Abstract
The Jordan-Schwinger calculus is discussed, using deformed bosons. This work constitutes a first step toward a complete study of the SU{sub q}(2) unit tensor. The objective is to find a realization of the components of this tensor in terms of q-bosons. The q-deformed Schwinger algebra relative to SU{sub q}(2) is defined, and an algorithm for producing recurrent relations between Clebsch-Gordan coefficients for SU{sub q}(2) is given. (K.A.) 18 refs.
Citation Formats
Smirnov, Yu F, and Kibler, M R.
Some aspects of q-boson calculus.
France: N. p.,
1992.
Web.
Smirnov, Yu F, & Kibler, M R.
Some aspects of q-boson calculus.
France.
Smirnov, Yu F, and Kibler, M R.
1992.
"Some aspects of q-boson calculus."
France.
@misc{etde_10138111,
title = {Some aspects of q-boson calculus}
author = {Smirnov, Yu F, and Kibler, M R}
abstractNote = {The Jordan-Schwinger calculus is discussed, using deformed bosons. This work constitutes a first step toward a complete study of the SU{sub q}(2) unit tensor. The objective is to find a realization of the components of this tensor in terms of q-bosons. The q-deformed Schwinger algebra relative to SU{sub q}(2) is defined, and an algorithm for producing recurrent relations between Clebsch-Gordan coefficients for SU{sub q}(2) is given. (K.A.) 18 refs.}
place = {France}
year = {1992}
month = {Oct}
}
title = {Some aspects of q-boson calculus}
author = {Smirnov, Yu F, and Kibler, M R}
abstractNote = {The Jordan-Schwinger calculus is discussed, using deformed bosons. This work constitutes a first step toward a complete study of the SU{sub q}(2) unit tensor. The objective is to find a realization of the components of this tensor in terms of q-bosons. The q-deformed Schwinger algebra relative to SU{sub q}(2) is defined, and an algorithm for producing recurrent relations between Clebsch-Gordan coefficients for SU{sub q}(2) is given. (K.A.) 18 refs.}
place = {France}
year = {1992}
month = {Oct}
}