COLORING CURVES ON SURFACES

JONAH GASTER; JOSHUA EVAN GREENE; NICHOLAS G. VLAMIS

doi:10.1017/fms.2018.12

Forum of Mathematics, Sigma (Jan 2018)

COLORING CURVES ON SURFACES

JONAH GASTER,
JOSHUA EVAN GREENE,
NICHOLAS G. VLAMIS

Affiliations

JONAH GASTER: Department of Mathematics and Statistics, McGill University, Montreal, Quebec H3A 0B9, Canada;
JOSHUA EVAN GREENE: Department of Mathematics, Boston College, Chestnut Hill, MA 02467, USA;
NICHOLAS G. VLAMIS: Department of Mathematics, Queens College of CUNY, Flushing, NY 11367, USA;

DOI: https://doi.org/10.1017/fms.2018.12
Journal volume & issue: Vol. 6

Abstract

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We study the chromatic number of the curve graph of a surface. We show that the chromatic number grows like $k\log k$ for the graph of separating curves on a surface of Euler characteristic $-k$. We also show that the graph of curves that represent a fixed nonzero homology class is uniquely $t$-colorable, where $t$ denotes its clique number. Together, these results lead to the best known bounds on the chromatic number of the curve graph. We also study variations for arc graphs and obtain exact results for surfaces of low complexity. Our investigation leads to connections with Kneser graphs, the Johnson homomorphism, and hyperbolic geometry.

Published in Forum of Mathematics, Sigma

ISSN: 2050-5094 (Online)
Publisher: Cambridge University Press
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://www.cambridge.org/core/journals/forum-of-mathematics-sigma

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