Unitarizability of Harish-Chandra bimodules over generalized Weyl and q-Weyl algebras
Abstract
Let A be a quantized (K-theoretic) BFN Coulomb branch with G=C* and any N, that is, A is a generalized Weyl or q-Weyl algebra. Let M be an A-A bimodule. Choosing an automorphism of A we can define the notion of an invariant Hermitian form: (au,v)=(u,v(a)) for all a∈ A and u,v∈ M. We obtain a classification of invariant positive definite forms on M in the case when M is Harish-Chandra in the sense of Losev and quantization parameter is generic.
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