The limit law of the maximum of discrete partial-sums distribution II

Abstract

Let X1,\,X2,\,…,\,XN, N∈ N be independent, discrete, integer-valued random variables. Assume that Xj≥slant mj almost surely for each j=1,\,2,\,…,\,N, where m1,\,m2,\,…,\,mN∈Z satisfy m1+·s+mN<0. Furthermore, suppose that the sequence X1,\,X2,\,… is periodic in distribution, i.e. Xk d = Xk+N for all k∈ N. We derive computable representations for the distribution functions of \X1,\,X1+X2,\,…\, \X2,\,X2+X3,\,…\, …, \XN,\,XN+XN+1,\,…\. The obtained formulas are based on a linear recurrence whose initial values are determined from a linear system that involves the roots of an associated characteristic equation and the distributions of X1,\,X2,\,…,\,XN. Several examples are presented, including a biseasonal-biased Rademacher random walk for which the distribution, generating functions, and all moments admit explicit closed-form expressions. In addition, we identify and correct several inaccuracies in the results reported in Grigutis2024.

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