Homological properties of homologically smooth connected cochain DGAs

Abstract

Assume that A is a connected cochain DG algebra. We show that A is homologically smooth and Gorenstein if and only if its Ext-algebra H(RA(k,k)) is a Frobenius graded algebra. Moreover, A is Calabi-Yau if and only if the Ext-algebra H(RA(k,k)) is a symmetric Frobenius graded algebra. These generalize the corresponding results in HW1 and HM, where the additional Koszul hypothesis is needed.

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