Entropy versus volume via Heegaard diagrams
Abstract
The following inequalities are established, improving a former inequality due to Kojima. For any closed arithmetic hyperbolic 3--manifold fibering over a circle, the entropy of the pseudo-Anosov monodromy is bounded by the hyperbolic volume of the 3--manifold, up to a universal constant factor. For any closed hyperbolic 3--manifold fibering over a circle with systole ≥>0, the entropy is bounded by the hyperbolic volume times (3+1/), up to a universal constant factor. The proof relies on Heegaard Floer homology and hyperbolic geometry.
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