The Prime Spectrum and Representation Theory of the 2× 2 Reflection Equation Algebra
Abstract
The theory of generalized Weyl algebras is used to study the 2× 2 reflection equation algebra A=Aq(M2) in the case that q is not a root of unity, where the R-matrix used to define A is the standard one of type A. Simple finite dimensional A-modules are classified, finite dimensional weight modules are shown to be semisimple, Aut(A) is computed, and the prime spectrum of A is computed along with its Zariski topology. Finally, it is shown that A satisfies the Dixmier-Moeglin equivalence.
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