THE FORMAL GEOMETRY OF A CONTRACTIVE QUANTUM PLANE AND TAYLOR SPECTRUM

doi:10.1007/s10473-026-0217-z

Abstract

Abstract: The paper is devoted to noncommutative formal geometry of a contractive quantum plane, whose spectrum is the union of two copies of the complex plane. It turns out that a formal completion of the Arens-Michael envelope of a contractive quantum plane results in a noncommutative analytic space, whose base topological space is the same spectrum, whereas the structure sheaf is obtained as a certain quantization of the related commutative analytic space. As the basic tool we use the fibered products of the Fréchet sheaves. The related topological homology problems are considered to find out a key link between the transversality relation of the noncommutative sections versus to a left Fréchet module, and noncommutative Taylor spectrum of the module.

Key words: fibered product of Fré, chet algebras, quantizations, noncommutative analytic space, topological homology, transversality, noncommutative Taylor spectrum of a Fré, chet module, analytically parametrized Banach space complex

CLC Number:

46L52

Anar DOSI. THE FORMAL GEOMETRY OF A CONTRACTIVE QUANTUM PLANE AND TAYLOR SPECTRUM[J].Acta mathematica scientia,Series B, 2026, 46(2): 826-875.

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