3-manifolds lying in trisected 4-manifolds

Abstract

The spine of a trisected 4-manifold is a singular 3-dimensional set from which the trisection itself can be reconstructed. 3-manifolds embedded in the trisected 4--manifold can often be isotoped to lie almost or entirely in the spine of the trisection. We define this notion and show that in fact every 3-manifold can be embedded to lie almost in the spine of a minimal genus trisection of some connect sum of S2 × S2s. This mirrors the known fact that every 3-manifold can be smoothly embedded in a connect sum of S2 × S2s. Our methods additionally give an upper bound for how many copies of S2 × S2 based on a distance calculated in an appropriately defined graph. For the special case of lens spaces we analyze more closely and obtain more explicit bounds.