On the length spectrums of Riemann surfaces given by generalized Cantor sets

Abstract

For a generalized Cantor set E(ω) with respect to a sequence ω=\ qn \n=1∞ ⊂ (0,1), we consider Riemann surface XE(ω):=C E(ω) and metrics on Teichm\"uller space T(XE(ω)) of XE(ω). If E(ω) = C ( the middle one-third Cantor set), we find that on T(XC), Teichm\"uller metric dT defines the same topology as that of the length spectrum metric dL. Also, we can easily check that dT does not define the same topology as that of dL on T(XE(ω)) if qn =1. On the other hand, it is not easy to judge whether the metrics define the same topology or not if ∈f qn =0. In this paper, we show that the two metrics define different topologies on T(XE(ω)) for some ω=\ qn \n=1∞ such that ∈f qn =0.

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