Open AccessHilbert Space Representations of Generalized Canonical Commutation Relations
Author(s) -
Asao Arai
Publication year - 2013
Publication title -
journal of mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.252
H-Index - 13
eISSN - 2314-4785
pISSN - 2314-4629
DOI - 10.1155/2013/308392
Subject(s) - mathematics , hilbert transform , path (computing) , matrix (chemical analysis) , commutation , pure mathematics , generalization , combinatorics , mathematical analysis , physics , quantum mechanics , voltage , chemistry , statistics , spectral density , chromatography , computer science , programming language
We consider Hilbert space representations of a generalization of canonical commutation relations , where 's are the elements of an algebra with identity , is the imaginary unit, and is a real number with antisymmetry . Some basic aspects on Hilbert space representations of the generalized CCR (GCCR) are discussed. We define a Schrödinger-type representation of the GCCR by an analogy with the usual Schrödinger representation of the CCR with degrees of freedom. Also, we introduce a Weyl-type representation of the GCCR. The main result of the present paper is a uniqueness theorem on Weyl representations of the GCCR.
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