Z2-algebras as noncommutative blow-ups

Abstract

The goal of this note is to first prove that for a well behaved Z2-algebra R, the category QGr(R) := Gr(R)/Tors(R) is equivalent to QGr(R) where R is a diagonal-like sub-Z-algebra of R. Afterwards we use this result to prove that the Z2-algebras as introduced in [ArXiV:1607.08383] are QGr-equivalent to a diagonal-like sub-Z-algebra which is a simultaneous noncommutative blow-up of a quadratic and a cubic Sklyanin algebra. As such we link the noncommutative birational transformation and the associated Z2-algebras as appearing in the work of Van den Bergh and Presotto with the noncommutative blowups appearing in the work of Rogalski, Sierra and Stafford.