Topological normal generation of big mapping class groups

Abstract

A topological group G is topologically normally generated if there exists g ∈ G such that the normal closure of g is dense in G. Let S be a tame, infinite type surface whose mapping class group Map(S) is generated by a coarsely bounded set (CB generated). We prove that if the end space of S is countable, then Map(S) is topologically normally generated if and only if S is uniquely self-similar. Moreover, when the end space of S is uncountable, we provide a sufficient condition under which Map(S) is topologically normally generated. As a consequence, we construct uncountably many examples of surfaces that are not telescoping yet have topologically normally generated mapping class groups. Additionally, we establish the semidirect product structure of FMap(S), the subgroup of Map(S) that pointwisely fixes all maximal ends that each is isolated in the set of maximal ends of S. This result leads to a proof that the minimum number of topological normal generators of Map(S) is bounded both above and below by constants that depend only on the topology of S. Furthermore, we demonstrate that the upper bound grows quadratically with respect to this constant.