- 3. 3.1. . ,
- 6. Infinitedimensional distributions 6.1. Introduction. Today the theory of distributions in infinitedimensional spaces is the
- 5. 5.1. .
- 2. Large deviations of sums of independent random variables: asymptotic formulas
- 2. 2.1. . X1, X2, ..., Xn, ...
- 6. Infinite-dimensional distributions 6.1. Introduction. Today the theory of distributions in infinite-dimensional spaces is the
- 2. Large deviations of sums of independent random variables: asymptotic formulas
- 3. Probability inequalities 3.1. Introduction. Probability inequalities are an important instrument which is
- 4. Boundary problems 4.1. Introduction. One of the problems going back to A.N. Kolmogorov is estimating
- 7. Martingales and supermartingales 7.1. Introduction. A variety of inequalities have a significant place in the theory of
- THEORY PROBAB. APPL. c 2006 Society for Industrial and Applied Mathematics Vol. 50, No. 3, pp. 400419 Translated from Russian Journal
- THEORY OF PROBABILITY AND ITS APPLICATIONS Number 1
- THEORY OF PROBABILITY AND ITS APPLICATIONS
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- 6. 6.1. . -
- 3. Probability inequalities 3.1. Introduction. Probability inequalities are an important instrument which is
- An estimatefor the convergence ratefor the absorption probability 2 5 4 5 6 70 9 I0 II 12 I 14
- THEORY OF PROBABILITY I/olume XVIII AN D I T S A P P L ! C AT I 0 N S Number
- ISSN 10645624, Doklady Mathematics, 2007, Vol. 76, No. 3, pp. 872875. Pleiades Publishing, Ltd., 2007. Original Russian Text S.V. Nagaev, 2007, published in Doklady Akademii Nauk, 2007, Vol. 417, No. 3, pp. 319322.
- 7. 7.1. . , , -
- 7. Martingales and supermartingales 7.1. Introduction. A variety of inequalities have a significant place in the theory of
- THEORY OF PROBABILITY Volume XVI AND ITS APPLICATIONS Number4
- THEORY OF PROBABILITY Volume X AND ITS APPLICATIONS Number
- 5. Branching processes 5.1. Introduction. The development of the theory of branching processes in SSSR was
- 3. 3.1. . ,
- Cybernetics and Systems Analysis, Vol. 42, No. 1, 2006 DETERMINATION OF SAMPLE SIZE
- 1. Markov chains 1.1. Introduction. In my paper [1] published in 1957 (see references at the end of
- 5. 5.1. .
- 2. 2.1. . X 1 , X 2 , ..., X n , ...
- THEORY PROBAB. APPL. Translated from Russian Journal Vol. 45, No. 1
- 5. Branching processes 5.1. Introduction. The development of the theory of branching processes in SSSR was
- THEORY PROBAB. APPL. c 2007 Society for Industrial and Applied Mathematics Vol. 51, No. 2, pp. 367377 Translated from Russian Journal
- 4. Boundary problems 4.1. Introduction. One of the problems going back to A.N. Kolmogorov is estimating
- 4. J. V~is~l~, "Lectures on n-dimensional quasiconformal mappings," Lect. Notes Math., Vol. 229, Springer-Verlag, Berlin-Heidelberg-New York (1971).
- THEORY PROBAB. APPL. c 2006 Society for Industrial and Applied Mathematics Vol. 50, No. 2, pp. 225247 Translated from Russian Journal
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- Acta Applicandae Mathematicae 58: 189215, 1999. 1999 Kluwer Academic Publishers. Printed in the Netherlands.
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- 1. Markov chains 1.1. Introduction. In my paper [1] published in 1957 (see references at the end of
- Speed ofconvergence ofmaximum sum distribution 309 3. If 0 <-0 _<_ 0.7 and x _>_ 1, then Table lb must be used"
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- ISSN 1064 5624, Doklady Mathematics, 2011, Vol. 83, No. 1, pp. 1921. Pleiades Publishing, Ltd., 2011. Published in Doklady Akademii Nauk, 2011, Vol. 436, No. 1, pp. 2628.