A family of simple U(h)-free modules of rank 2 over sl (2)
Abstract
We study simple sl(2)-modules over C that are free of finite rank as U( h)-modules, where h is a Cartan subalgebra of sl(2). Our main result is an explicit classification of the scalar-type simple modules of rank 2. We also give a criterion for when two such modules are isomorphic. Both the classification and the isomorphism problem reduce to twisted conjugacy classes in GL2( C[h]) and rely on Cohn's standard form.
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