Minimizing under relaxed symmetry constraints: Triple and N-junctions

Abstract

We consider a nonnegative potential W:R2→R invariant under the action of the rotation group CN of the regular polygon with N sides, N≥ 3. We assume that W has N nondegenerate zeros and prove the existence of a N-junction solution to the vector Allen-Cahn equation. The proof is variational and is based on sharp lower and upper bounds for the energy and on a new pointwise estimate for vector minimizers.

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