On homotopy invariants of combings of 3-manifolds

Abstract

Combings of oriented compact 3-manifolds are homotopy classes of nowhere zero vector fields in these manifolds. A first known invariant of a combing is its Euler class, that is the Euler class of the normal bundle to a combing representative in the tangent bundle of the 3-manifold M. It only depends on the Spinc-structure represented by the combing. When this Euler class is a torsion element of H2(M;Z), we say that the combing is a torsion combing. Gompf introduced a Q-valued invariant θG of torsion combings of closed 3-manifolds that distinguishes all combings that represent a given Spinc-structure. This invariant provides a grading of the Heegaard Floer homology HF for manifolds equipped with torsion Spinc-structures. We give an alternative definition of the Gompf invariant and we express its variation as a linking number. We also define a similar invariant p1 for combings of manifolds bounded by S2. We show that the -invariant, that is the simplest configuration space integral invariant of rational homology spheres, is naturally an invariant of combings of rational homology balls, that reads (14p1 + 6 λ) where λ is the Casson-Walker invariant. The article also includes a mostly self-contained presentation of combings.