Homological framework of noncommutative complex analytic geometry and functional calculus

Abstract: In the paper we propose topological homology framework of noncommutative complex analytic geometries of Fréchet algebras, and investigate the related functional calculus and spectral mapping properties. It turns out that an ideal analytic geometry of a Fréchet algebra A can be described in terms of a Čech category over A. The functional calculus problem within a particular Čech A-category, and a left Fréchet A-module X is solved in term of the homological spectrum of X with respect to that category. As an application, we use the formal q-geometry of a contractive operator q-plane, and solve the related noncommutative holomorphic functional calculus problem. The related spectrum is reduced to Putinar spectrum of a Fréchet q-module. In the case of a Banach q-module we come up with the closure of its Taylor spectrum.