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Noncommutative Tensor Triangular Geometry And Its Applications To Representation Theory, Kent Barton Vashaw
Noncommutative Tensor Triangular Geometry And Its Applications To Representation Theory, Kent Barton Vashaw
LSU Doctoral Dissertations
One of the cornerstones of the representation theory of Hopf algebras and finite tensor categories is the theory of support varieties. Balmer introduced tensor triangular geometry for symmetric monoidal triangulated categories, which united various support variety theories coming from disparate areas such as homotopy theory, algebraic geometry, and representation theory. In this thesis a noncommutative version will be introduced and developed. We show that this noncommutative analogue of Balmer's theory can be determined in many concrete situations via the theory of abstract support data, and can be used to classify thick tensor ideals. We prove an analogue of prime ideal …