Equivariant Cleft Extensions and Singular Equivalences

Abstract

We study the equivariant lifting of cleft extensions of abelian categories and its impact on singularity categories. Specifically, we establish the necessary framework for lifting a cleft extension to a G-equivariant cleft extension. Furthermore, we prove that a restriction functor associated to a cleft extension induces a singular equivalence if and only if its equivariant counterpart does. As a concrete application, we demonstrate that the skew group ring of a G-equivariant θ-extension is isomorphic to a θ-extension of the base skew group ring, allowing us to lift singular equivalences for these structures.