Mathematics – Quantum Algebra
Scientific paper
1997-08-04
J.Math.Phys. 39 (1998) 2306-2324
Mathematics
Quantum Algebra
21 pages Latex, No figures. Submitted to Journal of Mathematical Physics
Scientific paper
10.1063/1.532299
The product of two Heisenberg-Weil algebras contains the Jordan-Schwinger representation of su(2). This Algebra is quotiented by the square-root of the Casimir to produce a non-associative algebra denoted by $\Psi$. This algebra may be viewed as the right-module over one of its associative subalgebras which corresponds to the algebra of scalar fields on the noncommutative sphere. It is now possible to interpret other subspaces as the space of spinor or vector fields on the noncommutative sphere. A natural basis of $\Psi$ is given which may be interpreted as the deformed entries in the rotation matrices of SU(2).
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