Finite time blow up solutions for heat equations with Neumann boundary conditions on R+4

Abstract

We consider the nonlinear heat equations with Neumann boundary conditions cases ut= u & in\ R+4 ×(0, T) ,\\ -d ud x4(x, 0, t) \ =u2(x, 0, t)& in\ R3 ×(0, T). cases We establish the existence of a finite-time blow-up solution. Specifically, for any sufficiently small T>0 and any k distinct points q1,…,qk∈ R3, there exists an initial datum u0 such that the corresponding solution u(x,t) blows up exactly at q1,…,qk as t T. Furthermore, when t T, the solution admits the asymptotic profile u(x,t)=Σj=1kUμj(t),j(t)(x)+Z0*(x)+o(1) as~ t T, where Uμj(t),j(t)(x):=μj-1(t) U(x-j(t)μj(t)),~ x∈ R+4, and Z0*∈ C0∞(R+4) satisfying Z0*(qj,0)<0 for all\ j=1,…,k. Here, U(y) denotes the harmonic extension to R+4 of the positive radially symmetric solution U to the fractional Yamabe problem (-)12 U = U2 in R3. For some constants βj>0, the scaling parameters μj(t) and the translation parameters j(t) satisfy μj(t)=βj| 2T|(T-t)|(T-t)|2(1 + o(1)) 0,~j(t) (qj,0) as ~t T.

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