Large time behavior of solutions to the nonlinear heat equation with absorption with highly singular antisymmetric initial values

Abstract

In this paper we study global well-posedness and long time asymptotic behavior of solutions to the nonlinear heat equation with absorption, ut - u + |u|α u =0, where u=u(t,x)∈ R, (t,x)∈ (0,∞)× RN and α>0. We focus particularly on highly singular initial values which are antisymmetric with respect to the variables x1,\; x2,\; ·s,\; xm for some m∈ \1,2, ·s, N\, such as u0 = (-1)m∂1∂2 ·s ∂m|·|-γ ∈ S'( RN), 0 < γ < N. In fact, we show global well-posedness for initial data bounded in an appropriate sense by u0, for any α>0. Our approach is to study well-posedness and large time behavior on sectorial domains of the form m = \x ∈ RN : x1, ·s, xm > 0\, and then to extend the results by reflection to solutions on RN which are antisymmetric. We show that the large time behavior depends on the relationship between α and 2/(γ+m), and we consider all three cases, α equal to, greater than, and less than 2/(γ+m). Our results include, among others, new examples of self-similar and asymptotically self-similar solutions.