A Criterion for Virtual Euler Class One Using Nonvanishing Alexander Polynomials

The techniques presented in the paper, particularly the medley construction and the use of Alexander polynomials as an obstruction criterion, offer potential avenues for exploring other open problems in 3-manifold topology. Here are some possible directions: Virtual properties of other foliation invariants: Instead of focusing on the real Euler class, one could investigate the virtual behavior of other invariants associated with taut foliations, such as the homotopy class of the plane field, the Thurston norm of the Euler class, or the veering structure induced on pseudo-Anosov flows carried by the foliation. The medley construction could be adapted to manipulate these invariants in finite covers. Relationship with Heegaard Floer homology: Heegaard Floer homology is a powerful invariant of 3-manifolds that is closely related to taut foliations. It would be interesting to explore whether the Alexander polynomial criterion or the medley construction can be translated into the Heegaard Floer setting, potentially leading to new insights into the structure of Heegaard Floer homology groups for finite covers. Generalizations to other classes of 3-manifolds: While the paper focuses on hyperbolic 3-manifolds, it is natural to ask whether similar techniques can be applied to other classes, such as Seifert fibered spaces or graph manifolds. This would require understanding the behavior of taut foliations and Alexander polynomials in these settings. Connections with contact topology: Taut foliations are intimately connected to tight contact structures on 3-manifolds. The techniques presented in the paper might shed light on the existence of virtually tight contact structures, i.e., contact structures that become tight after lifting to a finite cover.

While the paper utilizes Alexander polynomials effectively, it's conceivable that alternative criteria exist for characterizing realizable rational points as real Euler classes in finite covers. Some potential avenues include: Twisted Alexander polynomials and representations: Twisted Alexander polynomials, associated with representations of the fundamental group, offer a richer source of information compared to their classical counterparts. Investigating their behavior under finite covers might provide finer obstructions or even sufficient conditions for realizability. Heegaard Floer homology and related invariants: As mentioned earlier, Heegaard Floer homology and its variants, such as sutured Floer homology and knot Floer homology, are deeply intertwined with taut foliations. Analyzing the behavior of these invariants under finite covers could lead to new criteria for realizability. Geometric techniques and hyperbolic geometry: Exploiting the interplay between taut foliations and the geometry of hyperbolic 3-manifolds might yield geometric criteria. For instance, studying the action of the fundamental group on the circle at infinity of hyperbolic space, or analyzing the veering structure induced by pseudo-Anosov flows carried by the foliation, could provide valuable insights. Obstructions from orderable groups: The fundamental groups of 3-manifolds admitting taut foliations often exhibit interesting orderability properties. Investigating these properties in the context of finite covers might lead to new obstructions for realizability.

The potential connection between the virtual Euler class one conjecture and quantum invariants is intriguing, given the established relationships between taut foliations and invariants like the Turaev-Viro invariants and the Reshetikhin-Turaev invariants. Here are some possible implications: New insights into quantum invariants: The virtual Euler class one conjecture, if true, could provide new perspectives on the behavior of quantum invariants under finite covers. For instance, it might imply certain stability properties or predictable patterns in the growth of these invariants as one ascends through finite covers. Constraints on taut foliations from quantum invariants: Conversely, the structure and properties of quantum invariants could impose constraints on the possible real Euler classes of taut foliations on finite covers. This could lead to new obstructions or potentially even a proof of the conjecture in specific cases. Connections with topological quantum field theory: The virtual Euler class one conjecture, if framed within the framework of topological quantum field theory (TQFT), might lead to a deeper understanding of the relationship between the geometric structures of taut foliations and the algebraic structures of TQFTs. Categorification and higher representation theory: The study of quantum invariants is closely related to categorification and higher representation theory. The virtual Euler class one conjecture, if it can be formulated in this language, might reveal new connections between the geometry of 3-manifolds and these areas of mathematics.