Uniformity of harmonic map heat flow at infinite time
Abstract: We show an energy convexity along any harmonic map heat flow with small initial energy and fixed boundary data on the unit 2-disk. In particular, this gives an affirmative answer to a question raised by W. Minicozzi asking whether such harmonic map heat flow converges uniformly in time strongly in the W{1,2}-topology, as time goes to infinity, to the unique limiting harmonic map.
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