Twisted Conjugacy in Big Mapping Class Groups
Abstract
Let G be a group and be an automorphism of G. Two elements x, y of G are said to be -twisted conjugate if y=gx(g)-1 for some g∈ G. A group G has the R∞-property if the number of -twisted conjugacy classes is infinite for every automorphism of G. In this paper we prove that the big mapping class group MCG(S) possesses the R∞-property under some suitable conditions on the infinite-type surface S. As an application we also prove that the big mapping class group possesses the R∞-property if and only if it satisfies the S∞-property.
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