Fine Hochschild invariants of derived categories for symmetric algebras

Abstract

Let A be a symmetric k-algebra over a perfect field k. K\"ulshammer defined for any integer n a mapping ζ\n on the degree 0 Hochschild cohomology and a mapping \n on the degree 0 Hochschild homology of A as adjoint mappings of the respective p-power mappings with respect to the symmetrizing bilinear form. In an earlier paper it is shown that ζ\n is invariant under derived equivalences. In the present paper we generalize the definition of \n to higher Hochschild homology and show the invariance of and its generalization under derived equivalences. This provides fine invariants of derived categories.

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