Precise local large deviations for random sums with applications

Abstract

In this paper, we investigate the precise local large deviation probabilities for random sums of independent real-valued random variables with a common distribution F, where F(x+)=F((x, x+T]) is an O-regularly varying function for some fixed constant T>0(finite or infinite). We also obtain some results on precise local large deviation probabilities for the claim surplus process of generalized risk models in which the premium income until time t is simply assumed to be a nondecreasing and nonnegative stochastic process. In particular, the results we obtained are also valid for the global case, i.e. case T=∞.