Functional inequalities for Nonlocal Dirichlet Forms With Finite Range Jumps or Large Jumps

Abstract

The paper is a continuation of our paper [12,2], and it studies functional inequalities for non-local Dirichlet forms with finite range jumps or large jumps. Let α∈(0,2) and μV(dx)=CVe-V(x)\,dx be a probability measure. We present explicit and sharp criteria for the Poincar\'e inequality and the super Poincar\'e inequality of the following non-local Dirichlet form with finite range jump Eα, V(f,f):= (1/2)|x-y| 1(f(x)-f(y))2|x-y|d+α dy μV(dx); on the other hand, we give sharp criteria for the Poincar\'e inequality of the non-local Dirichlet form with large jump as follows Dα, V(f,f):= (1/2)|x-y|> 1(f(x)-f(y))2|x-y|d+α dy μV(dx), and also derive that the super Poincar\'e inequality does not hold for Dα, V. To obtain these results above, some new approaches and ideas completely different from WW, CW are required, e.g. local Poincar\'e inequality for Eα, V and Dα, V, and the Lyapunov condition for Eα, V. In particular, the results about Eα, V show that the probability measure fulfilling Poincar\'e inequality and super Poincar\'e inequality for non-local Dirichlet form with finite range jump and that for local Dirichlet form enjoy some similar properties; on the other hand, the assertions for Dα, V indicate that even if functional inequalities for non-local Dirichlet form heavily depend on the density of large jump in the associated L\'evy measure, the corresponding small jump plays an important role for local super Poincar\'e inequality, which is inevitable to derive super Poincar\'e inequality.