Cohomology algebras of a family of cochain DG skew polynomial algebras

Abstract

Let A be a connected cochain DG algebra such that its underlying graded algebra A\# is the graded skew polynomial algebra k x1,x2, x3/(arrayccc x1x2+x2x1\\ x2x3+x3x2\\ x3x1+x1x3 array), |x1|=|x2|=|x3|=1. From MWZ or MWYZ, one sees that the differential ∂A is determined by align* ( arrayc ∂A(x1) ∂A(x2) ∂A(x3) array )=M( arrayc x12 x22 x32 array ), align* for some M∈ M3(k). For the case 1 r(M) 3, we compute H(A) case by case. The computational results in this paper give substantial support for MWZ, where the various homological properties of such DG algebras are systematically studied. We find some examples, which indicate that the cohomology graded algebra of a Koszul Calabi-Yau DG algebra may be not left (right) Gorenstein.