Stufler, B. (2024). The scaling limit of random cubic planar graphs. JOURNAL OF THE LONDON MATHEMATICAL SOCIETY-SECOND SERIES, 110(5), Article e70018. https://doi.org/10.1112/jlms.70018
E104-05 - Forschungsbereich Kombinatorik und Algorithmen
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Journal:
JOURNAL OF THE LONDON MATHEMATICAL SOCIETY-SECOND SERIES
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ISSN:
0024-6107
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Date (published):
Nov-2024
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Number of Pages:
46
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Publisher:
WILEY
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Peer reviewed:
Yes
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Keywords:
scaling limits
en
Abstract:
We study the random cubic planar graph 𝖢 𝑛 with aneven number 𝑛 of vertices. We show that the Brown-ian map arises as Gromov–Hausdorff–Prokhorov scalinglimit of 𝖢 𝑛 as 𝑛 ∈ 2 ℕ tends to infinity, after rescaling dis-tances by 𝛾𝑛⁻¹∕⁴ for a specific constant 𝛾 > 0. This is thefirst time a model of random graphs that are not embed-ded into the plane is shown to converge to the Brownianmap. Our approach features a new method that allowsus to relate distances on random graphs to first-passagepercolation distances on their 3-connected core.
