Finite index subgroups of mapping class groups
Abstract
Let g≥3 and n≥0, and let Mg,n be the mapping class group of a surface of genus g with n boundary components. We prove that Mg,n contains a unique subgroup of index 2g-1(2g-1) up to conjugation, a unique subgroup of index 2g-1(2g+1) up to conjugation, and the other proper subgroups of Mg,n are of index greater than 2g-1(2g+1). In particular, the minimum index for a proper subgroup of Mg,n is 2g-1(2g-1).
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