Geodesic Distance in Planar Graphs
摘要
We derive the exact generating function for planar maps (genus zero fatgraphs) with vertices of arbitrary even valence and with two marked points at a fixed geodesic distance. This is done in a purely combinatorial way based on a bijection with decorated trees, leading to a recursion relation on the geodesic distance. The latter is solved exactly in terms of discrete soliton-like expressions, suggesting an underlying integrable structure. We extract from this solution the fractal dimensions at the various (multi)-critical points, as well as the precise scaling forms of the continuum two-point functions and the probability distributions for the geodesic distance in (multi)-critical random surfaces. The two-point functions are shown to obey differential equations involving the residues of the KdV hierarchy.
引用
@article{arxiv.cond-mat/0303272,
title = {Geodesic Distance in Planar Graphs},
author = {J. Bouttier and P. Di Francesco and E. Guitter},
journal= {arXiv preprint arXiv:cond-mat/0303272},
year = {2010}
}
备注
38 pages, 8 figures, tex, harvmac, epsf