The Cohomology of Transitive Lie Algebroids

Abstract

For a transitive Lie algebroid A on a connected manifold M and its a representation on a vector bundle F, we study the localization map Y1: H1(A,F)-> H1(Lx,Fx), where Lx is the adjoint algebra at x in M. The main result in this paper is that: Ker Y1x=Ker(p1*)=H1deR(M,F0). Here p1* is the lift of H1(,F) to its counterpart over the universal covering space of M and H1deR(M,F0) is the F0=H0(L,F)-coefficient deRham cohomology. We apply these results to study the associated vector bundles to principal fiber bundles and the structure of transitive Lie bialgebroids.