Structures of moduli spaces of generalized Cantor sets

Abstract

For each ω∈ (0, 1) N, we may construct a Cantor set E(ω)⊂ [0, 1] called a generalized Cantor set for ω. We study the moduli space of ω denoted by M(ω)⊂ (0, 1) N. It is the set of ω' so that E(ω') is quasiconformally equivalent to E(ω). In this paper, we show that the set M(ω) is measurable in (0, 1) N and we give a necessary condition for ω' to belong to M(ω). By using this condition, we show that there are uncountably many moduli spaces in (0, 1) N. We also show that except for at most one moduli space, the volume of the moduli space with respect to the standard product measure of (0, 1) N vanishes.

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