Dirac generating operators of split Courant algebroids

Abstract

Given a vector bundle A over a smooth manifold M such that the square root L of the line bundle topA topT M exists, the Clifford bundle associated to the split pseudo-Euclidean vector bundle (E = A A, ·, · ), admits a spinor bundle A L, whose section space can be thought of as that of Berezinian half-densities of the graded manifold A[1]. We give an explicit construction of Dirac generating operators of split Courant algebroid (or proto-bialgebroid) structures on A A introduced by Alekseev and Xu. We also prove that the square of the Dirac generating operator gives rise to an invariant of the split Courant algebroid.