Quantum polydisk, quantum ball, and a q-analog of Poincar\'e's theorem

Abstract

The classical Poincar\'e theorem (1907) asserts that the polydisk Dn and the ball Bn in Cn are not biholomorphically equivalent for n 2. Equivalently, this means that the Fr\'echet algebras O( Dn) and O( Bn) of holomorphic functions are not topologically isomorphic. Our goal is to prove a noncommutative version of the above result. Given q∈ C\ 0\, we define two noncommutative power series algebras Oq( Dn) and Oq( Bn), which can be viewed as q-analogs of O( Dn) and O( Bn), respectively. Both Oq( Dn) and Oq( Bn) are the completions of the algebraic quantum affine space Oqreg( Cn) w.r.t. certain families of seminorms. In the case where 0<q<1, the algebra Oq( Bn) admits an equivalent definition related to L. L. Vaksman's algebra of continuous functions on the closed quantum ball. We show that both Oq( Dn) and Oq( Bn) can be interpreted as Fr\'echet algebra deformations (in a suitable sense) of O( Dn) and O( Bn), respectively. Our main result is that Oq( Dn) and Oq( Bn) are not isomorphic if n 2 and |q|=1, but are isomorphic if |q| 1.