Saint Petersburg, 199178, Russia, Line 14th (Vasilyevsky Island), 29
(812) 363-68-71, (812) 363-68-72
ru en
Dmitry N. Zaporozhets
Dmitry N. Zaporozhets
Contacts:

27 Fontanka (PDMI RAS), 191023 Saint Petersburg, Russia

zap1979@gmail.com

http://www.pdmi.ras.ru/pdmi/en/staff/dmitry-zaporozhets/

Reception hours:

By appointment


Education

06.2017 — D.Sc. in Mathematics and Physics («Probability Theory and Mathematical Statistics»)
Institution: St. Petersburg Department of Steklov Mathematical Institute
Thesis title: Zeros of Random Polynomials, Distribution of Algebraic Numbers, and Convex Hulls of Random Processes

12.2005 — Ph.D. (C.Sc.) in Mathematics and Physics («Probability Theory and Mathematical Statistics»)
Institution: St. Petersburg Department of Steklov Mathematical Institute
Thesis title: Geometric Methods in Random Polynomials Theory
Advisor: I.A. Ibragimov

06.2001 — Specialist Degree in Mathematics
Institution: St. Petersburg State University


Scientific interests

  • probability theory
  • stochastic geometry
  • convex geometry
  • geometry of numbers

Selected publications

  1. Z. Kabluchko, V. Vysotsky and D. Zaporozhets. Convex hulls of random walks: Expected number of faces and face probabilities. Advances in Mathematics 320, 595–629, 2017.
  2. Z. Kabluchko, V. Vysotsky and D. Zaporozhets. Convex hulls of random walks, hyperplane arrangements, and Weyl chambers. Geometric and Functional Analysis 27:4, 880–918, 2017.
  3. Z. Kabluchko and D. Zaporozhets. Asymptotic distribution of complex zeros of random analytic functions. Annals of Probabability 42:4, 1374–1395, 2014.
  4. I. Ibragimov and D. Zaporozhets. On distribution of zeros of random polynomials in complex plane. In: Prokhorov and Contemporary Probability Theory, Springer, 2013, pp. 303–323.
  5. Z. Kabluchko and D. Zaporozhets. Roots of random polynomials whose coefficients have logarithmic tails. Annals of Probabability 41:5, 3542–3581, 2013.

Additional Information

See my curriculum vitae (in English).