Infinite time bubble towers in the fractional heat equation with critical exponent

Abstract

In this paper, we consider the fractional heat equation with critical exponent in Rn for n>6s,s∈(0,1), equation* ut=-(-)su+|u|4sn-2su, (x,t)∈ Rn×R. equation* We construct a bubble tower type solution both for the forward and backward problem by establishing the existence of the sign-changing solution with multiple blow-up at a single point with the form equation* u(x,t)=(1+o(1))Σj=1k(-1)j-1μj(t)-n-2s2U(xμj(t)) as t+∞, equation* and the positive solution with multiple blow-up at a single point with the form equation* u(x,t)=(1+o(1))Σj=1kμj(t)-n-2s2U(xμj(t)) as t-∞, equation* respectively. Here k2 is a positive integer, U(y)=αn,s(11+|y|2)n-2s2, and equation* μj(t)=βj |t|-αj(1+o(1))~as~t∞, αj=12s(n-2sn-6s)j-1-12s, equation* for some certain positive numbers βj,j=1,·s,k.