Classification of extinction profiles for a one-dimensional diffusive hamilton-jacobi equation with critical absorption

Abstract

A classification of the behavior of the solutions f(·,a) to the ordinary differential equation (|f'|p-2 f')' + f - |f'|p-1 = 0 in (0,∞) with initial condition f(0,a)=a and f'(0,a)=0 is provided, according to the value of the parameter a>0, the exponent p ranging in (1,2). There is a threshold value a* which separates different behaviors of f(·,a): if a>a* then f(·,a) vanishes at least once in (0,∞) and takes negative values while f(·,a) is positive in (0,∞) and decays algebraically to zero as r∞ if a∈ (0,a*). At the threshold value, f(·,a*) is also positive in (0,∞) but decays exponentially fast to zero as r∞. The proof of these results relies on a transformation to a first-order ordinary differential equation and a monotonicity property with respect to a>0. This classification is one step in the description of the dynamics near the extinction time of a diffusive Hamilton-Jacobi equation with critical gradient absorption and fast diffusion.