Spaces of Pants Decompositions for Surfaces of Infinite Type

Abstract

We study the pants complex of surfaces of infinite type. When S is a surface of infinite type, the usual definition of the pants graph P(S) yields a graph with infinitely many connected-components. In the first part of our paper, we study this disconnected graph. In particular, we show that the extended mapping class group Mod(S) is isomorphic to a proper subgroup of Aut(P), in contrast to the finite-type case where Mod(S) Aut(P(S)). In the second part of the paper, motivated by the Metaconjecture of Ivanov, we seek to endow P(S) with additional structure. To this end, we define a coarser topology on P(S) than the topology inherited from the graph structure. We show that our new space is path-connected, and that its automorphism group is isomorphic to Mod(S).