Two-sided estimates of total bandwidth for Schrödinger operators on periodic graphs
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Publication:2136181
DOI10.3934/cpaa.2022042OpenAlexW3169363023MaRDI QIDQ2136181
Natalia Saburova, Evgeny L. Korotyaev
Publication date: 10 May 2022
Published in: Communications on Pure and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2106.08661
Spectrum, resolvent (47A10) Infinite graphs (05C63) PDEs on graphs and networks (ramified or polygonal spaces) (35R02)
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Cites Work
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- Heat kernels on regular graphs and generalized Ihara zeta function formulas
- Magnetic Schrödinger operators on periodic discrete graphs
- Effective masses for Laplacians on periodic graphs
- Eigenvalue bracketing for discrete and metric graphs
- On the measure of gaps and spectra for discrete 1D Schrödinger operators
- Theory of nonlinear lattices.
- The spectrum of Jacobi matrices
- Estimates of periodic potentials in terms of gap lengths
- Spectral gaps and discrete magnetic Laplacians
- The spectral geometry of \(k\)-regular groups
- Selberg's trace formula on the \(k\)-regular tree and applications
- Spectral estimates for periodic Jacobi matrices
- Estimates for the Hill operator. I
- Trace formulas for Schrödinger operators on periodic graphs
- Invariants for Laplacians on periodic graphs
- Schrödinger operators on periodic discrete graphs
- Almost periodic Schrödinger operators. III: The absolutely continuous spectrum in one dimension
- Discrete path integral approach to the Selberg trace formula for regular graphs
- Effective masses for zigzag nanotubes in magnetic fields
- A Survey on Spectra of infinite Graphs
- Discrete Schrödinger operators on a graph
- Spectral band localization for Schrödinger operators on discrete periodic graphs
- Spectral estimates for Schrödinger operators on periodic discrete graphs
- Spectral estimates for Schrodinger operators with periodic matrix potentials on the real line
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