Twisted Traces and Positive Forms on Generalized q-Weyl Algebras
Abstract
Let A be a generalized q-Weyl algebra, it is generated by u, v, Z, Z-1 with relations ZuZ-1=q2u, ZvZ-1=q-2v, uv=P(q-1Z), vu=P(qZ), where P is a Laurent polynomial. A Hermitian form (·,·) on A is called invariant if (Za,b)=(a,bZ-1), (ua,b)=(a,sbv), (va,b)=(a,s-1bu) for some s∈ C with |s|=1 and all a,b∈ A. In this paper we classify positive definite invariant Hermitian forms on generalized q-Weyl algebras.
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