Hochschild cohomology related to graded down-up algebras with weights (1,n)

Abstract

Let A=A(α, β) be a graded down-up algebra with ( deg\,x, deg\,y)=(1,n) and β ≠ 0, and let ∇ A be the Beilinson algebra of A. If n=1, then a description of the Hochschild cohomology group of ∇ A is known. In this paper, we calculate the Hochschild cohomology group of ∇ A for the case n ≥ 2. As an application, we see that the structure of the bounded derived category of the noncommutative projective scheme of A is different depending on whether (smallmatrix 1&0 smallmatrix)(smallmatrix α &1 \\ β &0 smallmatrix)n(smallmatrix 1 \\ 0 smallmatrix) is zero or not. Moreover, it turns out that there is a difference between the cases n=2 and n≥ 3 in the context of Grothendieck groups.