Open AccessCasimir operators of groups of motions of spaces of constant curvature
Author(s) -
Nikolay Gromov
Publication year - 1981
Publication title -
theoretical and mathematical physics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.416
H-Index - 45
eISSN - 1573-9333
pISSN - 0040-5779
DOI - 10.1007/bf01028993
Subject(s) - casimir effect , constant curvature , group (periodic table) , mathematics , lie group , curvature , constant (computer programming) , poincaré group , space (punctuation) , mathematical physics , lie algebra , pure mathematics , mathematical analysis , physics , classical mechanics , quantum mechanics , geometry , computer science , programming language , linguistics , philosophy
Limit transitions are constructed between the generators (Casimir operators) of the center of the universal covering algebra for the Lie algebras of the groups of motions of n-dimensional spaces of constant curvature. A method is proposed for obtaining the Casimir operators of a group of motions of an arbitrary n-dimensional space of constant curvature from the known Casimir operators of the group SO(n + 1). The method is illustrated for the example of the groups of motions of four-dimensional spaces of constant curvature, namely, the Galileo, Poincare, Lobachevskii, de Sitter, Carroll, and other spaces.
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