Minimal stretch factors of orientation-reversing fully-punctured pseudo-Anosov maps
Abstract
We show that the stretch factor λ(f) of an orientation-reversing fully-punctured pseudo-Anosov map f on a finite-type orientable surface S, with -(S) ≥ 4 and having at least two puncture orbits, satisfies the inequality λ(f)-(S) ≥ σ2, where σ=1+2 is the silver ratio. We provide examples showing that this bound is asymptotically sharp. This extends previous results of Hironaka and the third author to orientation-reversing maps.
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