A direct proof of one Gromov's theorem

Abstract

We give a new proof of the Gromov theorem: For any C>0 and integer n>1 there exists a function C,n such that if the Gromov--Hausdorff distance between complete Riemannian n-manifolds V and W is not greater than δ, absolute values of their sectional curvatures |Kσ|≤ C, and their injectivity radii ≥ 1/C, then the Lipschitz distance between V and W is less than C,n(δ) and C,n 0 as δ 0.