Twisted Poincaré Duality for some Quadratic Poisson Algebras

In this paper we prove a general Poincare᎐Birkhoff᎐Witt theorem for quadratic Ḱoszul algebras. The result is similar to that obtained by Polischuk and Positselsky, but the proof is entirely different and uses algebraic deformation theory. In particular, we obtain a new proof of the classical PBW-the

The Letter is devoted to the Poisson brackets compatible with multiplication in associative algebras. These brackets are shown to be quadratic and their relations with the classical Yang-Baxter equation are revealed. The Letter also contains a description of Poisson Lie structures on Lie groups whos

In this paper, we construct certain twisted modules for framed vertex operator algebras. As a consequence, we obtain an explicit construction for some 2 A and 2 B twisted modules of the Moonshine vertex operator algebra.