arXiv:1506.00940 Abstract | arXiv Analytics

arXiv:1506.00940 [math.AP]Abstract References Reviews Resources

Bounded solutions to the Allen-Cahn equation with level sets of any compact topology

Published 2015-06-02Version 1

We make use of the flexibility of infinite-index solutions to the Allen-Cahn equation to show that, given any compact hypersurface $\Sigma$ of R^d, with $d\geq 4$, there is a bounded entire solution of the Allen-Cahn equation on R^d whose zero level set has a connected component diffeomorphic (and arbitrarily close) to a rescaling of $\Sigma$. More generally, we prove the existence of solutions with a finite number of compact connected components of prescribed topology in their zero level sets.

Comments: 12 pages

Categories: math.AP, math.DG

Keywords: allen-cahn equation, compact topology, bounded solutions, zero level set, bounded entire solution

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