DG Algebra structures on the quantum affine n-space O-1(kn)

Abstract

Let A be a connected cochain DG algebra, whose underlying graded algebra A\# is the quantum affine n-space O-1(kn). We compute all possible differential structures of A and show that there exists a one-to-one correspondence between \cochain DG algebra\,\,A\,|\,A\#=O-1(kn)\ and the n× n matrices Mn(k). For any M∈ Mn(k), we write AO-1(k3)(M) for the DG algebra corresponding to it. We also study the isomorphism problems of these non-commutative DG algebras. For the cases n 3, we check their homological properties. Unlike the case of n=2, we discover that not all of them are Calabi-Yau when n=3. In spite of this, we recognize those Calabi-Yau ones case by case. In brief, we solve the problem on how to judge whether a given such DG algebra AO-1(k3)(M) is Calabi-Yau.