The 2-width of embedded 3-manifolds

Abstract

We discuss a possible definition for "k-width" of both a closed d-manifold Md, and on embedding Md e Rn, n > d k, generalizing the classical notion of width of a knot. We show that for every 3-manifold 2-width(M3) 2 but that there are embeddings ei: T3 R4 with 2-width(ei) ∞. We explain how the divergence of 2-width of embeddings offer a tool to which might prove the Goeritz groups Gg infinitely generated for g ≥ 4. Finally we construct a homeomorphism θg: Gg MCG(g\# S2 × S2), suggesting a potential application of 2-width to 4D mapping class groups.