Large time behaviour of higher dimensional logarithmic diffusion equation

Abstract

Let n 3 and λ0 be the radially symmetric solution of +2β+β x·∇=0 in Rn, (0)=λ0, for some constants λ0>0, β>0. Suppose u0 0 satisfies u0-λ0∈ L1(Rn) and u0(x)≈2(n-2)β |x||x|2 as |x|∞. We prove that the rescaled solution u(x,t)=e2β tu(eβ tx,t) of the maximal global solution u of the equation ut= u in Rn× (0,∞), u(x,0)=u0(x) in Rn, converges uniformly on every compact subset of Rn and in L1(Rn) to λ0 as t∞. Moreover \|u(·,t)-λ0\|L1(Rn) e-(n-2)β t\|u0-λ0\|L1(Rn) for all t 0.