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New Results for Periodic Discrete Nonlinear Schrödinger Equations
  • Xiaoliang Xu,
  • Huiwen Chen,
  • Zigen Ouyang
Xiaoliang Xu
University of South China
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Huiwen Chen
University of South China

Corresponding Author:huiwchen@163.com

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Zigen Ouyang
University of South China
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Abstract

Consider the nonlinear difference equations of the form L u = f m ( u ) , m ∈ Z , where L is a Jacobi operator given by L u m = a m u m + 1 + a m − 1 u m − 1 + b m u m for m∈Z, { a m } and { b m } are real valued T-periodic sequences, and f:Z×R→R. Applying critical point theory and a new analytical method, we obtain that the above problem has ground state solutions and infinitely many geometrically distinct solutions under the local superlinear condition lim | x | → ∞ ∫ 0 x f m ( t ) dt | x | 2 = ∞ uniformly in mD for some set D⊂Z instead of the global superlinear condition lim | x | → ∞ ∫ 0 x f m ( t ) dt | x | 2 = ∞ uniformly in m∈Z.
22 Jul 2024Submitted to Mathematical Methods in the Applied Sciences
23 Jul 2024Submission Checks Completed
23 Jul 2024Assigned to Editor
31 Jul 2024Review(s) Completed, Editorial Evaluation Pending
14 Aug 2024Reviewer(s) Assigned
13 Oct 2024Editorial Decision: Revise Minor
01 Nov 20241st Revision Received
04 Nov 2024Submission Checks Completed
04 Nov 2024Assigned to Editor
04 Nov 2024Review(s) Completed, Editorial Evaluation Pending
07 Nov 2024Reviewer(s) Assigned
16 Nov 2024Editorial Decision: Accept