Well-posedness and gradient blow-up estimate near the boundary for a Hamilton-Jacobi equation with degenerate diffusion

Abstract

This paper is concerned with weak solutions of the degenerate viscous Hamilton-Jacobi equation ∂t u-p u=|∇ u|q, with Dirichlet boundary conditions in a bounded domain ⊂RN, where p>2 and q>p-1. With the goal of studying the gradient blow-up phenomenon for this problem, we first establish local well-posedness with blow-up alternative in W1, ∞ norm. We then obtain a precise gradient estimate involving the distance to the boundary. It shows in particular that the gradient blow-up can take place only on the boundary. A regularizing effect for ut is also obtained.