On cofinite subgroups of mapping class groups
Abstract
For any positive integer n, we exhibit a cofinite subgroup n of the mapping class group of a surface of genus at most two such that n admits an epimorphism onto a free group of rank n. We conclude that H1(n;) has rank at least n and the dimension of the second bounded cohomology of each of these mapping class groups is the cardinality of the continuum. In the case of genus two, the groups n can be chosen not to contain the Torelli group. Similarly for hyperelliptic mapping class groups. We also exhibit an automorphism of a subgroup of finite index in the mapping class group of a sphere with four punctures (or a torus) such that it is not the restriction of an endomorphism of the whole group.
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