On symplectic stabilisations and mapping classes

Abstract

We are interested in comparing properties of symplectic mapping class groups of symplectic manifolds of dimension four or higher with properties of classical mapping class groups of surfaces. For n ≥ 2, consider a configuration of Lagrangian Sns in a Weinstein domain M2n. If it is analogous, in some sense that we make precise, to a configuration of exact Lagrangian S1s on a surface , we show that any relation between Dehn twists in the Sns must also hold between the S1s. Such analogous pairs of configurations include plumbings of T S1s and T Sns with the same plumbing graph, and vanishing cycles for a two-variable singularity and for its stabilisation. We give a number of corollaries for subgroups of symplectic mapping class groups.