Quantitative nullhomotopy and rational homotopy type
Abstract
In \cite{GrOrang}, Gromov asks the following question: given a nullhomotopic map of Lipschitz constant , how does the Lipschitz constant of an optimal nullhomotopy of depend on , , and ? We establish that for fixed and , the answer is at worst quadratic in . More precisely, we construct a nullhomotopy whose \emph{thickness} (Lipschitz constant in the space variable) is and whose \emph{width} (Lipschitz constant in the time variable) is . More generally, we prove a similar result for maps for any compact Riemannian manifold and a compact simply connected Riemannian manifold in a class which includes complex projective spaces, Grassmannians, and all other simply connected homogeneous spaces. Moreover, for all simply connected , asymptotic restrictions on the size of nullhomotopies are determined by rational homotopy type.
Cite
@article{arxiv.1611.03513,
title = {Quantitative nullhomotopy and rational homotopy type},
author = {Gregory R. Chambers and Fedor Manin and Shmuel Weinberger},
journal= {arXiv preprint arXiv:1611.03513},
year = {2020}
}
Comments
19 pages, 2 figures; version accepted for publication in Geometric and Functional Analysis (GAFA)