English

Quantitative nullhomotopy and rational homotopy type

Geometric Topology 2020-06-30 v3 Algebraic Topology

Abstract

In \cite{GrOrang}, Gromov asks the following question: given a nullhomotopic map f:SmSnf:S^m \to S^n of Lipschitz constant LL, how does the Lipschitz constant of an optimal nullhomotopy of ff depend on LL, mm, and nn? We establish that for fixed mm and nn, the answer is at worst quadratic in LL. More precisely, we construct a nullhomotopy whose \emph{thickness} (Lipschitz constant in the space variable) is C(m,n)(L+1)C(m,n)(L+1) and whose \emph{width} (Lipschitz constant in the time variable) is C(m,n)(L+1)2C(m,n)(L+1)^2. More generally, we prove a similar result for maps f:XYf:X \to Y for any compact Riemannian manifold XX and YY 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 YY, asymptotic restrictions on the size of nullhomotopies are determined by rational homotopy type.

Keywords

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)

R2 v1 2026-06-22T16:48:50.817Z