Near field asymptotic behavior for the porous medium equation on the half-line

Abstract

Kamin and V\'azquez proved in 1991 that solutions to the Cauchy-Dirichlet problem for the porous medium equation ut=(um)xx on the half line with zero boundary data and nonnegative compactly supported integrable initial data behave for large times as a dipole type solution to the equation having the same first moment as the initial data, with an error which is o(t-1/m). However, on sets of the form 0<x<g(t), with g(t)=o(t1/(2m)) as t∞, in the so called near field, the dipole solution is o(t-1/m), and their result does not give neither the right rate of decay of the solution, nor a nontrivial asymptotic profile. In this paper we will show that the error is o(t-(2m+1)/(2m2)(1+x)1/m). This allows in particular to obtain a nontrivial asymptotic profile in the near field limit, which is a multiple of x1/m, thus improving in this scale the results of Kamin and V\'azquez.