Distribution of Shifted Discrete Random Walk and Vandermonde matrices

Abstract

In this work we set up the generating function of the ultimate time survival probability (u+1), where (u)=P(n≥slant 1Σi=1n(Xi-)<u) and u∈N0,\,∈N, and the random walk \Σi=1nXi,\,n∈N\ consists of independent and identically distributed random variables Xi, which are non-negative and integer valued. We also give expressions of (u) via the roots of certain polynomials. Based on the proven theoretical statements, we give several examples on (u) and its generating function expressions, when random variables Xi admit Bernoulli, Geometric and some other distributions.