Hunt's hypothesis (H) and the triangle property of the Green function

Abstract

Let X be a locally compact abelian group with countable base and let W be a convex cone of positive numerical functions on X which is invariant under the group action and such that (X, W) is a balayage space or (equivalently, if 1∈ W) such that W is the set of excessive functions of a Hunt process on X, W separates points, every function in W is the supremum of its continuous minorants in W, and there exist strictly positive continuous u,v∈ W such that u/v 0 at infinity. Assuming that there is a Green function G>0 for X which locally satisfies the triangle inequality G(x,z) G(y,z) C G(x,y) (true for many L\'evy processes), it is shown that Hunt's hypothesis (H) holds, that is, every semipolar set is polar.