Spherical Twists for Gorenstein Orders and G-Hilb

Abstract

This paper constructs derived autoequivalences of Gorenstein orders as twists around spherical functors. More precisely, given a Gorenstein order A and a quotient p A B, then we specify natural conditions on B under which the twist around the corresponding derived restriction of scalars functor is a derived autoequivalence of A. In the process, we show that the associated cotwist is a shift of the Nakayama functor of B. These results, together with local-to-global technology, are then used construct new derived autoequivalences for skew group algebras and G-Hilbert schemes, and we apply this theory to explicit examples.