Markov chains; central limit theorem; branching processes; probability and moment inequalities; concentration functions; self-normalized statistics; distributions in linear spaces.
Markov chains.
Large deviations.
Probability inequalities.
Boundary problems.
Branching processes.
Infinite-dimensional distributions.
Martingales.
Biography
In 1957 Sergei Nagaev applied the spectral theory of linear operators in a Banach space for the asymptotic analysis of Markov chains.
1958 - dissertation "Some limit theorems for homogeneous Markov chains", Tashkent State University. 1963 - dissertation of the doctor of physical and mathematical sciences "Limit theorems for Markov processes with discrete time", Institute of Mathematics, Academy of Sciences of the Uzbek SSR, Tashkent.
1967 - Professor in Theory of Probability and Mathematical Statistics, Novosibirsk State University.
1957-1959 - Assistant of the Department of Theory of Probability and Mathematical Statistics, Tashkent State University.
1964-1977 - Professor, doctor of physical and mathematical sciences, Department of Probability Theory and Mathematical Statistics, Novosibirsk State University. At present, he is the Chief Researcher at the Sobolev Institute of Mathematics, Novosibirsk.
His research S.V. Nagaev leads in several directions. The history of these studies, beginning in 1957, the results obtained and their connection with the studies of other authors are described in his seven brief essays:
D. H. Fuc, S. V. Nagaev, “Probability inequalities for sums of independent random variables”, Theory Probab. Appl., 16:4 (1971), 643–660
3.
S. V. Nagaev, “Some Limit Theorems for Stationary Markov Chains”, Theory Probab. Appl., 2:4 (1957), 378–406 https://epubs.siam.org/doi/10.1137/1102029
4.
S. V. Nagaev, “Some limit theorems for large deviations”, Theory Probab. Appl., 10:2 (1965), 214–235
5.
S. V. Nagaev, “More Exact Statement of Limit Theorems for Homogeneous Markov Chains”, Theory Probab. Appl., 6:1 (1961), 62–81 https://epubs.siam.org/doi/abs/10.1137/1106005
6.
S. V. Nagaev, “On the asymptotic behaviour of one-sided large deviation probabilities”, Theory Probab. Appl., 26:2 (1982), 362–366 https://epubs.siam.org/doi/10.1137/1126035
7.
S. V. Nagaev, I. F. Pinelis, “Some inequalities for the distributions of sums of independent random variables”, Theory Probab. Appl., 22:2 (1978), 248–256
8.
S. V. Nagaev, “On the speed of convergence in a boundary problem. I”, Theory Probab. Appl., 15:2, https://epubs.siam.org/doi/abs/10.1137/1115026 (1970), 163–186
9.
S. V. Nagaev, “On the convergence speed of distribution of maximum sums of independent random variables”, Theory Probab. Appl., 15:2 (1970), 309–314 https://epubs.siam.org/doi/abs/10.1137/1115036
10.
S. V. Nagaev, V. I. Chebotarev, “On estimation of closeness of binomial and normal distributions”, Theory Probab. Appl., 56:2 (2011), 213–239
11.
S. V. Nagaev, S. S. Khodzhabagyan, “On an estimate for the concentration function of sums of independent random variables”, Theory Probab. Appl., 41:3 (1996), 560–578 https://epubs.siam.org/doi/10.1137/S0040585X9797657X
12.
S. V. Nagaev, “On necessary and sufficient conditions for the strong law of large numbers”, Theory Probab. Appl., 17:4 (1973), 573–581
13.
S. V. Nagaev, “Some refinements of probabilistic and moment inequalities”, Theory Probab. Appl., 42:4 (1998), 707–713 https://epubs.siam.org/doi/10.1137/S0040585X9797657X
14.
Nagaev S.V., “An estimate of the remainder term in multidimensional central limit theorem”, Proceedings of the Third Japan — USSR Symposium on Probability Theory - 1976, Springer Ser. Lecture Notes in Mathematics (Japan — USSR), 550, eds. Maruyama, G., Prokhorov, J.V., Springer, Berlin, 1976, 419-438 https://link.springer.com/chapter/10.1007/BFb0077505}{link.springer.com/chapter/10.1007/BFb0077505
S. V. Nagaev, V. I. Rotar', “On strengthening of Lyapunov type estimates (the case when summands distributions are close to the normal one)”, Theory Probab. Appl., 18:1 (1973), 107–119
16.
S. V. Nagaev, L. V. Han, “Limit theorems for a critical Galton–Watson process with migration”, Theory Probab. Appl., 25:3 (1981), 514–525
17.
Nagaev, S.V., Chebotarev V. I., “On the bound of proximity of the binomial distribution to the normal one”, Theory of Probability and its Applications, 56:2 (2012), 213-239
Anatolii Zolotukhin Sergei Nagaev Vladimir Chebotarev, “On a bound of the absolute constant in the Berry–Esseen inequality for i.i.d. Bernoulli random variables”, Modern Stochastics: Theory and Applications, 5:3 (2018), 385–410
Nagaev S.V., “On accuracy of normal approximation for the distribution of a sum of independent Hilbert space valued random variables”, Probability Theory and Mathematical Statistics (Tbilisi, USSR, August 23-29, 1982), Proceedings of the Fourth USSR - Japan Symposium, held at Tbilisi, USSR, August 23–29, 1982, 1021, eds. Prokhorov, J.V., Springer, 1983, 461-474 http://www.bookmetrix.com/detail/book/2b65b2ed-742e-49a6-848e-b99814c58142#citations
Nagaev, S.V., “On accuracy of normal approximation for distribution of sum of independent Hilbert space valued random variables”, LECTURE NOTES IN MATHEMATICS, 1021 (1983), 461-473
S. V. Nagaev, “Exact expressions for the moments of ladder heights”, Siberian Mathematical Journal, 51:4 (2010), 675–695
22.
S. V. Nagaev, V. I. Vakhtel, “Probability inequalities for the Galton–Watson critical process”, Theory Probab. Appl., 50:2 (2006), 225–247 http://math.nsc.ru/LBRT/g1/nagaev/files/e-8.pdf
23.
S. V. Nagaev, “Lower Bounds on Large Deviation Probabilities for Sums of Independent Random Variables”, Theory Probab. Appl., 46:1 (2002), 79–102 https://epubs.siam.org/doi/abs/10.1137/S0040585X97978725
24.
Nagaev S.V., “Some refinements of probabilistic and moment inequalities”, Theory of Probability and its Applications, 42:4 (1997), 707-713 https://epubs.siam.org/doi/abs/10.1137/S0040585X9797657X
S. V. Nagaev, N. V. Vakhrushev, “An estimation of probabilites of large deviations for a critical Galton–Watson process”, Theory Probab. Appl., 20:1 (1975), 181-182
26.
S. V. Nagaev, “On the speed of convergence in a boundary problem. II”, Theory Probab. Appl., 15:3 (1970), 403–429 https://epubs.siam.org/doi/abs/10.1137/1115047
27.
Nagaev, S.V., Chebotarev, V.I., Zolotukhin, A.Y., “A Non-Uniform Bound of the Remainder Term in the Central Limit Theorem for Bernoulli Random Variables”, Journal of Mathematical Sciences, 214 (2016), 83-100
Nagaev, S.V., Vakhtel, V.I., “On the local limit theorem for a critical Galton-watson process”, Theory of Probability and its Applications, 50:3 (2006), 400-419 http://math.nsc.ru/LBRT/g1/nagaev/files/e-7.pdf
S. V. Nagaev, “Lower Bounds for Probabilities of Large Deviations of Sums of Independent Random Variables”, Theory Probab. Appl., 46:4 (2002), 728–735
30.
Kh. Batirov, D. V. Manevich, S. V. Nagaev, “The Esseen inequality for sums of a random number of differently distributed random variables”, Math. Notes, 22:1 (1977), 569–571
31.
N. A. Volodin, S. V. Nagaev, “A remark on the strong law of large numbers”, Theory Probab. Appl., 22:4 (1978), 810–813
32.
S. V. Nagaev, “A limit theorem for branching processes with immigration”, Theory Probab. Appl., 20:1 (1975), 176–179
33.
S. V. Nagaev, “Teorema vosstanovleniya pri otsutstvii stepennykh momentov”, Teoriya veroyatn. i ee primen., 56:1 (2011), 188–197
S. V. Nagaev, V. I. Vakhtel, “On the local limit theorem for critical Galton–Watson process”, Theory Probab. Appl., 50:3 (2006), 400–419
35.
S. V. Nagaev, “On probablity and moment inequalties for dependent random variables”, Theory Probab. Appl., 45:1 (2000), 152–160 https://epubs.siam.org/doi/abs/10.1137/S0040585X97978142
36.
S. V. Nagaev, L. V. Nedorezov, V. I. Vakhtel, “A probabilistic continuous-discrete model of the dynamics of the size of an isolated population”, Journal of Applied and Industrial Mathematics, 2:2 (1999), 147–152
37.
S. V. Nagaev, “On the Rate of Convergence to Normal Law in Hilbert Space”, Theory Probab. Appl., 30:1 (1986), 19–37 https://epubs.siam.org/doi/abs/10.1137/1130003
38.
S. V. Nagaev, “Asymptotic expansions for the distribution function of the maximum of a sum of independent identically distributed random quantities”, Siberian Mathematical Journal, 11:2 (1970), 288–309
39.
S. V. Nagaev, “Some renewal theorems”, Theory Probab. Appl., 13:4 (1968), 547–563 https://epubs.siam.org/doi/abs/10.1137/1113073
40.
S. V. Nagaev, V. I. Vakhtel, “On sums of independent random variables without power moments”, Siberian Mathematical Journal, 49:6 (2008), 1091–1100
41.
S. V. Nagaev, V. I. Vakhtel, “Limit theorems for probabilities of large deviations of a Galton-Watson process”, Discrete Math. Appl., 13:1 (2003), 1–26 https://www.degruyter.com/view/j/dma.2003.13.issue-1/156939203321669537/156939203321669537.xml
42.
Kagan A., Nagaev S., “HOW MANY MOMENTS CAN BE ESTIMATED FROM A LARGE SAMPLE?”, Statistics & Probability Letters, 55:1 (2001), 99-105
A. V. Karpenko, S. V. Nagaev, “Limit theorems for the total number of descendants for the Galton–Watson branching process”, Theory Probab. Appl., 38:3 (1993), 433–455
44.
Nagaev, S.V., Kirsanov, G.A., “Heat conduction of the ″Karbotextim-V″ graphitized felt at high temperatures”, Teplofizika Vysokikh Temperatur, 31:1 (1993), 99-105
45.
Nagaev, S. V., “Estimating the rate of convergence for the distribution of the maximum sums of independent random quantities”, Siberian Mathematical Journal, 10:3 (1969), 443-458
46.
Nagaev, S.V., Chebotarev V. I., “On the bound of proximity of the binomial distribution to the normal one”, Doklady Mathematics, 83:1 (2011), 19-21
A. K. Aleshkyavichene, S. V. Nagaev, “Transient phenomena in a random walk”, Theory Probab. Appl., 48:1 (2004), 1–18
48.
Nagaev S.V., “On probability and moment inequalities for supermartingales and martingales”, Acta Applicandae Mathematicae: An International Survey Journal on Applying Mathematics and Mathematical Applications, 79:1 (2003), 35-46
S. V. Nagaev, “A New Proof of the Absolute Convergence of the Spitzer Series”, Theory Probab. Appl., 54:1 (2010), 151–154 https://epubs.siam.org/doi/abs/10.1137/S0040585X97984024
61.
S. V. Nagaev, “Formula for the Laplace Transform of the Projection of a Distribution on the Positive Semiaxis and Some of Its Applications”, Math. Notes, 84:5 (2008), 688–702 https://link.springer.com/article/10.1134/S0001434608110102
62.
S. V. Nagaev, V. I. Chebotarev, “On the Accuracy of Gaussian Approximation in Hilbert Space”, Siberian Advances in Mathematics, 15:1 (2005), 11–73 http://math.nsc.ru/LBRT/g1/nagaev/files/109_Paper.pdf
63.
S. V. Nagaev, “On large deviations of a self-normalized sum”, Theory Probab. Appl., 49:4 (2004), 704–713
64.
Nagaev, S.V., Chebotarev, V.I., “On the Accuracy of Gaussian Approximation in Hilbert Space”, Acta Applicandae Mathematicae, 58:1 (1999), 189-215
Nagaev S.V., Chebotarev V. I., “A refinement of the error estimate of the normal approximation in a Hilbert space”, Siberian Mathematical Journal, 27:3 (1986) , 16 pp. https://link.springer.com/article/10.1007
66.
S. V. Nagaev, “Probabilities of large deviations in Banach spaces”, Math. Notes, 34:2 (1983), 638–640
67.
S. V. Nagaev, N. A. Volodin, “On the strong law of large numbers”, Theory Probab. Appl., 20:3 (1976), 626–631
68.
Nagaev S. V., “Nekotorye predelnye teoremy teorii vosstanovleniya”, Teoriya veroyatnostei i ee primenenie, 20:2 (1975), 332–344
S. V. Nagaev, V. I. Chebotarev, “On Large Deviations for Sums of i.i.d. Bernoulli Random Variables”, Journal of Mathematical Sciences, 234:6 (2018), 816–828
S. V. Nagaev, “The spectral method and ergodic theorems for general Markov chains”, Izv. Math., 79:2 (2015), 311–345
71.
S. V. Nagaev, “On probability and moment inequalities for supermartingales and martingales”, Theory Probab. Appl., 51:2 (2007), 367–377 http://math.nsc.ru/LBRT/g1/nagaev/files/e-4.pdf
72.
S. V. Nagaev, “Ergodic theorems for homogeneous Markov chains”, Dokl. Math., 39:3 (1989), 483–486
73.
Nagaev S.V., “Probability inequalities for sums of independent random variables with values in a Banach space”, Siberian Mathematical Journal, 28:4 (1987), 652-664
74.
S. V. Nagaev, “On the distribution of linear functionals in finite-dimensional spaces of large dimension”, Dokl. Akad. Nauk SSSR, 263:2 (1982), 295–297
75.
Nagaev, S.V., “AN ERGODIC THEOREM FOR HOMOGENEOUS MARKOV-CHAINS”, DOKLADY AKADEMII NAUK SSSR, 263:1 (1982), 27-30
76.
S. V. Nagaev, M. S. Èppel, “On a local limit theorem for the sums of independent random variables”, Theory Probab. Appl., 21:2 (1977), 384–385
77.
S. V. Nagaev, “Transition phenomena for age-dependent branching processes with discrete time. II”, Siberian Math. J., 15:3 (1974), 408–415
78.
S. V. Nagaev, “An estimate of the convergence rate for the absorption probability”, Theory Probab. Appl., 16:1 (1971), 147–154
79.
S. V. Nagaev, “Asymptotical expansions for the maximum of sums of independent random variables”, Theory Probab. Appl., 15:3 (1970), 514–515
80.
S. V. Nagaev, “An estimation of a convergence rate for the absorption probability in case of a null expectation”, Theory Probab. Appl., 13:1 (1968), 160–164
81.
S. V. Nagaev, “An alternative method of the proof of the ergodic theorem for general Markov chains”, Theory Probab. Appl., 66:3 (2021), 364–375
82.
Sergei Nagaev, “The Analytical Approach to Recurrent Markov Chains Alternative to the Splitting Method and Its Applications”, 2nd International Symposium on Stochastic Models in Reliability Engineering, Life Science, and Operations Management, SMRLO 2016, Proceedings (Beer Sheva, Israel; February 15 - 18, 2016), eds. Frenkel and Anatoly Lisnianski, Institute of Electrical and Electronics Engineers Inc. (IEEE), 2016, 251-253ieeexplore.ieee.org/document/7433124
Nagaev S.V., “The spectral method and the central limit theorem for general Markov chains”, Doklady Mathematics, 91:1 (2015), 56-59
85.
S. V. Nagaev, “Local renewal theorems in the absence of an expectation”, Theory Probab. Appl., 59:3 (2015), 388–414
86.
S. V. Nagaev, “On conditions sufficient for subexponentiality”, Theory Probab. Appl., 55:1 (2011), 153–164 https://epubs.siam.org/doi/abs/10.1137/S0040585X97984711?journalCode=tprbau
87.
Nagaev S. V., “On probability and moment inequalities for supermartingales and martingales”, Acta Applicandae Mathematicae, 97 (2007), 151-162
Kharchenko, V. P.; Nagaev, S. V.; Kukush, A. G.; Znakovskaya, E. A.; Dotsenko, S. I., “Determination of the size of a sample in a method for modeling rare events”, Cybernet. Systems Anal., 42:1 (2006), 65–74
V. P. KharchenkoS. V. NagaevA. G. KukushE. A. ZnakovskayaS. I. Dotsenko, “Determination of sample size in a rare event simulation method”, Cybernetics and Systems Analysis, 42:1 (2006)
90.
Nagaev S.V., “The analytical approach to the harris recurrent markov chains and the berry-esseen bound”, Doklady Akademii Nauk, 359:5 (1998), 590-592
91.
S. V. Nagaev, E. L. Presman, “On the iterated logarithm law in a control problem”, Theory Probab. Appl., 43:2 (1999), 288–293
92.
Nagaev S.V., “Concentration functions and the accuracy of approximation by infinitely divisible laws in a Hilbert space”, DOKLADY AKADEMII NAUK, 57:2 (1998), 254-256
93.
Nagaev S.V., “An analytical approach to the Markov chains recursive in the sense of Harris, and the Berry-Esseen estimate”, Doklady Mathematics, 57:2 (1998), 264-266
94.
S. V. Nagaev, “An estimate of Berry–Esseen type for sums of random variables with values in Hilbert space”, Dokl. Math., 38:3 (1989), 476–477
95.
S.V. Nagaev, “An estimate of Berry-Esseen type for sums of random variables with values in Hilbert space”, Soviet Math. Dokl., 38:3 (1988), 476-477
96.
Nagaev, S.V., Chebotarev, V.I., “Dependence of the estimate of the rate of convergence to a normal law on the covariance operator - the case of non-identical distributions of terms”, Theory of Probability and its Applications, 28:3 (1984), 631-632
97.
Nagaev S.V., “An Estimate for the Sum of the Spitzer Series and Its Generalization
Read More: https://epubs.siam.org/doi/10.1137/S0040585X97T990277”, Theory of Probability & Its Applications, 66:1 (2021), 89–104
98.
S. V. Nagaev, “On the accuracy of approximation of the binomial distribution by the Poisson law”, Mat. Tr., 24:2 (2021), 122–149
99.
Nagaev S.V., Chebotarev V.I., “On approximation of the tails of the binomial distribution with these of the poisson law”, Mathematics, 9:8 (2021)
S. V. Nagaev, “The Berry–Esseen Bound for General Markov Chains”, Journal of Mathematical Sciences, 234:6 (2018), 829–846
102.
S. V. Nagaev, “The spectral method and the central limit theorem for general Markov chains”, Izvestiya Mathematics, 81:6 (2017), 1168–1211
103.
S. V. Nagaev, V. I. Chebotarev, “On large deviation probabilities for the binomial distribution in case of the Poisson approximation”, Matematika v sovremennom mire., Mezhdunarodnaya konferentsiya, posvyaschennaya 60-letiyu Instituta matematiki im. S. L. Soboleva ((Novosibirsk, 14-19 avgusta 2017 g.)), eds. G. V. Demidenko, IM SO RAN, 2017, 372
104.
Nagaev S. V., “The Berry–Esseen bound for general Markov chains”, Matematika v sovremennom mire (Mezhdunarodnaya konferentsiya, posvyaschennaya 60-letiyu Instituta matematiki im. S. L. Soboleva), (Novosibirsk, 14-19 avgusta 2017 g.), Izd.-vo Instituta matematiki, Novosibirsk, 2017, 371
105.
A. Ya. Zolotukhin, S.V. Nagaev, V.I. Chebotarev, “On computing the absolute constant in the Berry—Esseen inequality for two-point distributions”, Proceedings of the International Conference “Analytical and Computational Methods in Probability Theory” (Moscow, Russia, October 23-27, 2017), eds. A. V. Lebedev, Moscow: Peoples friendship University of Russia, 2017, 695-699
106.
S. V. Nagaev, V. I. Chebotarev, “On bounds for large deviations probabilities for the binomial distribution”, Obozrenie prikladnoi i promyshlennoi matematiki, 23:2 (2016) , 151-152 pp.
107.
Nagaev S. V., “The Berry-Esseen bounds for general Markov chains”, Obozrenie prikladnoi i promyshlennoi matematiki, 23:2 (2016) , 150-151 pp.
108.
T. V. Lazovskaya, S. V. Nagaev, “Problems in Calculating Moments and Distribution Functions of Ladder Heights”, Journal of Mathematical Sciences, 218:2 (2016), 195–207
109.
S.V. Nagaev, , A. Zolotukhin, V.I. Chebotarev, “Solution to one computational problem, related to the gauss approximation for the binomial distribution”, Materials of the 3rd All-Russian Scientific and Practical conf.: Information technology and high-performance computing. (Khabarovsk, June 30-July 4, 2015), eds. A. I. Mazur, A. L. Verkhoturov, Pacific State University, Khabarovsk, 2015, 114-117
110.
Nagaev S.V., Chebotarev V. I., Zolotukhin A. Ya., “Odna neravnomernaya otsenka v integralnoi teoreme Muavra-Laplasa i ee primenenie”, XXXVIII Dalnevostochnaya matematicheskaya shkola-seminar imeni akademika E. V. Zolotova (1 - 5 sentyabrya 2014 g., Vladivostok), IAPU DVO RAN, Vladivostok, 2014, 72–74
111.
S. V. Nagaev, “The spectral method and the central limit theorem for the general Markov chains”, Proceedings of the International Congress of Mathematicians, 4 vol. (August 13 - 21, 2014 Coex , Seoul , Korea), Kyung Moon SA, Seoul, 2014, 424
112.
Chebotarëv, V. I., Nagaev, S. V., Zolotukhin Anatoly, “On a non-uniform bound of the normal approximation for the binomial distribution and its application”, Proceedings of the International Congress of Mathematicians, 4 vol. (August 13 - 21, 2014 Coex , Seoul , Korea), Kyung Moon SA, Seoul, 2014, 2014, 413-414
113.
Zolotukhin A. Ya., Nagaev S. V., Chebotarev V. I., “On a non-uniform bound of the remainder term in central limit theorem for Bernoulli distributions”, XXXII International Seminar on Stability Problems for Stochastic Models, Book of Abstracts (16 - 21 June, 2014, Trondheim, Norway.), Institute of Informatics Problems, RAS, Moscow, 2014, 86 - 87
114.
Lazovskaya, T.V., Nagaev, S.V., “Problems in calculating of the moments and the distribution function of the ladder height”, XXXII International Seminar on Stability Problems for Stochastic Models, Book of Abstracts (16 - 21 June, 2014, Trondheim, Norway), Institute of Informatics Problems, RAS, Moscow, 2014, 62 - 63
115.
S.V. Nagaev, “The extension of the spectral method to the Harris Markov chains”, XXXII International Seminar on Stability Problems for Stochastic Models Book of Abstracts (16 - 21 June, 2014, Trondheim, Norway. Moscow, Institute of Informatics Problems, RAS), 2014, 84-85
116.
Nagaev S. V., “The ergodic theorems for Markov chains with an arbitrary phase space”, Doklady Mathematics, 88:3 (2013) , 684–686 pp.
117.
Nagaev S.V., Lazovskaya T., “O problemakh priblizhennogo vychisleniya momentov i vosstanovleniya funktsii raspredeleniya verkhnei lestnichnoi vysoty”, XXXVII Dalnevostochnaya matematicheskaya shkola-seminar imeni akademika E. V. Zolotova, sb. dokl. (08 sentyabrya – 14 sentyabrya 2013 g., Vladivostok), Dalnauka, Vladivostok, 2013, 128–132
118.
S.V. Nagaev, A. Ya. Zolotukhin, V.I. Chebotarev, “One computational problem associated with the Gaussian approximation to the binomial distribution”, Informatica i sistemy upravleniya, 38:4 (2013), 16–18
119.
Nagaev S. V., ““The ergodic theorems for Markov chains with an arbitrary phase space”, Doklady Mathematics, 88:3 (2013), 684–686
120.
Nagaev S.V., “Renewal theorems in the case of attraction to the stable law with characteristic exponent smaller than unity”, Annales Mathematicae et Informaticae, 39 (2012) , 18 pp.
121.
“Local reconstruction theorem in the absence of mathematical expectation”, Doklady Mathematics, 86:3 (2012), 831-833
122.
S. V. Nagaev, Renewal theorems in the case of attraction to the stable law with characteristic exponent smaller than unity, Preprint 2011/272, Sobolev Institute of Mathematics, Novosibirsk, 2011 , 19 pp., (In Russian)
123.
Nagaev S.V., Chebotarev V.I., “Ob otsenke blizosti binomialnogo raspredeleniya k normalnomu”, Doklady Akademii nauk, 436:1 (2011), 26-28
124.
S.V. Nagaev, V.I. Chebotarev, “On precise bound of convergence rate in the integral Moivre-Laplace theorem”, XXXV Far Eastern Mathematical School-Seminar behalf of Academician E. V. Zolotov, Reports. [Electronic resource]. -, 2010, 908 pp.; volume 646 Mb; 1 CD-ROM. . P. 122-128. (In Russian) (31 Aug. - 5 Sept. 2010, Russia), ISBN 978-5-7442-1500-2, 646, IAPU DVO RAN, Vladivostok, 2010, 111-117
125.
S.V. Nagaev, A.S. Kondrik, K. V. Mikhaylov, V.I. Chebotarev, “On computation of error in the integral Moivre-Laplace theorem”, XXXV Far-Eastern Mathematical School-Seminar behalf of Academician E. V. Zolotov, Reports. [Electronic resource]. volume 646 Mb; 1 CD-ROM. ISBN 978-5-7442-1500-2. (In Russian) (31 Aug. -5 Sept. 2010, Vladivostok), IAPU DVO RAN, Vladivostok, 2010, 111-117
126.
S. V. Nagaev, “On sufficient conditions for subexponentiality”, Doklady Mathematics, 80:2 (2009), 697–700 https://link.springer.com/article/10.1134
S.V. Nagaev, V.I. Chebotarev, On the bound of closeness of the bianomial distribution to the normal one, Research Report 2009/142, Computing Centre FEB RAS, Khabarovsk, 2009 , 47 pp.
129.
Sergey V. Nagaev, “Asymptotic formulas for probabilities of large deviations of ladder heights”, Theory Stoch. Process., 14(30):1 (2008), 100–116dspace.nbuv.gov.ua/handle/123456789/4541
130.
S.V. Nagaev, New approach to the analysis of large deviations of stairs ledder, Preprint, IM SO RAN, Novosibirsk, 2008 , 25 pp.
131.
Nagaev, Sergei Viktorovich, “OTsENKI VEROYaTNOSTEI BOLShIKh UKLONENII DLYa PROTsESSOV GALTONA- VATSONA”, Obozrenie prikladnoi i promyshlennoi matematiki, 15:4 (2008), 753-754.
132.
Nagaev S.V., “Exact expressions for moments of ladder heights”, Doklady Mathematics, 78:3 (2008), 916-919
133.
Nagaev S.V., “Formula for the Laplace transform of the projection of a distribution on the positive half-line and some of its applications”, Doklady Mathematics, 76:3 (2007), 872-875
134.
S.V. Nagaev, V.I., Chebotarev, “Estimation of the Edgeworth expansion terms in Hilbert space and one F. Gotzes conjecture”, International J. of Statistical Sciences, 2007, (Special Issue, no. 6, 109-126
135.
Nagaev, S.V., Wachtel, V., “The critical Galton-Watson process without further power moments”, Journal of Applied Probability, 44:3 (2007), 753-769
136.
Nagaev, S.V., Vakhtel, V.I., “On sums of independent random variables without power moments”, Doklady Mathematics, 74:2 (2006), 683-685
137.
S.V. Nagaev, Formula for the Laplace transform of a projection of a distribution onto the positive semiaxes and some its applications, Preprint, IM SO RAN, Novosibirsk, 2006 , 19 pp.
138.
Nagaev, S. V.; Vakhtel, V. I., “On sums of independent random variables without power moments”, DOKLADY MATHEMATICS, 74:2 (2006), 683-685 https://link.springer.com/article/10.1134
139.
Nagaev S. V., “On the best constants in the Burkholder type inequality for the product of independent random variables”, Prague Stochastics 2006, Proceedings of the joint session of 7th Prague Symposium on Asymptotic Statistics and 15th Prague Conference on Information Theory, Statistical Decision Functions and Random Processes (Prague, from August 21 to 25, 2006), Prague: Matfyzpress, 2006, 544-554
S.V. Nagaev, V.I., Chebotarev, “On the bound of the absolute constant in the Berry-Esseen inequality, II”, XXX Far-Eastern Mathematical School-Seminar behalf of Academician E. V. Zolotov, Abstracts, Khabarovsk, 2005, 35-37
142.
S.V. Nagaev, V.I. Chebotarev, On an absolute constant in the Berry-Esseen bound Research Report, 2004/78, Computing Centre FEB RAS, Khabarovsk, 2004 , 18 pp.
143.
S.V. Nagaev, V.I. Chebotarev, “On the bound of the absolute constant in the Berry-Esseen inequality, I.”, Far-Eastern Mathematical School-Seminar behalf of Academician E. V. Zolotov, Abstracts, Vladivostok, 2004, 16
144.
S.V. Nagaev, V.I. Chebotarev, Estimation of terms of Edgeworth expansion in Hilbert space and one F. Goetzes conjecture, Research Report 2003/67, Computing Centre FEB RAS, Khabarovsk, 2003 , 17 pp.
145.
S.V. Nagaev, V.I. Chebotarev, “Estimation of the Edgeworth expansion terms in Hilbert space and a conjecture of F. Götze”, Far-Eastern Mathematical School-Seminar behalf of Academician E. V. Zolotov, Abstracts, Vladivostok, 2003, 11-13
Nagaev, Sergei Viktorovich, On large deviations of self-normalized sum, Izd-vo In-ta matematiki, Novosibirsk, 2002 , 11 pp.
148.
Nagaev, Sergei Viktorovich, Veroyatnostnye neravenstva dlya kriticheskogo protsessa Galtona - Vatsona, Preprint / Ros. akad. nauk. Sib. otd-nie. In-t matematiki im. S. L. Soboleva, In-t matematiki im. S.L. Soboleva RAN, Novosibirsk, 2002 , 14 pp.
149.
Nagaev, Sergei Viktorovich, On large deviations of self-normalized sum, Preprint / Ros. akad. nauk. Sib. otd-nie. In-t matematiki im. S. L. Soboleva; 89, Izd-vo In-ta matematiki, Novosibirsk, 2002 , 11 pp.
150.
Nagaev, S. V., “Lower bounds on large deviation probabilities for sums of independent random variables.”, Asymptotic methods in probability and statistics with applications (St. Petersburg, 1998), Stat. Ind. Technol., Birkhäuser Boston, Boston, MA, 2001, 277–295
151.
Nagaev S. V., “Threshold Phenomena in Random Walks”, Asymptotic Methods in Probability and Statistics with Applications. Statistics for Industry and Technology., 978-1-4612-0209-7, eds. Balakrishnan N., Ibragimov I.A., Nevzorov V.B. (eds), Birkhäuser, Boston, 2001, 465-485
152.
Nagaev, Sergei Viktorovich, On the Berry- Esseen bound for the self-normalized sum, Preprint / Ros. akad. nauk. Sib. otd-nie. In-t matematiki im. S. L. Soboleva; 82, Izd-vo In-ta matematiki im. S. L. Soboleva, Novosibirsk, 2001 , 39 pp.
153.
Nagaev, Sergei Viktorovich, Ob otsenke tochnosti gaussovskoi approksimatsii v gilbertovom prostranstve, Preprint / Ros. akad. nauk. Dalnevost. otd-nie. Vychisl. tsentr; 2000/47, Vychisl. tsentr DVO RAN, Khabarovsk, 2000 , 58 pp.
154.
S.V. Nagaev, “Probability and moment inequalities for sums of dependent Banach space valued random variables”, XX International Seminar on Stability Problems for Stochastic Models, . Wydawnictwo uniwersytetu Marii Kurie-Sklodowskiej, Lublin, 1999. (Lublin Naleczow, 5-11 September, 1999):, Wydawnictwo Uniwersytetu Marii Curie-Sklodowskiej, Lublin, 1999, 125
155.
S.V. Nagaev, “On estimation of a coverage probability in a non-linear regression model”, VI All-Russian School-Colloq. on Stochastic Methods, Survey of Appl. and Industr. Mat. (Samara, August 5-12, 1999), 6, no. 1, 1999, 178-179
156.
S.V. Nagaev, E.L.Presman, “On the law of iterated logarithm in one problem of control”, Probability theory and mathematical statistics : proceedings of the Seventh Vilnius Conference (1998), [in conjunction with the 22nd European Meeting of Statisticians] (Vilnius, Lithuania, 12-18 August, 1998), 466 p., eds. B Grigelionis, TEV, Vilnius, 1998
157.
S.V. Nagaev, “Probability inequalities for sums of dependent Banach space valued random variables”, International Congress of Mathematicians, ICM 1998. International Congress of Mathematicians Abstracts of Short Communications and Poster Sessions (Berlin, August 18-27, 1998), 263, Berlin, 1998
158.
S.V. Nagaev, “Lower bounds on large deviation probabilities for sums of independent random variables”, Intern. Conf. "Asympt. Methods in Probab. and Math. Stat." Dedicated to the Anniversary of the Chair of Probab. and Stat., Abstracts. Mezhdunarodnaya konferentsiya “Asimptoticheskie metody v teorii veroyatnostei i matematicheskoi statistike”, posvyaschennaya 50-letiyu obrazovaniya Kafedry teorii veroyatnostei i matematicheskoi statistiki Sankt-Peterburgskogo gosudarstvennogo universiteta (St. Petersburg University, June 24-28, 1998), St. Petersburg University, St. Peterburg, 1998, 186-190
159.
S.V. Nagaev, L.V. Nedorezov, V.I. Vakhtel, “Stokhasticheskaya model dinamiki izolirovannoi populyatsii”, Tretii Sibirskii kongress po prikladnoi i industrialnoi matematike (INPRIM-98), Tezisy, chast IV, IM SO RAN, Novosibirsk, 1998, 121
160.
S.V. Nagaev, V.I. Chebotarev, On accuracy of Gaussian approximation in Hilbert space, Preprint 98/32, Far-Eastern Branch, Computing Centre FEB RAS, Khabarovsk, 1998 , 3-48 pp.
161.
S. V. Nagaev, “Probabilistic inequalities for sums of independent random variables in terms of truncated pseudomoments”, Theory Probab. Appl., 42:3 (1998), 520–528
162.
Nagaev, Sergei, “On accuracy of approximation in central limit theorem.”, Probability theory and mathematical statistics (St. Petersburg, 1993), Gordon and Breach, Amsterdam, 1996, 95–108
163.
S.V. Nagaev, “Some refinements of probability inequalities”, Mosc. Univ. Math. Bull, 51:6 (1996), 560-569
164.
S.V. Nagaev, “On the analytical approach to Harris Markov Chains”, Fourth World Cong. of the Bernoulli Society, Abstracts (Vienna, Austria, 1996, August 26-31), 1996, 346
165.
S. V. Nagaev, “On a model of a random walk”, New Trends in Probability and Statistics, Proceed. Second Ukrainian-Hungarian Conference (Mukachevo, Ukraine, September 25-October 1, 1992), eds. M. Arato, M.I. Yadrenko, Teor. Veroyatnost. Matemat. Statist., Kiev, 1995, 223-226
166.
S.V. Nagaev, “The analitical approach to Markov chains satisfying the Harris condition and rates of convergence in limit theorems”, Abstr. of Japan-Russian Symp. Probab. and Math. Statist. (Tokyo), 1995, 68
167.
S.V. Nagaev, “The Berry-Esseen bound for Markov chains satisfying the Harris condition”, Abstr. Comm. XVII Seminar on Stability Problems of Stochastic Models. (Kazan, 19-26 June 1995), 1995, 27-28
168.
Nagaev, S, “On accuracy of approximation with stable laws”, Probability theory and mathematical statistics : proceedings of the sixth Vilnius Conference (Vilnius, Lithuania, 28 June - 3 July, 1993), 6th Vilnius Conference on Probability Theory and Mathematics Statistics, eds. E. Gechauskas, Matematikas ir Informatikas Institutas, 1994, 591-604
169.
S. V. Nagaev, “On accuracy of approximation with stable laws. Probab.”, Probability Theory and Mathematical Statistics, Proceedings of the Sixth Vilnius Conference (1993) (Vilnius, Lithuania, 28 June–3 July, 1993), eds. Bronius Grigelionis, VSP VSP/TEV Ltd Utrecht, 1994, 591-604 https://books.google.ru/books?id=9UMOvAsTXVkC&printsec=frontcover&hl=ru&source=gbs_ge_summary_r&cad=0#v=onepage&q&f=false
170.
Nagaev S.V., “The accuracy of approximation with stable laws”, Abstr. Comm. XVI Seminar on Stability Problems of Stochastic Models (Eger, Hungary, August 29-September), 1994, 52
171.
S.V. Nagaev, “On estimaites of the rate of convergence in the CLT in a Hilbert space”, Workshop on Limit Theorems and Nonparametric Statistics, Abstracts of commun. (August 24 - 28, 1992), Universitat Bielefeld, 1993, 1-3
172.
Nagaev, S. V.; Chebotarëv, V. I., “On Edgeworth expansions in Hilbert space”, Siberian Advances in Mathematics, 3:3 (1993), 89–122
173.
S. V. Nagaev, V. I. Chebotarev, “On the Edgeworth expansion in a Hilbert space”, Trudy Inst. Mat. SO RAN, 20 (1993), 170–203
174.
S.V. Nagaev, “Bounds for the rate of confergence in the ergodic theorem for homogeneous Markov chains”, Intern. Conf. dedicated to the memory of academishian M. P. Kravchuk, Abstracts (Kiev-Lutsk, 1992), IM, Kiev, 1992, 141
175.
Nagaev, S. V.; Chebotarëv, V. I, “On the Bergström type asymptotic expansion in Hilbert space [translation of Trudy Inst. Mat. (Novosibirsk) 13 (1989), Asimptot. Analiz Raspred. Sluch. Protsess., 66–77; MR1037249].”, 66–77, Siberian Advances in Mathematics, 1, no. 2, 1991 , 130-145 pp.
176.
Nagaev S.V., “Ergodic Theorems for discrete-time random processes”, New trends in probability and statistics, Bakuriani Colloquium on Probability Theory and Mathematical Statistics 1990 (Bakuriani, Georgia, USSR, 24 February -4 March 1990), eds. Prohorov, Y. V., Mokslas, Vilnius, Lithuania, 1991, 190-197
177.
S.V. Nagaev, “Concentration functions and approximation with infinitely divisible laws in Hilbert space”, Comm. VI USSR - Japan Symp. Probab. Theory and Mat. Statist., Abstr. (Kiev, 1991), 1991, 108
178.
Nagaev S.V., “On a new approach to the study of the distribution of a norm of a random element in Hilbert space”, Probability theory and mathematical statistics, Lietuvos TSR Mokslų akademija; Matematicheskiĭ institut im. V.A. Steklova.; Vilniaus Valstybinis V. Kapsuko vardo universitetas. (June 25-July 1, 1989), Mokslas ; Utrecht, The Netherlands : VSP, Vilnius, Lithuania:, 1990, 214-226
179.
S.V. Nagaev, V.I. Chebotarev, On Bergstrem expansion in Hilbert space, preprint, Far-Eastern Branch, Inst. Appl. Math., Khabarovsk, 1990 , 50 pp.
180.
Nagaev S. V., “A Berry-Esseen type estimate for sums of Hilbert space valued random variables”, Siberian Mathematical Journal, 30:3 (1989), 413–423
181.
S. V. Nagaev, V. I. Chebotarev, On Edgeworth expansion in Hilbert space. Far-Eastern Branch USSR, Preprint Inst. Appl. Math. Far-Eastern Branch USSR, Vladivostok, 1989 , 1-62 pp.
182.
S.V. Nagaev, V. I. Chebotarev, “O razlozhenii Edzhvorta v gilbertovom prostranstve”, Pyataya Mezhdunarodnaya vilnyusskaya konferentsiya po teorii veroyatnostei i matematicheskoi statistike, Tezisy dokladov (Vilnyus, 26 iyulya - 1 iyulya 1989 g.), eds. E. Gechauskas, Matematikas ir Informatikas Institutas, Vilnyus, 1989, 81-82
183.
S.V. Nagaev, A.R. Karpenko, “Limit theorems for a total progeny in a Galton-Watson branching process”, Fifth International Vilnius conference on probability theory and mathematical statistics,, 4, Vilnius, 1989, 79-80 (to appear)
184.
S.V. Nagaev, “On a new approach to the study of the distribution of a norm of a random element in a Hilbert space”, Fifth International Vilnius conference on probability theory and mathematical statistics (Vilnius), 4, 1989, 77-78
185.
S.V. Nagaev, V.I. Chebotarev, On Edgeworth expansion in Hilbert space, Preprint, Far-Eastern Branch USSR, Inst. Appl. Math. Far-Eastern Branch USSR, Vladivostok, 1989 , 62 pp.
186.
S. V. Nagaev, V. I. Chebotarev, “On an asymptotic expansion of Bergström type in a Hilbert space”, Trudy Inst. Mat. Sib. Otd. AN SSSR, 13 (1989), 66–77
187.
S.V. Nagaev, On ergodic theory of homogenious Markov chains, Preprint. 57, Inst. Math. Ukrainian SSR Acad. Sci., 1988 , 3-21 pp.
188.
Nagaev, S. V.; Chebotarëv, V. I., “Asymptotic expansions of the distributions of sums of i.i.d. Hilbert space valued random variables. Probability theory and mathematical statistics, Vol. II (Reviewer: M. Bhaskara Rao)”, Probability theory and mathematical statistics, Vol. II, VNU Sci. Press, Utrecht, 1987. ((Vilnius, 1985),), eds. (Reviewer: M. Bhaskara Rao), 1987, 357–363
189.
Nagaev, S. V.; Chebotarjev, V. I., “On asymptotic expansion for the distribution of the sum of independent identically distributed random variables taking values in Hilbert space. 693–696, VNU Sci. Press, Utrecht,”, Proceedings of the 1st World Congress of the Bernoulli Society, Vol. 1, VNU Sci. Press, Utrecht (Tashkent, 1986), VNU Sci. Press, Utrecht, 1987, 693–696
190.
S. V. Nagaev, V. I. Chebotarev, “On asymptotic expansion for the distribution of the sum of independent identically distributed random variables taking values in Hilbert space”, Proc. of the I World Congress of the Bernoulli Society, Tashkent, USSR (Tashkent, USSR, 8-14 September 1986), Mathematical Statistics and Probability. World Congress, eds. Yu A Prohorov; V V Sazonov, VNU Science Press, 1987, 693-696 [Íàãàåâ Ñ.Â., ×åáîòàðåâ Ñ.Â., Ïåðâûé Âñåìèðíûé êîíãðåññ Îáùåñòâà ìàòåìàòè÷åñêîé ñòàòèñòèêè è òåîðèè âåðîÿòíîñòåé èì. Áåðíóëëè, Òåç. äîêë. (15 èþëÿ - 20 àâã. 1986, Òàøêåíò),  íàäçàã.: ÀÍ ÑÑÑÐ, ÀÍ ÓçÑÑÐ, Íàóêà, Ìîñêâà, 1986]
191.
S.V. Nagaev, A.R. Karpenko, Limit theorems for a total progeny in a Galton —Watson branching process, Preprint 33, IM SB RAS, 1987 (to appear) , 36 pp.
192.
S.V. Nagaev, “Probability inequalities for sums of independent Banach-valued random variables”, Soviet Math. Dokl., 1986, 385-387
193.
S. V. Nagaev, “Veroyatnostnye neravenstva dlya summ nezavisimykh sluchainykh velichin so znacheniyami v banakhovom prostranstve”, Dokl. AN SSSR, 287:2 (1986), 284–286
194.
Nagaev S. V., “Probability-inequalities for sums of banach space-valued independent random-variables”, Doklady Akademii Nauk SSSR, 287:2 (1986), 284-286
195.
NAGAEV, SV; ASADULLIN, MK, “One scheme of summing a random number of independent random-variables with the application to branching-processes with immigration”, Doklady Akademii nauk SSSR, 285:2 (1985), 293-296
196.
S.V. Nagaev, N.V. Gizbrecht, “A random walk scheme that describes the particle transport phenomenon”, Limit theorems of probability theory, Proc. Inst. Math. Sib. Branch USSR Acad. Sci., 5, 1985, 103-126
197.
S.V. Nagaev, M.Kh. Asadullin, “Ob odnoi skheme summirovaniya sluchainogo chisla nezavisimykh velichin s prilozheniem k vetvyaschimsya protsessam s immigratsiei”, Predelnye teoremy teorii veroyatnostei, sbornik statei, Tr. In-ta matematiki : / / AN SSSR, Sib. otd-nie. T. 5, ISSN JSSN 0208-0060, Trudy Instituta matematiki, 5, eds. Otv. red. A. A. Borovkov, Nauka, Sib. otd-nie, Novosibirsk, 1985, 96-103
198.
S.V. Nagaev, V.I. Chebotarev, “On accuracy of the Gaussian approximation for distributions of sums of independent Hilbert space valued random variables”, Pyataya Mezhdunarodnaya vilnyusskaya konferentsiya po teorii veroyatnostei i matematicheskoi statistike, tezisy dokladov (Vilnyus, 26 iyunya - 1 iyulya 1989 g.), 4, b.i., Vilnyus, 1985, 208-210
199.
Nagaev S.V., “Ob analiticheskikh metodakh v teorii tsepei Markova”, Chetvertaya Vilnyusskaya konferentsiya po teorii veroyatnostei i matematicheskoi statistike, Tezisy dokladov, 2, eds. E. Gechauskas, Institut matematiki i kibernetiki AN LitSSR, Vilnyus, 1985, 236-238
200.
V. Nagaev, V.I. Chebotarev, “A refinement of the error estimate of the normal approximation in a Hilbert space”, Comm. 19th School-Colloq. Probab. Theory and Mat. Statist.,, Abstr. (Bakuriani, 1985), 1985, 37
201.
S. V. Nagaev, M. Kh. Asadullin, “Ob odnoi skheme summirovaniya sluchainogo chisla nezavisimykh sluchainykh velichin s prilozheniem k vetvyaschimsya protsessam s immigratsiei”, Doklady Akademii nauk SSSR, 285:2 (1985), 293–296
202.
S. V. Nagaev, N. V. Gizbrekht, “A random walk scheme that describes the particle transport phenomenon”, Trudy Inst. Mat. Sib. Otd. AN SSSR, 5 (1985), 103–126
203.
S. V. Nagaev, M. Kh. Asadullin, “A scheme for summation of a random number of independent random variables with application to branching processes with immigration”, Trudy Inst. Mat. Sib. Otd. AN SSSR, 5 (1985), 96–103
204.
S.V. Nagaev, V.I. Chebotarev, A refinement of the error estimate of a normal approximation in a Hilbert space, Preprint, IM SO RAN, Novosibirsk, 1984 , 46 pp.
205.
Nagaev, S.V., “BERRY-ESSEEN-TYPE ESTIMATES FOR SUMS OF HILBERT SPACE-VALUED RANDOM-VARIABLES”, DOKLADY AKADEMII NAUK SSSR, 276:6 (1984)
206.
Nagaev S.V., “On probabilities of large deviations for a Gaussian distribution in a banach-space”, Theory of Probability and its Applications, 27:2 (1983), 430-431
207.
Yu. G. Kosarev, S.V. Nagaev, “A characteristic property of a power function”, Vychisl. Sistemy, 99, Novosibirsk, 1983, 39-43
208.
Nagaev S.V., “On distribution of linear functionals in finite-dimensional spaces of large dimension”, Doklady Akademii nauk SSSR, 265 (1982), 295
209.
S. V. Nagaev, “Probability inequalities for sums of independent random variables with values in a Banach space”, Trudy Inst. Mat. Sib. Otd. AN SSSR, 1 (1982), 159–167
210.
NAGAEV, SV, “On an asymptotic behavior of a Wiener measure for a narrow-band”, Kartinki po zaprosu THEORY OF PROBABILITY AND ITS APPLICATIONSarchive.siam.org Theory of Probability and Its Applications, 26:3 (1981), 625-626
211.
S.V. Nagaev, “On a large deviation probabilities for the Gaussian distribution in a Banach space”, Izv. Akad. Nauk UzSSR. Ser. Fiz.-Mat. Nauk, 1981, no. 5, 18-21
212.
S.V. Nagaev, “Veroyatnostnye neravenstva v banakhovykh prostranstvakh”, Tretya Vilnyusskaya konferentsiya po teorii veroyatnostei i matematicheskoi statistike, Tezisy dokladov (22-27 iyunya 1981, Vilnyus), V nadzagol.: AN SSSR, AN LitSSR, Viln. gos. un-t im. V. Kapsukasa, 2, eds. E. Gechauskas, Institut matematiki i kibernetiki, Vilnyus, 1981, 75-76
213.
S.V. Nagaev, Gizbrekht N. V., “Ob odnoi skheme sluchainogo bluzhdaniya, opisyvayuschei perenos chastits”, III Vilnyusskaya konferentsiya po teor. veroyatn. i mat. stat., Tezisy dokladov, 2, eds. E. Gechauskas, Institut matematiki i kibernetiki AN LitSSR, Vilnyus, 1981, 130
214.
S.V. Nagaev, M.H. Asadullin, “Limit-theorems for a critical branching-process with immigration”, Theory of probability and its applications, 26:2 (1981), 417-419
215.
S. V. Nagaev, “On the asymptotic behaviour of the Wiener measure of the narrow strip”, Third Working Conf. Stochastic Differential Systems, Abstr. (Visegrad (Hungary), Sept. 15–20, 1980), 1980, 55-56
216.
S.V. Nagaev, V.I. Chebotarev, “On estimates of a convergence rate in the central limit theorem for random vectors taking values in l2”, Mathematical analysis and related topics, Trudy Inst. Mat., Nauka, Novosibirsk, 1978, 153-182
217.
S.V. Nagaev, I.F. Pinelis, “On large deviations for sums of independent Banach-valued random variables”, Abst. Comm. II Vilnius Conf. Probab. Theory and Math. Statist. Vilnius, 1977, 66-67
218.
S.V. Nagaev, V.I. Chebotarev, “Estimates of a convergence rate in the central limit theorem in the l2 in the case of independent coordinates”, II Vilnius Conf. on Probab. Theory and Math. Statist. Vilnius, 1 (1977), Abstr. Comm., 1977, 68-69
219.
S.V. Nagaev, S.K. Sakojan, “On a bound for a probability of large deviations”, Limit Theorems and Mathematical Statistics, FAN, Tashkent, 1976, 132-140
220.
S.V. Nagaev, I. F. Pinelis, “Some estimates for large deviations and their application to strong law of large numbers”, 15:1 (1974) 153–158, Siberian Mathematical Journal, 15:1 (1974), 153–158 https://link.springer.com/article/10.1007/BF00968324
221.
Nagaev S. V., “State of a conduction electron in a crystal in the case of nonlocal interaction with elementary excitations”, Theoretical and Mathematical Physics, 14:1 (1973) , 67–74 pp. https://link.springer.com/article/10.1007/BF01035636
222.
Nagaev S.V., “Large deviations for sums of independent random variables”, Trans. Sixth Prague Conf. Inform. Theory. Statist. Decision Functions. Random Processes, Prague (Prague, 1973), Academy of Sciences, Prague, 1973, 657-674 http://math.nsc.ru/LBRT/g1/nagaev/files/r-13.pdf
223.
S. V. Nagaev, “Certain estimates for the maximum sum of independent identically distributed random variables”, Abstr. Comm. Intern. Conf. Probab. Theory and Math. Statist. Vilnius, 2 (1973), 103-104. (Vilnius, Lithuania), 103-104, 1973, 103-104
224.
S. V. Nagaev, “Large deviations for sums of independent , identically distributed random variables”, Dokl. Akad. Nauk SSSR, 206:1 (1972), 25–26
225.
Nagaev S.V., “On necessary and sufficient conditions for the strong law of large numbers”, Second Japan-USSR Symp. Probab. Theory, (Kyoto), 1972, 53-54
226.
S.V. Nagaev, V.I. Rotar, “On an estimate of the speed of convergence in the central limit theorem using pseudomoments”, Theory Probab. Appl., 17:2 (1972), 365-366
227.
S. V. Nagaev, V. I. Rotar', “On the estimates of Ljapunov type for distributions of sums close to normal”, Dokl. Akad. Nauk SSSR, 199:4 (1971), 778–779
228.
Nagaev S. V., “A limit theorem for a supercritical branching process”, Mathematical notes of the Academy of Sciences of the USSR, 9:5 (1971) , 338–342 pp. http://www.nnn.ru/~ivanov/paper1.pdf}{www.nnn.ru/~ivanov/paper1.pdf}{www.nnn.ru/~ivanov/paper1.pdf
229.
S.V. Nagaev, “On estimation of a convergence rate in boundary problems”, Proc. Sixth Summer Math. School on Probab. and Math. Statist., (Kiev, 1970), 1970, 312 – 325
230.
S. V. Nagaev, “Letter to the editors”, Theory Probab. Appl., 14:4 (1969), 726
231.
Nagaev S.V., “Asymptotic expansions for the distribution of the maximum sum of independent random variables”, First USSR-Japan Symp. Probab. Theory, 1969, 200 – 208
232.
S.V. Nagaev, “On a theorem of Robbins”, Izv. Akad. Nauk UzSSR, Ser. Fiz.-Mat. Nauk, 1968, no. 3, 15-18
233.
S.V. Nagaev, R. Mukhamedkhanova, “Certain remarks apropos of earlier published limit theorems in the theory of branching processes”, Probability Models and Quality Control, FAN, Tashkent, 1968, 46-49
234.
J.G. Kosarev, S.V., Nagaev, “Time losses in synchronization in homogenious computing systems”, Vychisl. Systemy, 1967, no. 24, 21-39
235.
S.V. Nagaev, “A rate of a convergence to the uniform distribution on a segment”, Limit Theorems and Statistical Inference, FAN, Tashkent, 1966, 113-117
236.
S.V. Nagaev, R.G. Mukhamedkhanova, “Some limit theorems of theory of branching processes”, Limit Theorems and Statistical Inference, FAN, Tashkent, 1966, 90-112
237.
Nagaev S.V., Muhamedhanova R., “Transition phenomena in branching random processes with discrete time”, Limit Theorems Statist. Inference, Tashkent, 1966, 83-89
238.
Nagaev S.V., “Limit theorems for large deviations”, Winter School in Theory of Probability and Math. Statistics held in Užgorod (Kiev), eds. W. Hoeffding, Izdat. Akad. Nauk Ukrain. SSR, Kiev, 1964, 147–163
239.
S.V. Nagaev, “Limit theorems for large deviations”, Winter School in Theory of Probability and Math. Statistics held in Užgorod,, Izdat. Akad. Nauk Ukrain. SSR,, Kiev, 1964, 147–163
240.
S. V. Nagaev, “An integral limit theorem for large deviations”, Soviet Mathematics Dokl., 148:2 (1963), 280
241.
S.V. Nagaev, Limit theorems for Markov processes with discrete time, Thesis for the degree of Doctor of Physical and Mathematical Sciences, Acad. Sciences UzSSR, Tashkent, 1962 , 148 pp.
242.
Nagaev S.V., “Some problems in the theory of Markov processes in discrete time”, Proc. Sixth All-Union Conf. Theory Prob. and Math. Statist (Proc. Sixth All-Union Conf. Theory Prob. and Math. Statist. Vilnius, 1960), Gospolitnauchizdat, Vilnyus, 1962, 145–147
243.
Nagaev S.V., “Some problems in the theory of Markov processes in discrete time”, Proc. Sixth All-Union Conf. Theory Prob. and Math. Statist (Proc. Sixth All-Union Conf. Theory Prob. and Math. Statist. (Vilnius, 1960), (In Russian), Gosudarstv. Izdat. Političesk. i Naučn. Lit., Vilnius, 1962, 145–147
244.
S.V. Nagaev, “A central limit theorem for discrete-time Markov processes”, Izv. Akad. Nauk UzSSR, Ser. Fiz-Mat. Nauk, 1962, no. 2, 12-20
245.
S.V. Nagaev, “Local limit theorems for large deviations”, Vestnik Leningrad. Univ. Math., Mech., Astron., 1:8 (1962), 80-88
246.
S.V. Nagaev, “The simplified proof of the factorization theorem”, Trudy Inst. Mat. Akad. Nauk UzSSR, 22:3 (1961)
247.
S.V. Nagaev, “Local limit theorems for large deviations”, Theory Probab. Appl., 5:2 (1960) , 2 pp.
248.
S.V. Nagaev, “Limit theorems for large deviations in the theory of homogenious Markov chains”, Proc. Fifth All -Union Conf. Probab. and Math. Statist. (Yerevan, September 19-25, 1958), eds. G. A. Ambartsumian et al., Publishing House of the Academy of Sciences Arm. SSR, Yerevan, 1960, 52-54
249.
S.V. Nagaev, Some limit theorems for homogeneous Markov chains, PhD thesis, (In Russian), Tashkent State University, Tashkent, 1958 , 56 pp.
250.
S. V. Nagaev, “On some limit theorems for homogenious Markov chains”, Dokl. Akad. Nauk SSSR, 115:2 (1957), 237–239
251.
Nagaev S.V., “On the local limit theorem for a sequence of random variables connected to a simple homogeneous Markov chain with a countable set of possible values”, Probability Theory and Its Application, 2:1 (1957) , 3 pp., (In Russian)
252.
Nagaev S.V., Some limit theorems for homogeneous Markov chains, Abstract of thesis for the degree of candidate of physical and mathematical sciences, V.I. Lenin Central Asian State University. Faculty of Physics and Mathematics, Tashkent: Publishing House Acad. Sciences UzSSR, 1957, Tashkent, 1957
253.
S.V. Nagaev, “On a local limit theorem for the sequence or random variables forming a simple homogenious Markov chain with a denumerable set of admissible values”, Izv. Akad. Nauk UzSSR, Ser. Fiz-Mat. Nauk, 3 (1957), 71-72
254.
Nagaev S.V., “Estimation of the mean number of direct descendants of a particle in a branching random process”, Theory of Probability and its Applications, 12:2 (1967), 314-320
255.
S. V. Nagaev, “Letter to the editors”, Theory Probab. Appl., 21:4 (1977), 875
256.
S. V. Nagaev, V. I. Rotar', “Letter to the editors”, Theory Probab. Appl., 21:1 (1976), 220
257.
Nagaev S. V., Tsepi Markova, 2008 http://math.nsc.ru/LBRT/g1/nagaev/res/R1NagaevMarkovprocessesDec2008.pdf}{math.nsc.ru/LBRT/g1/nagaev/res/R1NagaevMarkovprocessesDec2008.pdf}
258.
S. V. Nagaev, “On Novak's paper in v. 49, № 2, p. 365–373”, Teor. Veroyatnost. i Primenen., 52:3 (2007), 622
259.
S. V. Nagaev, “Letter to the editors”, Theory Probab. Appl., 29:1 (1985), 197–198
260.
S. V. Nagaev, L. V. Han, “Letter to the editors”, Theory Probab. Appl., 26:2 (1982), 434
261.
Nagaev S. V., Matematicheskaya statistika, Kurs lektsii dlya studentov matematicheskogo fakulteta, NGU, 1973 , 176 pp.
262.
Nagaev S. V., Teoriya veroyatnostei, NGU, Novosibirsk, 1972 , 155 pp.
263.
A. A. Borovkov, S. V. Nagaev, B. A. Rogozin, Theory Probab. Appl., 11:3 (1966), 488–494
264.
S. V. Nagaev, “Letters to the Editors”, Theory Probab. Appl., 67:3 (2022), 498