Scalar Curvature, Injectivity Radius and Immersions with Small Second Fundamental Forms

Abstract

We prove in special cases the following. Sc Bounds on the injectivity radii of "topologically complicated" Riemannian n-manifolds X, where the scalar curvatures of X are bounded from below, Sc(X)≥ σ>0. curv Lower bounds on focal radii of smooth immersions from k-manifolds, e.g. homeomorphic to the k-torus, to certain Riemannian manifolds of dimensions n=k+m, e.g. to the cylinders Sn-1 × R1. mean Topological lower bounds on the mean curvatures of domains in Riemannian manifolds. e.g. in the Euclidean n-space Rn. At the present moment, our results are limited by the spin condition and the n≤ 8 restriction.