The aim of this paper is to address the following question: given a contact
manifold $(\Sigma, \xi)$, what can be said about the aspherical symplectic
manifolds $(W, \omega)$ bounded by $(\Sigma, \xi)$ ? We first extend a theorem
of Eliashberg, Floer and McDuff to prove that under suitable assumptions the
map from $H_{*}(\Sigma)$ to $H_{*}(W)$ induced by inclusion is surjective. We
then apply this method in the case of contact manifolds having a contact
embedding in $ {\mathbb R}^{2n}$ or in a subcritical Stein manifold. We prove
in many cases that the homology of the fillings is uniquely determined. Finally
we use more recent methods of symplectic topology to prove that, if a contact
hypersurface has a Stein subcritical filling, then all its weakly subcritical
fillings have the same homology. A number of applications are given, from
obstructions to the existence of Lagrangian or contact embeddings, to the
exotic nature of some contact structures.