Asymptotic mapping class groups of closed surfaces punctured along Cantor sets

Abstract

We introduce subgroups Bg< Hg of the mapping class group Mod(g) of a closed surface of genus g 0 with a Cantor set removed, which are extensions of Thompson's group V by a direct limit of mapping class groups of compact surfaces of genus g. We first show that both Bg and Hg are finitely presented, and that Hg is dense in Mod(g). We then exploit the relation with Thompson's groups to study properties Bg and Hg in analogy with known facts about finite-type mapping class groups. For instance, their homology coincides with the stable homology of the mapping class group of genus g, every automorphism is geometric, and every homomorphism from a higher-rank lattice has finite image. In addition, the same connection with Thompson's groups will also prove that Bg and Hg are not linear and do not have Kazhdan's Property (T), which represents a departure from the current knowledge about finite-type mapping class groups.