Synopses & Reviews
Traditionally the Stability seminar, organized in Moscow but held in different locations, has dealt with a spectrum of topics centering around characterization problems and their stability, limit theorems, probabil- ity metrics and theoretical robustness. This volume likewise focusses on these main topics in a series of original and recent research articles.
Table of Contents
From the contents: S.V. Arkhipov: The density function's asymptotic representation in the case of multidimensional strictly stable distributions.-
A.M. Kagan: A multivariate analog of the Cramér theorem on components of the Gaussian distributions.-
V.V. Kalashnikov, S.Yu. Vsekhsvyatskii: On the connection of Rewnyi's theorem and renewal theory.-
V.M. Kruglov: Normal and degenerate convergences of random sums.-
V.L. Levin, S.T. Rachev: New duality theorems for marginal problems with some applications in stochastics.-
A.V. Nagaev, S.M. Shkolnik: Some asymptotic properties of the stable laws.-
E. Omey: On the rate of convergence in extreme value theory.-
V.V. Senatov: On the estimate of the rate of convergence in the central limit theorem in Hilbert space.-
I.P. Trukhina, G.P. Chistyakov: Stability of decomposition in semigroups of functions representable by series in the Jacobi polynomials.-
M. Yamazato: Hitting times of single points for 1-dimensional generalized diffusion processes.