English

Homogeneous length functions on groups

Group Theory 2018-11-07 v2 Functional Analysis Geometric Topology Metric Geometry

Abstract

A pseudo-length function defined on an arbitrary group G=(G,,e,()1)G = (G,\cdot,e, (\,)^{-1}) is a map :G[0,+)\ell: G \to [0,+\infty) obeying (e)=0\ell(e)=0, the symmetry property (x1)=(x)\ell(x^{-1}) = \ell(x), and the triangle inequality (xy)(x)+(y)\ell(xy) \leqslant \ell(x) + \ell(y) for all x,yGx,y \in G. We consider pseudo-length functions which saturate the triangle inequality whenever x=yx=y, or equivalently those that are homogeneous in the sense that (xn)=n(x)\ell(x^n) = n\,\ell(x) for all nNn\in\mathbb{N}. We show that this implies that ([x,y])=0\ell([x,y])=0 for all x,yGx,y \in G. This leads to a classification of such pseudo-length functions as pullbacks from embeddings into a Banach space. We also obtain a quantitative version of our main result which allows for defects in the triangle inequality or the homogeneity property.

Keywords

Cite

@article{arxiv.1801.03908,
  title  = {Homogeneous length functions on groups},
  author = {D. H. J. Polymath},
  journal= {arXiv preprint arXiv:1801.03908},
  year   = {2018}
}

Comments

Modified Proposition 2.1 (see Remark 2.5), with a "quasified" application in Theorem 4.4. The paper is also streamlined. 14 pages, no figures, to appear in "Algebra & Number Theory"

R2 v1 2026-06-22T23:43:02.274Z