Semilinear integro-differential equations, II: one-dimensional and saddle-shaped solutions to the Allen-Cahn equation

Abstract

This paper addresses saddle-shaped solutions to the semilinear equation LK u = f(u) in R2m, where LK is a linear elliptic integro-differential operator with a radially symmetric kernel K, and f is of Allen-Cahn type. Saddle-shaped solutions are doubly radial, odd with respect to the Simons cone \(x', x'') ∈ Rm × Rm \, : \, |x'| = |x''|\, and vanish only in this set. We establish the uniqueness and the asymptotic behavior of the saddle-shaped solution. For this, we prove a Liouville type result, the one-dimensional symmetry of positive solutions to semilinear problems in a half-space, and maximum principles in "narrow" sets. The existence of the solution was already proved in part I of this work.