Your search keyword '"Primary 34L40, 34B20, Secondary 46E22, 34A55"' showing total 2 results

1. Inverse uniqueness results for one-dimensional weighted Dirac operators

Author

Eckhardt, Jonathan, Kostenko, Aleksey, and Teschl, Gerald

Subjects

Mathematics - Spectral Theory, Mathematical Physics, Primary 34L40, 34B20, Secondary 46E22, 34A55

Abstract

Given a one-dimensional weighted Dirac operator we can define a spectral measure by virtue of singular Weyl-Titchmarsh-Kodaira theory. Using the theory of de Branges spaces we show that the spectral measure uniquely determines the Dirac operator up to a gauge transformation. Our result applies in particular to radial Dirac operators and extends the classical results for Dirac operators with one regular endpoint. Moreover, our result also improves the currently known results for canonical (Hamiltonian) systems. If one endpoint is limit circle case, we also establish corresponding two-spectra results., Comment: 17 pages, in "Spectral Theory and Differential Equations: V.A. Marchenko 90th Anniversary Collection", E. Khruslov, L. Pastur, and D. Shepelsky (eds), 117-133, Advances in the Mathematical Sciences 233, Amer. Math. Soc., Providence, 2014

Published

2013

2. Inverse uniqueness results for one-dimensional weighted Dirac operators

Author

Aleksey Kostenko, Gerald Teschl, and Jonathan Eckhardt

Subjects

010101 applied mathematics, Mathematics - Spectral Theory, Primary 34L40, 34B20, Secondary 46E22, 34A55, 010102 general mathematics, FOS: Mathematics, FOS: Physical sciences, Mathematical Physics (math-ph), 0101 mathematics, 01 natural sciences, Spectral Theory (math.SP), Mathematical Physics

Abstract

Given a one-dimensional weighted Dirac operator we can define a spectral measure by virtue of singular Weyl-Titchmarsh-Kodaira theory. Using the theory of de Branges spaces we show that the spectral measure uniquely determines the Dirac operator up to a gauge transformation. Our result applies in particular to radial Dirac operators and extends the classical results for Dirac operators with one regular endpoint. Moreover, our result also improves the currently known results for canonical (Hamiltonian) systems. If one endpoint is limit circle case, we also establish corresponding two-spectra results., 17 pages, in "Spectral Theory and Differential Equations: V.A. Marchenko 90th Anniversary Collection", E. Khruslov, L. Pastur, and D. Shepelsky (eds), 117-133, Advances in the Mathematical Sciences 233, Amer. Math. Soc., Providence, 2014

Published

2013