Functional Inequalities for Stable-Like Dirichlet Forms

Abstract

Let V∈ C2(d) such that μV( x):= -V(x)\, x is a probability measure, and let ∈ (0,2). Explicit criteria are presented for the -stable-like Dirichlet form ,V(f,f):= ∫d×d |f(x)-f(y)|2|x-y|d+α\, y\,-V(x)\, x to satisfy Poincar\'e-type (i.e., Poincar\'e, weak Poincar\'e and super Poincar\'e) inequalities. As applications, sharp functional inequalities are derived for the Dirichlet form with V having some typical growths. Finally, the main result of MRS on the Poincar\'e inequality is strengthened