Existence of expanding harmonic map flows to hemispheres
Abstract
We show the existence of non-trivial self-expanding harmonic map flows starting from non-energy-minimizing 0-homogeneous maps to a regular ball or a closed hemisphere. In particular, given a non-minimizing but stationary 0-homogeneous harmonic map u0 to a closed hemisphere, we construct infinitely many different weak solutions to harmonic map flow starting from u0, all of which satisfy the parabolic monotonicity formula. This answers a question of Struwe.
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