The product of dependent random variables with applications to a discrete-time risk model

Abstract

Let X be a real valued random variable with an unbounded distribution F and let Y be a nonnegative valued random variable with a unbounded distribution G, which satisfy that eqnarray* P(X>x|Y=y) h(y)P(X>x) eqnarray* holds uniformly for y≥0 as x ∞. Under the condition that G(bx)=o( H(x)) holds for all constant b>0, we proved that F∈L(γ) for some γ≥ 0 implied H∈ L(γ/βG) and that F∈S(γ) for some γ≥ 0 implied H∈ S(γ/βG), where H is the distribution of the product XY, and βG is the right endpoint of G, that is, βG=\y:~G(y)<1\∈ (0,∞], and when βG=∞, γ/βG is understood as 0. Furthermore, in a discrete-time risk model in which the net insurance loss and the stochastic discount factor are equipped with a dependence structure, a general asymptotic formula for the finite-time ruin probability is obtained when the net insurance loss has a subexponential tail.