Quantitative null-cobordism

Abstract

For a given null-cobordant Riemannian n-manifold, how does the minimal geometric complexity of a null-cobordism depend on the geometric complexity of the manifold? In [Gro99], Gromov conjectured that this dependence should be linear. We show that it is at most a polynomial whose degree depends on n. This construction relies on another of independent interest. Take X and Y to be sufficiently nice compact metric spaces, such as Riemannian manifolds or simplicial complexes. Suppose Y is simply connected and rationally homotopy equivalent to a product of Eilenberg-MacLane spaces: for example, any simply connected Lie group. Then two homotopic L-Lipschitz maps f, g : X → Y are homotopic via a CL-Lipschitz homotopy. We present a counterexample to show that this is not true for larger classes of spaces Y.