The co-rank of the fundamental group: the direct product, the first Betti number, and the topology of foliations

Abstract

We study b'1(M), the co-rank of the fundamental group of a smooth closed connected manifold M. We calculate this value for the direct product of manifolds. We characterize the set of all possible combinations of b'1(M) and the first Betti number b1(M) by explicitly constructing manifolds with any possible combination of b'1(M) and b1(M) in any given dimension. Finally, we apply our results to the topology of Morse form foliations. In particular, we construct a manifold M and a Morse form ω on it for any possible combination of b'1(M), b1(M), m(ω), and c(ω), where m(ω) is the number of minimal components and c(ω) is the maximum number of homologically independent compact leaves of ω.