Non-self similar blowup solutions to the higher dimensional Yang-Mills heat flows

Abstract

In this paper, we consider the Yang-Mills heat flow on Rd × SO(d) with d 11. Under a certain symmetry preserved by the flow, the Yang-Mills equation can be reduced to: ∂t u =∂r2 u +d+1r ∂r u -3(d-2) u2 - (d-2) r2 u3, and (r,t) ∈ R+ × R+. We are interested in describing the singularity formation of this parabolic equation. We construct non-self-similar blowup solutions for d 11 and prove that the asymptotic of the solution is of the form u(r,t) 1λ(t) Q ( rλ (t) ), as t T , where Q is the ground state with boundary conditions Q(0)=-1, Q'(0)=0 and the blowup speed λ verifies λ (t) = ( C(u0) +ot T(1) ) (T-t)2 α as t T,~~ ∈ N*+, ~~α>1. In particular, when = 1, this asymptotic is stable whereas for 2 it becomes stable on a space of codimension -1. Our approach here is not based on energy estimates but on a careful construction of time dependent eigenvectors and eigenvalues combined with maximum principle and semigroup pointwise estimates.