Publications

Scientific publications

Чупрунов А.Н., Яковлев К.Н.
О сходимости чисел ячеек заданного объема к эмпирическому процессу
Chuprunov A.N., Iakovlev K.N. On the convergence of given value cells numbers to an empirical process // Transactions of Karelian Research Centre of Russian Academy of Science. No 6. Mathematical Modeling and Information Technologies. 2026. Pp. 127-131
Keywords: general allocation scheme; functional limit theorem; Skorokhod space; Brounian bridge; empirical process
Let r, r1 be integer nonnegative numbers such that r < r1. Let η1, ... ηN be a general allocation scheme of (r1 − r)n + rN particles by N cells, defined by independent random variables ξ1, ... ξN which have power series distribution defined by the series Σk=0bkβk / k!. Denote: the random process Xn,N{r1}(t) = Σ[tN]i=1 Ii=r1}, 0 ≤ t ≤ 1, Fn is an empirical process with the parameter n. It proved that if n, r and r1 are fixed numbers and the condition Ar(r1): bk = 0, k < r, br > 0, bk = 0, r < k < r1, br1 > 0, is valid, then as N → ∞ the random processes Xn,N{r1} converge in distribution in Skorokhod space to nFn.
Indexed at RSCI, RSCI (WS)
Last modified: July 3, 2026