Limit theorems for decoupled renewal processes

Abstract

The decoupled standard random walk is a sequence of independent random variables ( Sn)n≥ 1, in which Sn has the same distribution as the position at time n of a standard random walk with nonnegative jumps. Denote by N(t) the number of elements of the decoupled standard random walk which do not exceed t. The random process ( N(t))t≥ 0 is called decoupled renewal process. Under the assumption that t P\ S1>t\ is regularly varying at infinity of nonpositive index larger than -1 we prove a functional central limit theorem in the Skorokhod space equipped with the J1-topology for the decoupled renewal processes, properly scaled, centered and normalized. Also, under the assumption that t P\ S1>t\ is regularly varying at infinity of index -α, α∈ [0,1) (1,2) or the distribution of S1 belongs to the domain of attraction of a normal distribution we prove a law of the iterated or single logarithm for N(t), again properly normalized and centered. As an application, we obtain a law of the single logarithm for the number of atoms of a determinantal point process with the Mittag-Leffler kernel, which lie in expanding discs.

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