Local coloring problems on smooth graphs

Anton Bernshteyn

doi:10.4064/fm6-5-2021

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Local coloring problems on smooth graphs

Volume 256 / 2022

Anton Bernshteyn Fundamenta Mathematicae 256 (2022), 333-339 MSC: 03E15, 05C15. DOI: 10.4064/fm6-5-2021 Published online: 9 September 2021

Abstract

We construct a smooth locally finite Borel graph $G$ and a local coloring problem $\Pi $ such that $G$ has a coloring $V(G) \to \mathbb N $ that solves $\Pi $, but no such coloring can be Borel.

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Anton BernshteynSchool of Mathematics
Georgia Institute of Technology
686 Cherry Street
Atlanta, GA 30332-0160, USA
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Publishing house / Journals and Serials / Fundamenta Mathematicae / Online First articles

Fundamenta Mathematicae

Local coloring problems on smooth graphs

Volume 256 / 2022

Abstract

Authors

Search for IMPAN publications

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