The ruin problem for L\'evy-driven linear stochastic equations with applications to actuarial models with negative risk sums

Abstract

We study the asymptotic of the ruin probability for a process which is the solution of linear SDE defined by a pair of independent L\'evy processes. Our main interest is the model describing the evolution of the capital reserve of an insurance company selling annuities and investing in a risky asset. Let β>0 be the root of the cumulant-generating function H of the increment of the log price process V. We show that the ruin probability admits the exact asymptotic Cu-β as the initial capital u∞ assuming only that the law of VT is non-arithmetic without any further assumptions on the price process.