Gradient Estimate on the Neumann Semigroup and Applications

Abstract

We prove the following sharp upper bound for the gradient of the Neumann semigroup Pt on a d-dimensional compact domain with boundary either C2-smooth or convex: \| Pt\|1 ∞ ct(d+1)/2,\ \ t>0, where c>0 is a constant depending on the domain and \|·\|1∞ is the operator norm from L1() to L∞(). This estimate implies a Gaussian type point-wise upper bound for the gradient of the Neumann heat kernel, which is applied to the study of the Hardy spaces, Riesz transforms, and regularity of solutions to the inhomogeneous Neumann problem on compact convex domains.