Fibered Cohomology Classes in Dimension Three, Twisted Alexander Polynomials and Novikov Homology
Abstract
We prove that for "most" closed 3-dimensional manifolds M, the existence of a closed non singular one-form in a given cohomology class u∈ H1 (M, R) is equivalent to the fact that every twisted Alexander polynomial H(M,u) ∈ Z[G/ u] associated to a normal subgroup with finite index H < π1(M) has a unitary u-minimal term.
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