Subexponential densities of compound Poisson sums and the supremum of a random walk

Abstract

We characterize the subexponential densities on (0,∞) for compound Poisson distributions on [0,∞) with absolutely continuous L\'evy measures. As a corollary, we show that the class of all subexponential probability density functions on R+ is closed under generalized convolution roots of compound Poisson sums. Moreover, we give an application to the subexponential density on (0,∞) for the distribution of the supremum of a random walk.