Far field asymptotics of solutions to convection equation with anomalous diffusion

Abstract

The initial value problem for the conservation law ∂t u+(-)α/2u+∇ · f(u)=0 is studied for α∈ (1,2) and under natural polynomial growth conditions imposed on the nonlinearity. We find the asymptotic expansion as |x| ∞ of solutions to this equation corresponding to initial conditions, decaying sufficiently fast at infinity.