On forward self-similar heat flow of harmonic maps
Abstract
For any k-dimensional smooth, compact Riemannian manifold (N, h)⊂ RL without boundary, there exists an 0>0 such that for any homogeneous of degree zero map u0(x)=φ0(x|x|): Rn N (n 2), if \|∇φ0\|Ln( Sn-1)0 then there is a unique solution u: Rn× (0,∞) N to the heat flow of harmonic map HF1 and IC, which is forward self-similar and belongs to C∞(n× (0,∞)) C1n(n× [0,∞) \(0,0)\).
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