A criterion for virtual Euler class one

Abstract

Let M be an oriented closed hyperbolic 3--manifold. Suppose that w is a rational second cohomology class of M with dual Thurston norm 1. Upon the existence of certain nonvanishing Alexander polynomials, the author shows that the pullback of w to some finite cover of M is the real Euler class of some transversely oriented taut foliation on that cover. As application, the author constructs examples with first Betti number either 2 or 3, and partial examples with any first Betti number at least 4, supporting Yazdi's virtual Euler class one conjecture.

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