A one-dimensional symmetry result for a class of nonlocal semilinear equations in the plane

Yannick Sire; François Hamel; Xavier Ros-Oton; Enrico Valdinoci

doi:10.1016/j.anihpc.2016.01.001

JournalsaihpcVol. 34, No. 2pp. 469–482

A one-dimensional symmetry result for a class of nonlocal semilinear equations in the plane

Yannick Sire
Aix Marseille Université, CNRS, Centrale Marseille, Institut de Mathématiques de Marseille, UMR 7373, 13453 Marseille, France
François Hamel
Aix Marseille Université, CNRS, Centrale Marseille, Institut de Mathématiques de Marseille, UMR 7373, 13453 Marseille, France
Xavier Ros-Oton
The University of Texas at Austin, Department of Mathematics, 2515 Speedway, Austin, TX 78751, USA
Enrico Valdinoci
Weierstraß Institute, Mohrenstraße 39, 10117 Berlin, Germany, Università di Milano, Dipartimento di Matematica Federigo Enriques, Via Cesare Saldini 50, 20133 Milano, Italy, The University of Melbourne, Department of Mathematics and Statistics, Parkville, VIC 3052, Australia

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Abstract

We consider entire solutions to $L u = f (u)$ in $R^{2}$ , where $L$ is a nonlocal operator with translation invariant, even and compactly supported kernel K. Under different assumptions on the operator $L$ , we show that monotone solutions are necessarily one-dimensional. The proof is based on a Liouville type approach. A variational characterization of the stability notion is also given, extending our results in some cases to stable solutions.

Cite this article

Yannick Sire, François Hamel, Xavier Ros-Oton, Enrico Valdinoci, A one-dimensional symmetry result for a class of nonlocal semilinear equations in the plane. Ann. Inst. H. Poincaré Anal. Non Linéaire 34 (2017), no. 2, pp. 469–482

DOI 10.1016/J.ANIHPC.2016.01.001