On 2×2 determinants originating from survival probabilities in homogeneous discrete time risk model

Abstract

We analyze 2× 2 Hankel-like determinants Dn that arise in the initial values problem for the ultimate time survival probability (u) in a homogeneous discrete time risk model W(n)=u+ n+Σi=1nZi, where Zi are positive integer valued i.i.d. random claims, the initial surplus u ∈ N0 and the income rate =2. We prove the asymptotic version of a recent conjecture on the non--vanishing and monotonicity of Dn and derive explicit formulas for the initial values (0), (1) of a recurrence that yields survival probabilities. In cases when Zi are Bernoulli or Geometrically distributed, the conjecture on Dn is shown to hold for all n∈N0. Additionally, a generating function (s) for ultimate survival probabilities (u) is derived.