Inverse Problem for Interior Spectral Data of the Dirac Operator on a Finite Interval | Zendy

Kiyoshi Mochizuki | Zendy; Igor Trooshin | Zendy

AI Assistant Blog Pricing

Home ZAIA Blog

Open Access

Inverse Problem for Interior Spectral Data of the Dirac Operator on a Finite Interval

Author(s) -

Kiyoshi Mochizuki,

Igor Trooshin

Publication year - 2002

Publication title -

publications of the research institute for mathematical sciences

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.786

H-Index - 39

eISSN - 1663-4926

pISSN - 0034-5318

DOI - 10.2977/prims/1145476343

Subject(s) - mathematics , eigenfunction , operator (biology) , interval (graph theory) , inverse problem , inverse , spectrum (functional analysis) , dirac operator , uniqueness , mathematical analysis , dirac (video compression format) , point (geometry) , eigenvalues and eigenvectors , combinatorics , quantum mechanics , physics , geometry , biochemistry , chemistry , repressor , transcription factor , neutrino , gene

In this paper the inverse problems for the Dirac Operator are studied. A set of values of eigenfunctions in some internal point and spectrum are taken as a data. Uniqueness theorems are obtained. The approach that was used in the investigation of inverse problems for interior spectral data of the Sturm-Liouville operator is employed.

The content you want is available to Zendy users.

Already have an account? Click here to sign in.

Having issues? You can contact us here

Accelerating Research