On the classification of Smale-Barden manifolds with Sasakian structures

Abstract

Smale-Barden manifolds M are classified by their second homology H2(M, Z) and the Barden invariant i(M). It is an important and dificult question to decide when M admits a Sasakian structure in terms of these data. In this work we show methods of doing this. In particular we realize all M with H2(M)= Zk(i=1r Zmi2gi) and i=0,∞, provided that k≥ 1, mi≥ 2, gi≥ 1, mi are pairwise coprime. Using our methods we also contribute to the problem of the existence of definite Sasakian structures on rational homology spheres. Also, we give a complete solution to the problem of the existence of Sasakian structures on rational homology spheres in the class of semi-regular Sasakian structures.