Regular sequences for triangulated categories
Abstract
This paper systematically develops a notion of regular sequences in the context of R-linear triangulated categories for a graded-commutative ring R. The notion has equivalent characterizations involving Koszul objects and local cohomology. The main examples are in the context of the Hochschild cohomology ring or the group cohomology ring acting on derived or stable categories. As applications, lengths of regular sequences provide lower bounds for level and Rouquier dimension.
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