Cutting and Gluing Surfaces

Abstract

We start with a disk with 2n vertices along its boundary where pairs of vertices are connected with n strips with certain restrictions. This forms a pairing. To relate two pairings, we define an operator called a cut-and-glue operation. We show that this operation does not change an invariant of pairings known as the signature. Pairings with a signature of 0 are special because they are closely related to a topological construction through cut and glue operations that have other applications in topology. We prove that all balanced pairings for a fixed n are connected on a surface with any number of boundary components. As a topological application, combined with works of Li, this shows that a properly embedded surface induces a well-defined grading on the sutured monopole Floer homology defined by Kronheimer and Mrowka.