОМ б бкщк ОЩ М К Ш Ш ЩОК ШЩК ОЩ Ш Ш К 5 A C, К К /... :, ,.. /..,..,....:, Suzuki, M. Light water reactor fuel analysis code FEMAXI-V (Ver.1). JAERI-Data/Code Tokai: Japan atomic energy research institute, p : -,, ,.. :.... : ,, - /....,

125 : / Д..,..,...Ж. :, Deformation behavior of Zircaloy-4 cladding under cyclic pressurization / J. H. Kim, M. H. Lee, B. K. Choi, Y. H. Jeong // Journal of Nuclear Science and Technology Vol Hohorst, J.K. MATPRO-A, a library of materials properties for light-waterreactor accident analysis. NUREG/CR-5273-Vol.4. Idaho Falls: Idaho National Engineering Lab., p. 87. Pelykh, S. N. A method for VVER-1000 fuel rearrangement optimization taking into account both fuel cladding durability and burnup / S.N. Pelykh, M.V. Maksimov, G. T. Parks // Nuclear Engineering and Design VШХ. 257, 4. P , /..,..,.. // (36) ,.. - /..,... : -, ,.. /..,... :, ,.. /..,... :, ,.., /..,..,.. // «-94».. : I I

126 Christiansen, J. Algorithm 77. Solving a system of simultaneous ordinary differential equations of the first order using a method for automatic step change. / J. Christiansen // The Computer Journal Vol. 16, N. 2. P ,.. :. /..,.... :, , /..,.. // (44) , /.., M.. Ma,.. // , , , /.., M.. Ma,.. // : , , ,.. /..,... :, ( -320) : :

127 127

128 128

129 129