Geodesic
Random cubic planar maps
Michael Drmota ; Marc Noy ; Clément Requilé ; Juanjo Rué1
1Universitat Politècnica de Catalunya
The electronic journal of combinatorics, Tome 30 (2023) no. 2
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We analyse uniform random cubic rooted planar maps and obtain limiting distributions for several parameters of interest.From the enumerative point of view, we present a unified approach for the enumeration of several classes of cubic planar maps, which allow us to recover known results in a more general and transparent way.This approach allows us to obtain new enumerative results. Concerning random maps, we first obtain the distribution of the degree of the root face, which has an exponential tail as for other classes of random maps. Our main result is a limiting map-Airy distribution law for the size of the largest block $L$, whose expectation is asymptotically $n/\sqrt{3}$ in a random cubic map with $n+2$ faces.We prove analogous results for the size of the largest cubic block, obtained from $L$ by erasing all vertices of degree two, and for the size of the largest 3-connected component, whose expected values are respectively $n/2$ and $n/4$.To obtain these results we need to analyse a new type of composition scheme which has not been treated by Banderier et al. [Random Structures Algorithms 2001].
DOI : 10.37236/11619
Classification : 05C80, 05C10, 05C30, 05C69, 05C70
Mots-clés : random maps, asymptotic distributions, random combinatorics, Airy function, singularity analysis

Michael Drmota    ; Marc Noy    ; Clément Requilé    ; Juanjo Rué  1

1 Universitat Politècnica de Catalunya 
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     author = {Michael Drmota and Marc Noy and Cl\'ement Requil\'e and Juanjo Ru\'e},
     title = {Random cubic planar maps},
     journal = {The electronic journal of combinatorics},
     year = {2023},
     volume = {30},
     number = {2},
     doi = {10.37236/11619},
     zbl = {1519.05218},
     url = {http://geodesic.mathdoc.fr/articles/10.37236/11619/}
}
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Michael Drmota; Marc Noy; Clément Requilé; Juanjo Rué. Random cubic planar maps. The electronic journal of combinatorics, Tome 30 (2023) no. 2. doi: 10.37236/11619

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