On local large deviations for decoupled random walks

Abstract

A decoupled standard random walk is a sequence of independent random variables (Sn)n ≥ 1 such that, for each n ≥ 1, the distribution of Sn is the same as that of Sn = 1 + … + n, where (k)k ≥ 1 are independent copies of a nonnegative random variable . We consider the counting process (N(t))t≥ 0 defined as the number of terms Sn in the sequence (Sn)n ≥ 1 that lie within the interval [0, t]. Under various assumptions on the tail distribution of , we derive logarithmic asymptotics for the local large deviation probabilities P\N(t) = b \, E[N(t)] \ as t ∞ for a fixed constant b > 0. These results are then applied to obtain a logarithmic local large deviations asymptotic for the counting process associated with the infinite Ginibre ensemble and, more generally, for determinantal point processes with the Mittag-Leffler kernel.