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Optimal maximal gaps of Dirichlet eigenvalues of Sturm–Liouville operators

Shuyuan Guo, Gang Meng, Ping Yan, Meirong Zhang

2022Journal of Mathematical Physics10 citationsDOI

Abstract

In this paper, we consider the gaps λ2n(q) − λ1(q) for the Dirichlet eigenvalues {λm(q)} of Sturm–Liouville operators with potentials q on the unit interval. By merely assuming that potentials q have the L1 norm r, we will explicitly give the solutions to the maximization problems of λ2n(q) − λ1(q), where n is arbitrary. As a consequence, the solutions can lead to the optimal upper bounds for these eigenvalue gaps. The proofs are extensively based on the eigenvalue theory of measure differential equations in Meng and Zhang [J. Differ. Equations 254, 2196–2232 (2013)] and on the known results of the optimization problems for single eigenvalues of ordinary differential equations in Wei, Meng, and Zhang [J. Differ. Equations 247, 364–400 (2009)].

Topics & Concepts

Eigenvalues and eigenvectorsMathematicsSturm–Liouville theoryDirichlet eigenvalueDirichlet distributionMathematical analysisMaximizationDirichlet problemOrdinary differential equationDifferential equationApplied mathematicsPure mathematicsDirichlet's principlePhysicsBoundary value problemQuantum mechanicsMathematical optimizationSpectral Theory in Mathematical PhysicsNonlinear Differential Equations AnalysisQuasicrystal Structures and Properties
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