τ-Hochschild (co)homology, the square of the Serre bimodule, and the Coxeter automorphism of the Tamarkin--Tsygan calculus

Abstract

We relate two recent enrichments of the Hochschild theory of a finite-dimensional algebra : the τ-Hochschild (co)homology of Cibils, Lanzilotta, Marcos and Solotar, built from Iyama's higher Auslander--Reiten translates of the regular bimodule, and the Coxeter automorphism σ of the Tamarkin--Tsygan calculus. We show that the Nakayama functor of the enveloping algebra transforms Happel's minimal resolution into a complex representing , the square of the Serre bimodule whose shift generates σ, and that the τ-translates τn are precisely the cycle bimodules of this complex. This produces extensions 0 n τn n(,) 0 whose outer term is dual to n(,) and whose inner term is a strictly Morita-theoretic residue of the minimal model. In top degree d= the residue vanishes and τd is the dual of the degree-one component of the (d+1)-preprojective algebra of Iyama--Oppermann; for = Q hereditary, τ Π(Q)1 and 1τ( Q) is the degree-one part of the zeroth Hochschild homology of the preprojective algebra. For self-injective algebras, the derived part vanishes identically, which explains structurally the growth of τ-cohomology for the Buchweitz--Green--Madsen--Solberg algebras. Taking Euler characteristics in the Cibils--Lanzilotta--Marcos--Solotar dimension formulas recovers Happel's trace formula Σi(-1)ii()=-σ. We prove that the two refinements are transversal, propose the combined Morita invariant, exhibit derived-equivalent algebras of finite global dimension whose τ-translates have identical dimension but opposite composition, and pose the problem of derived invariance of τ-Hochschild theory over the smooth locus.

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