The generating function of planar Eulerian orientations
From MaRDI portal
Publication:2299632
DOI10.1016/j.jcta.2019.105183zbMath1433.05018arXiv1803.08265OpenAlexW2994629112WikidataQ126558070 ScholiaQ126558070MaRDI QIDQ2299632
Mireille Bousquet-Mélou, Andrew Elvey Price
Publication date: 21 February 2020
Published in: Journal of Combinatorial Theory. Series A (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1803.08265
Related Items (4)
On the enumeration of plane bipolar posets and transversal structures ⋮ The six-vertex model on random planar maps revisited ⋮ Eulerian orientations and the six-vertex model on planar maps ⋮ On the expected number of perfect matchings in cubic planar graphs
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The Brownian map is the scaling limit of uniform random plane quadrangulations
- On the two-point function of general planar maps and hypermaps
- The Brownian plane
- Spanning forests in regular planar maps
- Quantum gravity and inventory accumulation
- Scaling limits of random planar maps with large faces
- Baxter permutations and plane bipolar orientations
- Limit of normalized quadrangulations: the Brownian map
- Universal aspects of critical percolation on random half-planar maps
- D-finite power series
- The two uniform infinite quadrangulations of the plane have the same law
- Intervals in Catalan lattices and realizers of triangulations
- Tutte polynomial, subgraphs, orientations and sandpile model: new connections via embeddings
- Bijective counting of plane bipolar orientations and Schnyder woods
- Analytic models and ambiguity of context-free languages
- The diagonal of a D-finite power series is D-finite
- Quantum field theory techniques in graphical enumeration
- Bijective census and random generation of Eulerian planar maps with prescribed vertex degrees
- Uniform infinite planar triangulations
- Random planar lattices and integrated superBrownian excursion
- Two-matrix model with \(ABAB\) interaction
- Basic analytic combinatorics of directed lattice paths
- Counting planar Eulerian orientations
- Planar maps as labeled mobiles
- Planar diagrams
- Delocalization of uniform graph homomorphisms from \({\mathbb{Z}}^2\) to \({\mathbb{Z}} \)
- Counting colored planar maps: algebraicity results
- Eulerian orientations and the six-vertex model on planar maps
- Counting coloured planar maps: differential equations
- The topological structure of scaling limits of large planar maps
- On the number of planar Eulerian orientations
- Bijections for Baxter families and related objects
- Local limit of labeled trees and expected volume growth in a random quadrangulation
- A bijection between realizers of maximal plane graphs and pairs of non-crossing Dyck paths
- Uniform Lipschitz functions on the triangular lattice have logarithmic variations
- The Looping Rate and Sandpile Density of Planar Graphs
- Trees and spatial topology change in CDT
- Uniform infinite planar quadrangulations with a boundary
- A Census of Planar Triangulations
- Singularity Analysis of Generating Functions
- Tessellations of random maps of arbitrary genus
- Algebraic Relations Among Solutions of Linear Differential Equations
- Counting Cycles in Permutations by Group Characters, With an Application to a Topological Problem
- A Character Theoretic Approach to Embeddings of Rooted Maps in an Orientable Surface of Given Genus
- Loop models on random maps via nested loops: the case of domain symmetry breaking and application to the Potts model
- Counting quadrant walks via Tutte's invariant method
- Random geometry on the sphere
- On the Enumeration of Tree-Rooted Maps
- Chromatic Sums for Rooted Planar Triangulations: The Cases λ = 1 and λ = 2
- A Census of Planar Maps
- A Contribution to the Theory of Chromatic Polynomials
- Exact solution of the six-vertex model on a random lattice.
- Dichromatic polynomials and Potts models summed over rooted maps
This page was built for publication: The generating function of planar Eulerian orientations
