Distribution of shifted discrete random walk generated by distinct random variables and applications in ruin theory
Abstract
In this paper, we set up the distribution function (u)=P(n≥slant 1Σi=1n(Xi-)<u), and the generating function of (u+1), where u∈N0, ∈N, the random walk \Σi=1nXi, n∈N\, consists of N∈N periodically occurring distributions, and the integer-valued and non-negative random variables X1,\,X2,\,… are independent. This research generalizes two recent works where \=1,\,N∈N\ and \∈N,\,N=1\ were considered respectively. The provided sequence of sums \Σi=1n(Xi-),\,n∈N\ generates so-called multi-seasonal discrete-time risk model with arbitrary natural premium and its known distribution enables to calculate the ultimate time ruin probability 1-(u) or survival probability (u). Verifying obtained theoretical statements we demonstrate several computational examples for survival probability (u) and its generating function when \=2,\,N=2\, \=3,\,N=2\, \=5,\,N=10\ and Xi admits Poisson and some other distributions. We also conjecture the non-singularity of certain matrices.
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