Multisections of (m+3)-dimensional m-spun 3-manifolds

Abstract

A multisection, or n-section, of an (n + 1)-dimensional manifold is a decomposition of this manifold into n 1-handlebodies of dimension n+1, such that all these handlebodies intersect along a closed surface, and every subcollection of k handlebodies intersects along an (n - k + 2)-dimensional 1-handlebody. This concept, due to Ben Aribi, Courte, Golla and Moussard, generalizes to any dimension Heegaard splittings and Gay and Kirby's trisections. If any (n+1)-manifold admits a multisection for n ≤ 4, there are yet no general existence results for n ≥ 5. In this article, we provide a class of examples of multisected manifolds in all dimensions. We extend the concept of 4-dimensional spun manifolds to any dimension, and construct multisections and their associated multisection diagrams for the class of m-spun 3-manifolds, of dimension m+3, for any m. This allows us to give infinitely many examples of non-diffeomorphic multisected manifolds, in all dimensions.