The profile of boundary gradient blow-up for the diffusive Hamilton-Jacobi equation

Abstract

We consider the diffusive Hamilton-Jacobi equation ut- u=|∇ u|p, with Dirichlet boundary conditions in two space dimensions, which arises in the KPZ model of growing interfaces. For p>2, solutions may develop gradient singularities on the boundary in finite time, and examples of single-point gradient blowup on the boundary are known, but the space-profile in the tangential direction has remained a completely open problem. In the parameter range 2<p 3, for the case of a flat boundary and an isolated singularity at the origin, we give an answer to this question, obtaining the precise final asymptotic profile, under the form uy(x,y,T) dp[y+C|x|2(p-1)/(p-2)]-1/(p-1),as (x,y) (0,0). Interestingly, this result displays a new phenomenon of strong anisotropy of the profile, quite different to what is observed in other blowup problems for nonlinear parabolic equations, with the exponents 1/(p-1) in the normal direction y and 2/(p-2) in the tangential direction x. Furthermore, the tangential profile violates the (self-similar) scale invariance of the equation, whereas the normal profile remains self-similar.