Compactness of semigroups generated by symmetric non-local Dirichlet forms with unbounded coefficients

Abstract

Let (,) be a symmetric non-local Dirichlet from with unbounded coefficient on L2(d; x) defined by (f,g)=d× d (f(y)-f(x))(g(x)-g(y))W(x,y)\, J(x, y)\, x, f,g∈ , where J(x, y) is regarded as the jumping kernel for a pure-jump symmetric L\'evy-type process with bounded coefficients, and W(x,y) is seen as a weighted (unbounded) function. We establish sharp criteria for compactness and non-compactness of the associated Markovian semigroup (Pt)t0 on L2(d; x). In particular, we prove that if J(x, y)=|x-y|-d-α\, y with α∈ (0,2), and W(x,y)= cases (1+|x|)p+(1+|y|)p, \ & |x-y|< 1 \\ (1+|x|)q+(1+|y|)q, \ & |x-y|≥ 1 cases with p∈ [0,∞) and q∈ [0,α), then (Pt)t0 is compact, if and only if p>2. This indicates that the compactness of (,) heavily depends on the growth of the weighted function W(x,y) only for |x-y|<1. Our approach is based on establishing the essential super Poincar\'e inequality for (,). Our general results work even if the jumping kernel J(x, y) is degenerate or is singular with respect to the Lebesgue measure.