Heat kernels for time-dependent non-symmetric stable-like operators

Abstract

When studying non-symmetric nonlocal operators L f(x) = ∫ Rd ( f(x+z)-f(x)-∇ f(x)· z 1\|z|≤ 1\ ) (x, z)|z|d+α d z , where 0<α<2 and (x, z) is a function on Rd× Rd that is bounded between two positive constants, it is customary to assume that (x, z) is symmetric in z. In this paper, we study heat kernel of L and derive its two-sided sharp bounds without the symmetric assumption (x,z)=(x,-z). In fact, we allow the kernel to be time-dependent and also derive gradient estimate when β∈(0 (1-α),1) as well as fractional derivative estimate of order θ∈(0,(α+β) 2) for the heat kernel, where β is the H\"older index of x(x,z). Moreover, when α∈(1,2), the drift perturbation with drift in Kato's class is also considered. As an application, when (x,z)=(z) does not depend on x, we show the boundedness of nonlocal Riesz's transorfmation: for any p>2d/(d+2α), \| L1/2f\|p \|(f)1/2\|p, where (f):=12 L (f2)-f L f is the carr\'e du champ operator associated with L, and L1/2 is the square root operator of L defined by using Bochner's subordination. Here means that both sides are comparable up to a constant multiple.