Mayer--Vietoris and Twisted Cech Spectral Sequences for C*-Algebras with Free Quantum Group Coefficients

Abstract

We formulate a Mayer--Vietoris/Cech viewpoint on K-theory for crossed products by discrete quantum groups, emphasizing how local-to-global gluing data interacts with quantum-group coefficients. Starting from a G-equivariant ideal cover and the associated Mayer--Vietoris six-term exact sequence, we package the resulting K-theoretic computation into a Cech-type spectral sequence whose E1-page is explicitly described by iterated intersections. We then introduce a minimal ``twisted'' gluing mechanism controlled by a Z/2-valued Cech 2-cocycle and an involutive automorphism of the coefficient algebra. Under a Kirchberg--UCT hypothesis on the quantum-group crossed-product coefficient, the twist produces a nontrivial differential d2 identified as *-id on coefficient K-theory. In a concrete regime where the coefficient K-groups are cyclic (e.g.\ order 3), the differential becomes an isomorphism and forces a K-theoretic obstruction to Morita triviality. This yields a conceptual mechanism for producing non-Morita-trivial twisted C*-algebras with quantum-group crossed-product fibers, detected purely by Mayer--Vietoris/Cech data.