We introduce and study the random non-compact metric space called the Brownian plane, which is obtained as the scaling limit of the uniform infinite planar quadrangulation. Alternatively, the Brownian plane is identified as the Gromov-Hausdorff tangent cone in distribution of the Brownian map at its root vertex, and it also arises as the scaling limit of uniformly distributed (finite) planar quadrangulations with n faces when the scaling factor tends to 0 less fast than n−1/4. We discuss various properties of the Brownian plane. In particular, we prove that the Brownian plane is homeomorphic to the plane, and we get detailed information about geodesic rays to infinity.
The cactus of a pointed graph is a discrete tree associated with this graph. Similarly, with every p...
International audienceLet M-n be a simple triangulation of the sphere S-2, drawn uniformly at random...
The uniform infinite planar quadrangulation is an infinite random graph embedded in the plane, which...
Abstract We introduce and study the random non-compact metric space called the Brownian plane, which...
76 pages, 7 figures, improved versionWe prove that uniform random quadrangulations of the sphere wit...
Fix an arbitrary compact orientable surface with a boundary and consider a uniform bipartite random ...
We discuss scaling limits of random planar maps chosen uniformly over the set of all 2p-angulations ...
Abstract. We introduce and study a universal model of random geometry in two dimen-sions. To this en...
We prove that uniform random quadrangulations of the sphere with n faces, endowed with the usual gra...
We study the random metric space called the Brownian plane, which is closely related to the Brownian...
The main purpose of this work is to provide a framework for proving that, given a family of random m...
This thesis investigates the geometry of random spaces. Geodesics in random surfaces. The Br...
We prove that the uniform infinite half-plane quadrangulation (UIHPQ), with either general or simple...
Consider qn a random pointed quadrangulation chosen equally likely among the pointed quadrangulation...
The cactus of a pointed graph is a discrete tree associated with this graph. Similarly, with every p...
The cactus of a pointed graph is a discrete tree associated with this graph. Similarly, with every p...
International audienceLet M-n be a simple triangulation of the sphere S-2, drawn uniformly at random...
The uniform infinite planar quadrangulation is an infinite random graph embedded in the plane, which...
Abstract We introduce and study the random non-compact metric space called the Brownian plane, which...
76 pages, 7 figures, improved versionWe prove that uniform random quadrangulations of the sphere wit...
Fix an arbitrary compact orientable surface with a boundary and consider a uniform bipartite random ...
We discuss scaling limits of random planar maps chosen uniformly over the set of all 2p-angulations ...
Abstract. We introduce and study a universal model of random geometry in two dimen-sions. To this en...
We prove that uniform random quadrangulations of the sphere with n faces, endowed with the usual gra...
We study the random metric space called the Brownian plane, which is closely related to the Brownian...
The main purpose of this work is to provide a framework for proving that, given a family of random m...
This thesis investigates the geometry of random spaces. Geodesics in random surfaces. The Br...
We prove that the uniform infinite half-plane quadrangulation (UIHPQ), with either general or simple...
Consider qn a random pointed quadrangulation chosen equally likely among the pointed quadrangulation...
The cactus of a pointed graph is a discrete tree associated with this graph. Similarly, with every p...
The cactus of a pointed graph is a discrete tree associated with this graph. Similarly, with every p...
International audienceLet M-n be a simple triangulation of the sphere S-2, drawn uniformly at random...
The uniform infinite planar quadrangulation is an infinite random graph embedded in the plane, which...