Cohomologies d'algèbres de Lie sur le fibré tangent d'ordre 2 (Q1084708)

Let M be a finite-dimensional, paracompact and connected smooth manifold. The author considers on \(T^ 2M\) a (1,1)-tensor field F of a special form and studies some Lie algebras associated to F. A typical such algebra is \(L_ F(T^ 2M)\) consisting of all vector fields X on \(T^ 2M\) so that the Lie derivative \(L_ XF\) vanishes. A similar study is performed when M is an affine manifold and F is replaced by a particular almost-tangent structure J on \(T^ 2M\). The paper also contains some results concerning the Chevalley cohomology of the considered Lie algebras.