Heat kernel bounds for a large class of Markov process with singular jump

Abstract

Let Z=(Z1, …, Zd) be the d-dimensional L\'evy processes where Zi's are independent 1-dimensional L\'evy processes with jump kernel Jφ, 1(u,w) =|u-w|-1φ(|u-w|)-1 for u, w∈ R. Here φ is an increasing function with weak scaling condition of order α, α∈ (0, 2). Let J(x,y) Jφ (x,y) be the symmetric measurable function where align* Jφ(x,y):=cases Jφ, 1(xi, yi)& if xi yi for some i and xj = yj for all j i\\ 0& if xi yi for more than one index i. cases align* Corresponding to the jump kernel J, we show the existence of non-isotropic Markov processes X:=(X1, …, Xd) and obtain sharp two-sided heat kernel estimates for the transition density functions.