Compactness of semigroups generated by symmetric non-local Dirichlet forms with unbounded coefficients (2005.05590v1)
Abstract: Let $(\E,\F)$ be a symmetric non-local Dirichlet from with unbounded coefficient on $L2(\Rd;\d x)$ defined by $$\E(f,g)=\iint_{\Rd\times \Rd} (f(y)-f(x))(g(x)-g(y)){W(x,y)}\, J(x,\d y)\,\d x, \quad f,g\in \F,$$ where $J(x,\d y)$ 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 $(P_t){t\ge0}$ on $L2(\Rd;\d x)$. In particular, we prove that if $J(x,\d y)=|x-y|{-d-\alpha}\,\d y$ with $\alpha\in (0,2)$, and $$W(x,y)= \begin{cases} (1+|x|)p+(1+|y|)p, \ & |x-y|< 1 \ (1+|x|)q+(1+|y|)q, \ & |x-y|\geq 1 \end{cases}$$ with $p\in [0,\infty)$ and $q\in [0,\alpha)$, then $(P_t){t\ge0}$ is compact, if and only if $p>2$. This indicates that the compactness of $(\E,\F)$ 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 $(\E,\F)$. Our general results work even if the jumping kernel $J(x,\d y)$ is degenerate or is singular with respect to the Lebesgue measure.