A new family of Poisson algebras and their deformations

Abstract

Let be a field of characteristic zero. For any positive integer n and any scalar a∈, we construct a family of Artin-Schelter regular algebras R(n,a), which are quantisations of Poisson structures on [x0,…,xn]. This generalises an example given by Pym when n=3. For a particular choice of the parameter a we obtain new examples of Calabi-Yau algebras when n≥ 4. We also study the ring theoretic properties of the algebras R(n,a). We show that the point modules of R(n,a) are parameterised by a bouquet of rational normal curves in Pn, and that the prime spectrum of R(n,a) is homeomorphic to the Poisson spectrum of its semiclassical limit. Moreover, we explicitly describe Spec\ R(n,a) as a union of commutative strata.