Abstract

A Jordan region is a subset of the plane that is homeomorphic to a closed disk. Consider a family $\mathcal{F}$ of Jordan regions whose interiors are pairwise disjoint, and such that any two Jordan regions intersect in at most one point. If any point of the plane is contained in at most $k$ elements of $\mathcal{F}$ (with $k$ sufficiently large), then we show that the elements of $\mathcal{F}$ can be colored with at most k+1 colors so that intersecting Jordan regions are assigned distinct colors. This is best possible and answers a question raised by Reed and Shepherd in 1996. As a simple corollary, we also obtain a positive answer to a problem of Hlin\vený (1998) on the chromatic number of contact systems of strings. We also investigate the chromatic number of families of touching Jordan curves. This can be used to bound the ratio between the maximum number of vertex-disjoint directed cycles in a planar digraph, and its fractional counterpart.

Keywords

  1. graph coloring
  2. geometric graphs
  3. Jordan curves
  4. Jordan regions

MSC codes

  1. 05C10
  2. 05C15

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References

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Information & Authors

Information

Published In

cover image SIAM Journal on Discrete Mathematics
SIAM Journal on Discrete Mathematics
Pages: 1670 - 1684
ISSN (online): 1095-7146

History

Submitted: 6 September 2016
Accepted: 6 June 2017
Published online: 1 August 2017

Keywords

  1. graph coloring
  2. geometric graphs
  3. Jordan curves
  4. Jordan regions

MSC codes

  1. 05C10
  2. 05C15

Authors

Affiliations

Wouter Cames van Batenburg

Funding Information

PHC Van Gogh 2016 : 35513NM
Agence Nationale de la Recherche https://doi.org/10.13039/501100001665 : anr-13-bs02-0007
Labex https://doi.org/10.13039/501100004100 : anr-11-labx-0025-01
Nederlandse Organisatie voor Wetenschappelijk Onderzoek https://doi.org/10.13039/501100003246 : 613.001.217
Nederlandse Organisatie voor Wetenschappelijk Onderzoek https://doi.org/10.13039/501100003246

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