Existence and invariance of twisted products on a symplectic manifold

We prove the existence of star-products and of formal deformations of the Poisson Lie algebra of an arbitrary symplectic manifold. Moreover, all the obstructions encountered in the step-wise construction of formal deformations are vanishing.

Let = 2 ν 2. Let M be an even dimensional manifold with cyclic fundamental group Z . Assume the universal cover M is spin. We shall define N (M) = M × M/Z 2 and express the eta invariant of N (M) in terms of the eta invariant of M. We use this computation to determine certain equivariant connective

Let G be a connected semisimple algebraic group over C, P a parabolic subgroup, g and p their Lie algebras. We prove a microlocal version of Gyoja's conjectures [2] about a relation between the irreducibility of generalized Verma modules on g induced from p and the zeroes of b-functions of P -semi-i

The fundamental group of compact isoenergy manifolds of natural n-degree of freedom Hamiltonian systems is discussed. It is demonstrated that a certain topology of corresponding accessible region in configuration space gives rise to topological obstruction to the existence of global Poincar e e sect