Levy processes: Hitting time, overshoot and undershoot II - Asymptotic behaviour

Abstract

Let (Xt, t>=0) be a Levy process started at 0, with Levy measure nu and Tx the first hitting time of level x>0: Tx:=inft>=0; Xt>x. Let $F(theta, mu, rho,.) be the joint Laplace transform of (Tx, Kx, Lx): F(theta,mu,rho,x) :=E(e(-theta Tx - mu Kx Lx) 1(Tx<+infinity)), where theta>=0, mu>=0, rho>=0, x>=0, Kx:=X(Tx)-x and Lx:=x-X(T(x-)). If we assume that nu has finite exponential moments we exhibit an asymptotic expansion for F(theta,mu,rho,x), as x -> +infinity. A limit theorem involving a normalization of the triplet (Tx,Kx,Lx) as x -> +infinity, may be deduced. At last, if nu(|R+) has finite moment of fixed order, we prove that the ruin probability P(Tx<+infinity) has at most a polynomial decay.

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