Symplectic Mapping Class Group Relations Generalizing the Chain Relation

Abstract

In this paper, we examine mapping class group relations of some symplectic manifolds. For each n≥ 1 and k ≥ 1, we show that the 2n-dimensional Weinstein domain W = \f=δ\ B2n+2, determined by the degree k homogeneous polynomial f∈ C[z0,…,zn], has a Boothby-Wang type boundary and a right-handed fibered Dehn twist along the boundary that is symplectically isotopic to a product of right-handed Dehn twists along Lagrangian spheres. We also present explicit descriptions of the symplectomorphisms in the case n=2 recovering the classical chain relation for the torus with two boundary components.