An inequality for a class of Markov processes

Abstract

Let α ∈ (0,2) and consider the operator given by \[ f(x)=∫[ f(x+h)-f(x)-1(|h|≤ 1)h· f(x)]n(x,h)|h|d+α h, \] where the term 1(|h|≤ 1)h· f(x) is not present when α ∈ (0,1). Under some suitable assumptions on the kernel n(x,h), we prove a Krylov-type inequality for processes associated with . As an application of the inequality, we prove the existence of a solution to the martingale problem for without assuming any continuity of n(x,h).