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  1. 2015

  2. Limit theorems for symmetric random walks and probabilistic approximation of the Cauchy problem solution for Schrodinger type evolution equations

    Smorodina, N. V., Faddeev, M. M. & Ибрагимов, И. А., Dec 2015, In: Stochastic Processes and their Applications. 125, 12, p. 4455-4472 18 p.

    Research output: Contribution to journalArticlepeer-review

  3. A Limit Theorem on the Convergence of Random Walk Functionals to a Solution of the Cauchy Problem for the Equation ∂u∂t=σ22Δu with Complex σ.

    Ibragimov, I. A., Smorodina, N. V. & Faddeev, M. M., 2015, In: Journal of Mathematical Sciences. 206, 2, p. 171-180

    Research output: Contribution to journalArticlepeer-review

  4. Limit theorems for symmetric random walks and probabilistic approximation of the Cauchy problem solution for Schrödinger type evolution equations

    Ibragimov, I. A., Smorodina, N. V. & Faddeev, M. M., 2015, In: Stochastic Processes and their Applications. 125, 12, p. 4455 --- 4472

    Research output: Contribution to journalArticle

  5. Limit Theorems on Convergence of Expectations of Functionals of Sums of Independent Random Variables to Solutions of Initial-Boundary Value Problems

    Ibragimov, I. A., Smorodina, N. V. & Faddeev, M. M., 2015, In: Theory of Probability and its Applications. 59, 2, p. 244 -- 259

    Research output: Contribution to journalArticle

  6. 2014

  7. Nonsingular Transformations of Symmetric Lévy Processes

    Vershik, A. M. & Smorodina, N. V., 2014, In: Journal of Mathematical Sciences. 199, 2, p. 123-129

    Research output: Contribution to journalArticlepeer-review

  8. On a Probabilistic Method of Solving a One-Dimensional Initial-Boundary Value Problem

    Ibragimov, I. A., Smorodina, N. V. & Faddeev, M. M., 2014, In: Theory of Probability and its Applications. 58, 2, p. 242-263

    Research output: Contribution to journalArticle

  9. The Probabilistic Approach to Solution of the String Wave Equation

    Smorodina, N. V. & Faddeev, M. M., 2014, In: Journal of Mathematical Sciences. 199, 2, p. 228-235

    Research output: Contribution to journalArticlepeer-review

  10. The Probabilistic Approximation of the Dirichlet Initial Boundary Value Problem Solution for the Equation $\partial u/\partial t=(\sigma^2/2)/\Delta u$ With a Complex Parameter $\sigma$

    Ibragimov, I. A., Smorodina, N. V. & Faddeev, M. M., 2014, In: Markov Processes and Related Fields. 20, 3, p. 391-414

    Research output: Contribution to journalArticle

  11. КОМПЛЕКСНЫЙ АНАЛОГ ЦЕНТРАЛЬНОЙ ПРЕДЕЛЬНОЙ ТЕОРЕМЫ И ВЕРОЯТНОСТНАЯ АППРОКСИМАЦИЯ ИНТЕГРАЛА ФЕЙНМАНА

    Ибрагимов, И. А., Смородина, Н. В. & Фаддеев, М. М., 2014, In: ДОКЛАДЫ АКАДЕМИИ НАУК. 459, 4, p. 400 - 402

    Research output: Contribution to journalArticlepeer-review

  12. Предельные теоремы о сходимости математических ожиданий функционалов от сумм независимых случайных величин к решениям начально-краевых задач

    Ибрагимов, И. А., Смородина, Н. В. & Фаддеев, М. М., 2014, In: ТЕОРИЯ ВЕРОЯТНОСТЕЙ И ЕЕ ПРИМЕНЕНИЯ. 59, 2, p. 233 -251

    Research output: Contribution to journalArticle

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