Nonformal deformations of the algebras of holomorphic functions on the polydisk and on the ball in Cn
Abstract
We construct Fr\'echet O( C×)-algebras Odef( Dn) and Odef( Bn) which may be interpreted as nonformal (or, more exactly, holomorphic) deformations of the algebras O( Dn) and O( Bn) of holomorphic functions on the polydisk Dn⊂ Cn and on the ball Bn⊂ Cn, respectively. The fibers of our algebras over q∈ C× are isomorphic to the previously introduced ``quantum polydisk'' and ``quantum ball'' algebras, Oq( Dn) and Oq( Bn). We show that the algebras Odef( Dn) and Odef( Bn) yield continuous Fr\'echet algebra bundles over C× which are strict deformation quantizations (in Rieffel's sense) of Dn and Bn. We also give a noncommutative power series interpretation of Odef( Dn) and apply it to showing that Odef( Dn) is not topologically projective (and a fortiori is not topologically free) over O( C×). Finally, we consider respective formal deformations of O( Dn) and O( Bn), and we show that they can be obtained from the holomorphic deformations by extension of scalars.
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