Global Heat Kernel Estimates for +α/2 in Half-space-like domains

Abstract

Suppose that d 1 and α∈ (0, 2). In this paper, by using probabilistic methods, we establish sharp two-sided pointwise estimates for the Dirichlet heat kernels of \+ aα α/2; \ a∈ (0, 1]\ on half-space-like C1, 1 domains in Rd for all time t>0. The large time estimates for half-space-like domains are very different from those for bounded domains. Our estimates are uniform in a ∈ (0, 1] in the sense that the constants in the estimates are independent of a∈ (0, 1]. Thus it yields the Dirichlet heat kernel estimates for Brownian motion in half-space-like domains by taking a 0. Integrating the heat kernel estimates in time t, we obtain uniform sharp two-sided estimates for the Green functions of \+ aα α/2; \ a∈ (0, 1]\ in half-space-like C1, 1 domains in Rd.