Block mapping class groups and their finiteness properties

Abstract

A Cantor surface Cd is a non-compact surface obtained by gluing copies of a fixed compact surface Yd (a block), with d+1 boundary components, in a tree-like fashion. For a fixed subgroup H<Map(Yd) , we consider the subgroup Bd(H)<Map( Cd) whose elements eventually send blocks to blocks and act like an element of H; we refer to Bd(H) as the block mapping class group with local action prescribed by H. The family of groups so obtained contains the asymptotic mapping class groups of SW21a,ABF+21, FK04. Moreover, there is a natural surjection onto the family symmetric Thompson groups of Farley--Hughes FH15; in particular, they provide a positive answer to [Question 5.37]AV20. We prove that, when the block is a (holed) sphere or a (holed) torus, Bd(H) is of type Fn if and only if H is of type Fn. As a consequence, for every n, Map(Cd) has a subgroup of type Fn but not Fn+1 which contains the mapping class group of every compact subsurface of Cd.

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