Lipschitz structure and minimal metrics on topological groups

Rosendal, Christian

doi:10.4310/ARKIV.2018.v56.n1.a11

Arkiv för Matematik

Lipschitz structure and minimal metrics on topological groups¹

Christian Rosendal

https://doi.org/10.4310/ARKIV.2018.v56.n1.a11

Pub. online: 5 September 2023 Type: Research Article

¹ The research was partially supported by a Simons Foundation Fellowship (Grant #229959) and by the NSF (DMS 1201295 & DMS 1464974). The author is grateful for very helpful conversations with I. Goldbring and for the detailed comments by the referees

Received
12 November 2016

Revised
2 July 2017

Published
5 September 2023

Abstract

We discuss the problem of deciding when a metrisable topological group G has a canonically defined local Lipschitz geometry. This naturally leads to the concept of minimal metrics on G, that we characterise intrinsically in terms of a linear growth condition on powers of group elements.

Combining this with work on the large scale geometry of topological groups, we also identify the class of metrisable groups admitting a canonical global Lipschitz geometry.

In turn, minimal metrics connect with Hilbert’s fifth problem for completely metrisable groups and we show, assuming that the set of squares is sufficiently rich, that every element of some identity neighbourhood belongs to a 1-parameter subgroup.

References

Birkhoff, G., A note on topological groups, Compos. Math. 3 (1936), 427–430.

Chevalley, C., On a theorem of Gleason, Proc. Amer. Math. Soc. 2 (1951), 122–125.

Diestel, J. and Spalsbury, A., The Joys of Haar Measure, Am. Math. Soc., Providence, RI, 2014.

Enflo, P., Uniform structures and square roots in topological groups I, Israel J. Math. 8 (1970), 230–252.

Mattei Gleason, A., Groups without small subgroups, Ann. of Math. (2) 56 (1952), 193–212.

Mattei Gleason, A., Square roots in locally Euclidean groups, Bull. Amer. Math. Soc. 55 (1949), 446–449.

Kakutani, S., Über die Metrisation der topologischen Gruppen, in Proc. Imp. Acad. Tokyo 12 (1936), 82–84, Selected Papers, vol. 1, pp. 60–62, Birkhäuser, Basel, 1986.

Klee, V. L. Jr., Invariant metrics in groups (solution of a problem of Banach), Proc. Amer. Math. Soc. 3 (1952), 484–487.

Maciej, M., On Polish groups admitting a compatible complete left-invariant metric, J. Symbolic Logic 76 (2011), 437–447.

10.

Deane, M. and Zippin, L., Topological Transformation Groups, Reprint of the 1955 original, Krieger, Huntington, N.Y., 1974.

11.

Morris, S. A. and Pestov, V., On Lie groups in varieties of topological groups, Colloq. Math. 78 (1998), 39–47.

12.

Rosendal, C., A topological version of the Bergman property, Forum Math. 21 (2009), 299–332.

13.

Rosendal, C., Coarse geometry of topological groups, book manuscript 2017.

14.

Sullivan, D., Hyperbolic geometry and homeomorphisms, in Geometric Topology: Proc. Topology Conf. at Athens, Ga., 1977, pp. 543–555, Academic Press, New York, 1979.

15.

Tao, T., Hilbert’s Fifth Problem and Related Topics, Graduate Studies in Mathematics 153, Am. Math. Soc., Providence, RI, 2014.

Keywords

metrisable groups left-invariant metrics Hilbert’s fifth problem Lipschitz structure

MSC

22A10 (primary) 03E15 (secondary)

Metrics

since February 2017

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