Nonlinear Schrödinger equations on periodic metric graphs

The paper is devoted to the nonlinear Schrödinger equation with periodic linear and nonlinear potentials on periodic metric graphs. Assuming that the spectrum of linear part does not contain zero, we prove the existence offinite energy ground state solution which decays exponentially fast at indinity. The proof is variational and makes use of the generalized Nehari manifold for the energy functional combined with periodic approximations. Actually, afinite energy ground state solution is obtained from periodic solutions in the infinite wave length limit.

Authors
Pankov A. 1, 2
Publisher
American Institute of Mathematical Sciences
Number of issue
2
Language
English
Pages
697-714
Status
Published
Volume
38
Year
2018
Organizations
  • 1 Mathematics Department, Morgan State University, Baltimore, MD 21251, United States
  • 2 RUDN University, Moscow, 117198, Russian Federation
Keywords
Generalized Nehari manifold; Metric graph; Periodic approximation; Periodic nonlinear Schrödinger equation
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