Sign-changing blowing-up solutions for the critical nonlinear heat equation

Abstract

Let be a smooth bounded domain in Rn and denote the regular part of the Green's function on with Dirichlet boundary condition as H(x,y). Assume that q ∈ and n≥ 5. We prove that there exists an integer k0 such that for any integer k≥ k0 there exist initial data u0 and smooth parameter functions (t) q, 0<μ(t) 0 as t +∞ such that the solution uq of the critical nonlinear heat equation equation* cases ut = u + |u|4n-2u in × (0, ∞),\\ u = 0 on ∂ × (0, ∞),\\ u(·, 0) = u0 in , cases equation* has the form equation* uq(x, t) ≈ μ(t)-n-22(Qk(x-(t)μ(t)) - H(x, q)), equation* where the profile Qk is the non-radial sign-changing solution of the Yamabe equation equation* Q + |Q|4n-2Q = 0 in Rn, equation* constructed in delpinomussofrankpistoiajde2011. In dimension 5 and 6, we also prove the stability of uq(x, t).