Dirac generating operators and Manin triples

Abstract

Given a pair of (real or complex) Lie algebroid structures on a vector bundle A (over M) and its dual A*, and a line bundle such that =( A* T*M), there exist two canonically defined differential operators and on A. We prove that the pair (A,A*) constitutes a Lie bialgebroid if, and only if, the square of =+ is the multiplication by a function on M. As a consequence, we obtain that the pair (A,A*) is a Lie bialgebroid if, and only if, is a Dirac generating operator as defined by Alekseev & Xu AlekseevXu. Our approach is to establish a list of new identities relating the Lie algebroid structures on A and A* (Theorem Thm:C).