<strong>7.</strong> DAN 115, 1957, 49 – 52.Pinsker, M.S. 3. DAN 99, 1954, 213 – 216.5. DAN 111, 1956, 753 – 756.Pinsker, M.S., Yaglom, A.M. 1. DAN 90, 1953, 731 – 734.Postnikov, A.G. 10. UMN 10, No. 1 (63), 1955, 147 – 149.Prokhorov, Yu.V. 2. DAN 69, 1949, 607 – 610.3. IAN 14, 1950, 523 – 536.6. DAN 83, 1952, 797 – 800.<strong>7.</strong> UMN 8, No. 3 (55), 1953, 135 – 142.8. Ibidem, 165 – 16<strong>7.</strong>9. DAN 98, 1954, 535 – 538.11. DAN 105, 1955, 645 – 64<strong>7.</strong>16. TV 1, 1956, 177 – 238.Pugachev, V.S. 13. IAN 17, 1953, 401 – 420.2<strong>7.</strong> ( … (Theory of R<strong>and</strong>om Functions <strong>and</strong> Its Application to AutomaticManagement). M., 195<strong>7.</strong>Raikov, D.A. 2. DAN 14, 1937, 9 – 12.8. IAN 2, 1938, 91 – 124.Richter, V. (1957), DAN 115, No. 1.--- (1957), TV 2, No. 2.--- (1958), TV 3.Romanovsky, V.I. 106. ! ... (Main Problems of the Theory of Errors). M.– L., 194<strong>7.</strong>112. … Same source as Boiarsky, 24 – 45.11<strong>7.</strong> Bull SAGU 30, 1949, 57 – 60.122. On a method of double-level control. In , & …(Interchangeability <strong>and</strong> Control in Machine-Building). M., 1950.Rosanov, Yu.A. 1. TV 2, 1957, 275 – 281.2. DAN 116, 1957, 923 – 926.--- (1958), UMN 13, No. 2 (80), 93 – 142.Rosenknop, I.Z. 2. IAN 14, 1950, 95 – 100.Rvacheva, E.L. 8. UMZh 4, 1952, 373 – 392.11. Uch. Zap. Lvov Univ., ser. Mekh.-Math., 29 (6), 1954, 5 – 44.Sapogov, N.A. 6. DAN 63, 1948, 487 – 490.9. DAN 69, 1949, 133 – 135.15. Uch. Zap. LGU, ser. Math., 19, 1950, 160 – 179.21. IAN 15, 1951, 205 – 218.Sarmanov, O.V. <strong>7.</strong> DAN 59, 1948, 861 – 863.8. Ibidem, 1061 – 1064.9. DAN 60, 1948, 545 – 548.10. Same source as Boiarsky, 90 – 91.12. DAN 84, 1952, 887 – 890.13. Ibidem, 1139 – 1142.Sarymsakov, T.A. 30. Trudy IMI AN UzSSR, 10, No. 1, 1952, 13 – 18.Sevastianov, B.A. 2. Vestnik MGU 3, 1948, 13 – 34.34. DAN 59, 1948, 1407 – 1410.4. UMN 6, No. 6 (46), 1951, 47 – 99.8. TV2, 1957, 339 – 348.Shirikorad, B.V. 1. IAN 18, 1954, 95 – 104.Sirazhdinov, S.Kh. 10. DAN 84, 1952, 1143 – 1146.11. DAN 98, 1954, 905 – 908.
12. +& … (Limit Theorems for Homogeneous Markov Chains).Tashkent, 1955.13. Trudy IMM AN UzSSR 15, 1955, 41 – 56.1<strong>7.</strong> Ibidem 20, 1957, 89 – 100.Skorokhod, A.V. 2. UMN 9, No. 2 (60), 1954, 189 – 190.4. DAN 104, 1955, 364 – 36<strong>7.</strong><strong>7.</strong> TV 1, 1956, 289 – 319.8. DAN 106, 1956, 781 – 784.10. TV 2, 1957, 145 – 17<strong>7.</strong>Skorokhod, A.V., Zolotarev, V.M. 8. UMN 10, No. 4, 1956, 181.Slutsky, E.E. 34. ) … (Tables for Calculating the Incomplete -Function <strong>and</strong> the<strong>Probability</strong> Function 2 ). M. – L., 1950.Smirnov, N.V. 3. Metron 12, No. 2, 1935, 59 – 81.<strong>7.</strong> Bull. MGU, A, 1, No. 4, 1937, 1 – 12.8. Ibidem, 2, No. 2, 1939, 3 – 14.9. MS 6 (48), 1939, 3 – 24.10. IAN 1939, 319 – 328.12. UMN 10, 1944, 179 – 206.--- (1948), Mathematical statistics. Translated in this book.15. Trudy MIAN 25, 1949, 5 – 59.1<strong>7.</strong> UMN 4, No. 4 (32), 1949, 196 – 19<strong>7.</strong>18. DAN 74, 1950, 189 – 191.19. Uch. Zap. Moskovsk. Gorodsk. Pedagogich. Inst., Fiz.-Mat. Fak. 16 (3), 1951, 69 – 96.20. Trudy IMM ANUz SSR 10, No. 1, 1953, 122 – 130.21. Vestnik LGU 11, 1955, 45 – 48.Smirnov’s … (Theory of<strong>Probability</strong> <strong>and</strong> Mathematical statistics. Sel. Works). M., 1970, contains reprints/translationsof all the Items listed above excepting [21].Sragovich, V.G. 2. DAN 111, 1956, 768 – 770.Statuljavicus, V.A. 3. DAN 107, 1956, 516 – 519.Tumanian, S.Kh. 1. DAN 94, 1954, 1011 – 1012.4. TV 1, 1956, 131 – 145.Ventsel, A.D. 1. DAN 111, 1956, 269 – 272.Vorobiev, N.N. 9. Trudy IMM AN UzSSR 10, No. 1, 1952, 19 – 25.Yaglom, A.M. 2. DAN 56, 1947, 347 – 349.10. MS 24 (66), 1949, 457 – 462.11. UMN 4, No. 4 (32), 1949, 173 – 178.12. UMN 7, No. 5 (51), 1952, 3 – 168.15. UMZh 6, 1954, 43 – 5<strong>7.</strong>1<strong>7.</strong> DAN 98, 1954, 189 – 192.18. MS 37 (79), 1955, 141 – 196.19. Trudy Moskovsk. Matematich. Obshchestvo 4, 1955, 333 – 374.24. TV 1, 1956, 161 – 16<strong>7.</strong>28. TV 2, 1957, 292 – 338.Youshkevich, A.A. 1. UMN 8, No. 5 (57), 1953, 177 – 180.3. TV 2, 1957, 187 – 213.Zasukhin, V.N. 1. DAN 33, 1941, 435 – 43<strong>7.</strong>Zolotarev, V.M. 1. DAN 98, 1954, 735 – 738.2. UMN 9, No. 2 (60), 1954, 147 – 156.3. Vestnik LGU 1, 1956, 49 – 52.
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[3] I bear in mind the well-known p
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successes of physical statistics. B
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classes of independent facts whose
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distribution is a corollary of the
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examine in the first place the curv
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12. According to Bortkiewicz’ ter
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generality, the similarities taking
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one on another, as well as the corr
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is inapplicable because the right s
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Instead, Slutsky introduced new not
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abandoned in August 1936, but it is
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last decades, mathematicians more o
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charged with making the leading ple
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motion and a number of others) are
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phenomena. It is self-evident that
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Such new demands were formulated in
- Page 36 and 37:
The addition of independent random
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automatic lathes, etc. Here, the ma
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11. Kolmogorov, A.N. Grundbegriffe
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period 1 and remained, until the ap
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of the analytical tool rather than
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with probability approaching unity,
- Page 48 and 49:
logic. The ensuing vagueness in his
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2. Gnedenko, B.V. (1949), On Lobach
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will be sufficient, although not ne
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nlimk = 1P(| k (n) - m k (n) | > H
- Page 56 and 57:
favorite classical issue as the gam
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and some quite definite (not depend
- Page 60 and 61:
influenced by a construction that a
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P ij (1) = p ij (1) , P ij (t) =kP
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4.2d. Bebutov [1; 2] as well as Kry
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are yet no limit theorems correspon
- Page 68 and 69: described, from the viewpoint that
- Page 70 and 71: conditional variance and determined
- Page 72 and 73: Romanovsky [45] and Kolmogorov [46]
- Page 74 and 75: Let S be the general population wit
- Page 76 and 77: Part 1. Russian/Soviet AuthorsAmbar
- Page 78 and 79: 2. On necessary and sufficient cond
- Page 80 and 81: Gnedenko, B.V., Groshev, A.V. 1. On
- Page 82 and 83: 52. ( (Mathematical Principl
- Page 84 and 85: Kozuliaev, P.A. 1. Sur la répartit
- Page 86 and 87: Obukhov, A.M. 1. Normal correlation
- Page 88 and 89: 30. Généralisations d’un théor
- Page 90 and 91: 22. Alcune applicazioni dei coeffic
- Page 92 and 93: 10. A.N. Kolmogorov. The Theory of
- Page 94 and 95: Kuznetsov, Stratonovich & Tikhonov
- Page 96 and 97: In the homogeneous case H s t = H t
- Page 98 and 99: to such a generalization. He only s
- Page 100 and 101: In the particular case of a charact
- Page 102 and 103: as it is usual for the modern theor
- Page 104 and 105: 1. {The second reference to Pugache
- Page 106 and 107: Smirnov, Romanovsky and others made
- Page 108 and 109: determined the precise asymptotic c
- Page 110 and 111: for finite values of N, M and R 2 .
- Page 112 and 113: Mikhalevich’s findings by far exc
- Page 114 and 115: Uch. Zap. = Uchenye ZapiskiUkr = Uk
- Page 116 and 117: Khinchin, A.Ya. 43. Math. Ann. 101,
- Page 120 and 121: Anderson, T.W., Darling, D.A. (1952
- Page 122 and 123: Statistical problems in radio engin
- Page 124 and 125: observations for its power with reg
- Page 126 and 127: securing against mistakes (A.N. Kry
- Page 128 and 129: of the others, then its distributio
- Page 130 and 131: In Kiev, in the 1930s, N.M. Krylov
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