Davydov-Yetter cohomology for Tensor Triangulated Categories

Abstract

One way to understand the deformation theory of a tensor category M is through its Davydov-Yetter cohomology HDY(M) which in degree 3 and 4 is known to control respectively first order deformations of the associativity coherence of M and their obstructions. \\ In this work we take the task of developing an analogous theory for the deformation theory of tensor triangulated categories with a focus on derived categories coming from algebraic geometry. We introduce the concept of perfect pseudo dg-tensor structure on an appropriate dg-category T as a truncated dg-lift of a tensor triangulated category structure on H0(T) and we define a double complex DY,() and we see that the 4th cohomology group HDY4() of the total complex of DY,() contains information about infinitesimal first order deformations of the tensor structure.

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