Hochschild cohomology of Beilinson algebras of graded down-up algebras with weights (n,m)

Abstract

Let A=A(α, β) be a graded down-up algebra with weights (deg\, x, deg\, y)=(n,m) and β≠ 0, and ∇ A its Beilinson algebra. Such an algebra A is a 3-dimensional cubic AS-regular algebra by Kirkman--Musson--Passman. Assuming gcd\,(n, m)=1 and m ≥ n, we extend the previous results on the Hochschild cohomology of ∇ A. Known cases include (n,m) = (1,1) (Belmans) and (n = 1,\,m ≥ 2) (Itaba--Ueyama). In this paper, we determine the dimensions of the Hochschild cohomology groups of ∇ A in the remaining case n≥ 2 and m≥ 2 by explicitly constructing the projective resolution and computing the ranks of the arising representation matrices. As a byproduct, for m>n>1, we show that the derived category of the noncommutative projective scheme associated to A is not equivalent to the derived category of any smooth projective surface. Moreover, for all m ≥ n ≥ 1, we describe the ring structure of the Hochschild cohomology group ∇ A with respect to the Yoneda product.