English

Plato's cave and differential forms

Geometric Topology 2020-06-30 v6 Algebraic Topology Differential Geometry Metric Geometry

Abstract

In the 1970s and again in the 1990s, Gromov gave a number of theorems and conjectures motivated by the notion that the real homotopy theory of compact manifolds and simplicial complexes influences the geometry of maps between them. The main technical result of this paper supports this intuition: we show that maps of differential algebras are closely shadowed, in a technical sense, by maps between the corresponding spaces. As a concrete application, we prove the following conjecture of Gromov: if XX and YY are finite complexes with YY simply connected, then there are constants C(X,Y)C(X,Y) and p(X,Y)p(X,Y) such that any two homotopic LL-Lipschitz maps have a C(L+1)pC(L+1)^p-Lipschitz homotopy (and if one of the maps is a constant, pp can be taken to be 22.) We hope that it will lead more generally to a better understanding of the space of maps from XX to YY in this setting.

Keywords

Cite

@article{arxiv.1801.00335,
  title  = {Plato's cave and differential forms},
  author = {Fedor Manin},
  journal= {arXiv preprint arXiv:1801.00335},
  year   = {2020}
}

Comments

39 pages, 1 figure; comments welcome! This is the final version to be published in Geometry & Topology

R2 v1 2026-06-22T23:33:26.663Z