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Multiplicity and limit of solutions for logarithmic Schrödinger equations on graphs

Mengqiu Shao, Yunyan Yang, Liang Zhao

2024Journal of Mathematical Physics12 citationsDOI

Abstract

Let Ω be a finite connected subset of a locally finite graph G = (V, E) with the vertex set V and the edge set E. We investigate the logarithmic Schrödinger equation on Ω with the nonlinear term |u|p−2u log u2. For p > 2, through two different approaches which are the Brouwer degree theory and mountain-pass theorem, we obtain the existence of ground state solutions. We also apply the Brouwer degree theory together with the constraint variational method to prove that the equation admits a sign-changing solution which implies the multiplicity of solutions to the equation. Finally, we illustrate that as p → 2, up to a subsequence, the solutions for p > 2 shall converge to a non-trivial solution of the equation with p = 2.

Topics & Concepts

MathematicsSubsequenceMultiplicity (mathematics)Schrödinger equationVertex (graph theory)LogarithmNonlinear systemDiscrete mathematicsMathematical analysisCombinatoricsGraphPhysicsQuantum mechanicsBounded functionNonlinear Partial Differential EquationsAdvanced Mathematical Physics ProblemsAdvanced Mathematical Modeling in Engineering
Multiplicity and limit of solutions for logarithmic Schrödinger equations on graphs | Litcius