Gaps and bands of one dimensional periodic Schrödinger operators. II
From MaRDI portal
Publication:1105754
DOI10.1007/BF02564436zbMath0649.34034OpenAlexW1971470864MaRDI QIDQ1105754
Eugene Trubowitz, John B. Garnett
Publication date: 1987
Published in: Commentarii Mathematici Helvetici (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/140075
Special ordinary differential equations (Mathieu, Hill, Bessel, etc.) (34B30) Inverse problems involving ordinary differential equations (34A55)
Related Items (25)
Periodic ``weighted operators ⋮ On the resonances and eigenvalues for a 1D half-crystal with localised impurity ⋮ The estimates of periodic potentials in terms of effective masses ⋮ Unnamed Item ⋮ On the symplectic structure of the phase space for periodic KdV, Toda, and defocusing NLS ⋮ Global transformations preserving Sturm-Liouville spectral data ⋮ Gap-length mapping for periodic Jacobi matrices ⋮ Inverse spectral theory for perturbed torus ⋮ Eigenvalues of Schrödinger operators on finite and infinite intervals ⋮ On double eigenvalues of Hill's operator ⋮ On the spectra of carbon nano-structures ⋮ Estimates for the Hill operator. I ⋮ Inverse problems for Aharonov–Bohm rings ⋮ There is no two dimensional analogue of Lamé's equation ⋮ Conformal spectral theory for the monodromy matrix ⋮ Ergodic Jacobi matrices and conformal maps ⋮ Estimates for the Hill operator. II ⋮ Estimates for periodic Zakharov-Shabat operators ⋮ Marchenko-Ostrovski mapping for periodic Zakharov-Shabat systems ⋮ On spectral decompositions corresponding to non-self-adjoint Sturm-Liouville operators ⋮ An overview of periodic elliptic operators ⋮ INVERSE SPECTRAL PROBLEMS FOR SINGULAR RANK-ONE PERTURBATIONS OF A HILL OPERATOR ⋮ Inverse spectral theory for uniformly open gaps in a weighted Sturm-Liouville problem ⋮ Attractors and transients for a perturbed periodic KdV equation: A nonlinear spectral analysis ⋮ Fibration of the phase space for the Korteweg-de Vries equation
This page was built for publication: Gaps and bands of one dimensional periodic Schrödinger operators. II
