Simple finite Jordan pseudoalgebras (Q1016717)

A complex pseudoalgebra over a Hopf algebra \(H\) is a left \(H\)-module \(P\) equipped with an \(H\)-bilinear product \(*: P\otimes P\to(H\otimes H)\otimes_HP\). In the paper it is assumed that \(P\) is a finitely generated \(H\)-module and it admits a multiplication \(a\circ b\) satisfying some relations which are close the definition of a Jordan algebra. It is also assumed that \(H\) is either a universal enveloping algebra \(U\) of a finite dimensional Hopf algebra or a crossed product of \(U\) and an arbitrary group algebra, where the group acts by automorphisms. The main result is the analog of Tits-Kantor-Koecher theorem and a classification of simple Jordan pseudoalgebras.