Group actions on monoidal triangulated categories and Balmer spectra
Abstract
Let G be a group acting on a left or right rigid monoidal triangulated category K which has a Noetherian Balmer spectrum. We prove that the Balmer spectrum of the crossed product category of K by G is homeomorphic to the space of G-prime ideals of K, give a concrete description of this space, and classify the G-invariant thick ideals of K. Under some additional technical conditions, we prove that the Balmer spectrum of the equivariantization of K by G is also homeomorphic to the space of G-prime ideals. Examples of stable categories of finite tensor categories and perfect derived categories of coherent sheaves on Noetherian schemes are used to illustrate the theory.
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