$\ell^p$ metrics on cell complexes

Thomas Haettel; Nima Hoda; Harry Petyt

arXiv:2302.03801·math.GR·January 28, 2025

$\ell^p$ metrics on cell complexes

Thomas Haettel, Nima Hoda, Harry Petyt

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TL;DR

This paper explores $\

Contribution

It introduces $\

Findings

01

Establishes nonpositive curvature properties for $\

02

Provides detailed analysis of geodesics in CAT(0) cube complexes.

Abstract

Motivated by the observation that groups can be effectively studied using metric spaces modelled on $ℓ^{1}$ , $ℓ^{2}$ , and $ℓ^{\infty}$ geometry, we consider cell complexes equipped with an $ℓ^{p}$ metric for arbitrary $p$ . Under weak conditions that can be checked locally, we establish nonpositive curvature properties of these complexes, such as Busemann-convexity and strong bolicity. We also provide detailed information on the geodesics of these metrics in the special case of CAT(0) cube complexes.

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Taxonomy

TopicsGeometric and Algebraic Topology · Geometric Analysis and Curvature Flows · Homotopy and Cohomology in Algebraic Topology