Neumann Li-Yau gradient estimate under integral Ricci curvature bounds
Abstract
We prove a Li-Yau gradient estimate for positive solutions to the heat equation, with Neumann boundary conditions, on a compact Riemannian submanifold with boundary Mn⊂eq Nn, satisfying the integral Ricci curvature assumption: equation D2 x∈ N ( B(x,D) |Ric-|p dy )1p < K equation for K(n,p) small enough, p>n/2, where diam( M)≤ D. The boundary of M is not necessarily convex, but it needs to satisfy the interior rolling R-ball condition.
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