Small Torsion Topological Generators for Big Mapping Class Groups

Abstract

Let S(n), for n ∈ N, be the infinite-type surface of infinite genus with n ends, each accumulated by genus. Although the mapping class groups of these surfaces are not countably generated,they are Polish groups and hence admit a countable topological generating set. We study minimal topological generating sets for Map(S(n)) consisting entirely of torsion elements, with special attention to involutions. In particular, we prove that Map(S(n)) is topologically generated by four involutions for all n ≥ 16, and by three involutions for the Loch Ness Monster surface (n = 1) and the Jacob's Ladder surface (n = 2). We also establish that for even n ≥ 8, Map(S(n)) is topologically generated by four torsion elements of order n. For odd n ≥ 8, it is topologically generated by three torsion elements of order n and one torsion element of order n - 1.