On zero mass solutions of viscous conservation laws

Abstract

In the paper, we consider the large time behavior of solutions to the convection-diffusion equation ut - Delta u + nabla cdot f(u) = 0 in Rn times [0,infinity), where f(u) ~ uq as u --> 0. Under the assumption that q >= 1+1/(n+beta) and the initial condition u0 satisfies: u0 in L1(Rn), integralRn u0(x) dx = 0, and |et Deltau0|L1(Rn) <= Ct-beta/2 for fixed beta in (0,1), all t>0, and a constant C, we show that the L1-norm of the solution to the convection-diffusion equation decays with the rate t-beta/2 as t --> infinity. Moreover, we prove that, for small initial conditions, the exponent q* = 1+1/(n+beta) is critical in the following sense. For q > q* the large time behavior in Lp(Rn), 1 <= p <= infinity, of solutions is described by self-similar solutions to the linear heat equation. For q = q*, we prove that the convection-diffusion equation with f(u) = u|u|q*-1 has a family of self-similar solutions which play an important role in the large time asymptotics of general solutions.

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