Trace Formulas and Borg-type Theorems for Matrix-Valued Jacobi and Dirac Finite Difference Operators

Author

Stephen L. Clark, Missouri University of Science and TechnologyFollow
Fritz Gesztesy
Walter Renger

Abstract

Borg-type uniqueness theorems for matrix-valued Jacobi operators H and supersymmetric Dirac difference operators D are proved. More precisely, assuming reflectionless matrix coefficients A,B in the self-adjoint Jacobi operator H=AS++A-S-+B (with S± the right/left shift operators on the lattice View the MathML source) and the spectrum of H to be a compact interval [E-,E+], E-

Recommended Citation

S. L. Clark et al., "Trace Formulas and Borg-type Theorems for Matrix-Valued Jacobi and Dirac Finite Difference Operators," Journal of Differential Equations, Elsevier, Jan 2005.

The definitive version is available at https://doi.org/10.1016/j.jde.2005.04.013

Department(s)

Mathematics and Statistics

Keywords and Phrases

Borg Theorems; Dirac Difference Operators; Dirac Equation; Jacobi Operators; Trace Formulas

International Standard Serial Number (ISSN)

0022-0396

Document Type

Article - Journal

Document Version

Citation

File Type

text

Language(s)

English

Rights

© 2005 Elsevier, All rights reserved.

Publication Date

01 Jan 2005