Doubling construction for O(m)× O(n)-invariant solutions to the Allen-Cahn equation
Abstract
We construct new families of two-ended O(m)× O(n)-invariant solutions to the Allen- Cahn equation u+u-u3=0 in RN+1, with N 7, whose zero level sets diverge logarithmically from the Lawson cone at infinity. The construction is based on a careful study of the Jacobi-Toda system on a given O(m)× O(n)-invariant manifold, which is asymptotic to the Lawson cone at infinity.
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