Ruin probability in the presence of risky investments

Abstract

We consider an insurance company in the case when the premium rate is a bounded non-negative random function ct and the capital of the insurance company is invested in a risky asset whose price follows a geometric Brownian motion with mean return a and volatility σ>0. If β:=2a/σ2-1>0 we find exact the asymptotic upper and lower bounds for the ruin probability (u) as the initial endowment u tends to infinity, i.e. we show that C*u-β(u) C*u-β for sufficiently large u. Moreover if ct=c*eγ t with γ 0 we find the exact asymptotics of the ruin probability, namely (u) u-β. If β 0, we show that (u)=1 for any u 0.