Infinite time blow-up for the fractional heat equation with critical exponent

Abstract

We consider positive solutions for the fractional heat equation with critical exponent equation* cases ut = -(-)su + un+2sn-2s in × (0, ∞), u = 0 on (Rn )× (0, ∞), u(·, 0) = u0 in Rn, cases equation* where is a smooth bounded domain in Rn, n > 4s, s∈ (0, 1), u:Rn× [0, ∞) R and u0 is a positive smooth initial datum with u0|Rn = 0. We prove the existence of u0 such that the solution blows up precisely at prescribed distinct points q1,·s, qk in as t +∞. The main ingredient of the proofs is a new inner-outer gluing scheme for the fractional parabolic problems.