Some five-dimensional Artin-Schelter regular algebras obtained by deforming a Lie algebra. (Q2797016)

Suppose that \(A\) is an associative algebra over an algebraically closed field \(k\) of characteristic zero which is generated by elements \(x,y,z,w\) subject to the set of defining relations NEWLINE\[NEWLINExy+\alpha yx+\beta zw+\gamma wz=xz+azx=xw+bwx=yz+czy=yw+dwy=0.NEWLINE\]NEWLINE Suppose that \(\alpha\beta\gamma\neq 0\) and \(abcd=1\). Then \(A\) is AS regular of dimension 5. It is also strongly Noetherian, Auslander regular, Cohen-Macaulay domain with the Hilbert series \(\tfrac{1}{(1-t^2)(1-t)^4}\).NEWLINENEWLINE If \(\beta\neq 0\) and \(abcd=1\), then \(A\) is piecewise Koszul of type \((3,4)\). It means that the trivial \(A\)-module admits a minimal graded projective resolution \(\cdots\to P_n\to\cdots\to P_0\to k\to 0\) such that \(P_n\) is generated in degree \(4s+\varepsilon\) where \(n=3s+\varepsilon\) and \(\varepsilon=0,1,2\).