Add to ORKGWe provide a full large deviation principle (LDP) for the uniform measure on certain ensembles of convex lattice polygons. This LDP provides for the analysis of concentration of the measure on convex closed curves. In particular, convergence to a limiting shape results in some particular cases, including convergence to a circle when the ensemble is defined as those centered convex polygons, with vertices on a scaled two dimensional lattice, and with length bounded by a constant. The Gauss-Minkowskii transform of convex curves plays a crucial role in our approach
We prove a large deviations principle for the empirical law of the block sizes of a uniformly distri...
Abstract. The purpose of this note is to present several aspects of concentration phenomena in high ...
The large deviation principle is proved for the long time asymptotic of empirical measures associate...
It is known that convex polygonal lines on Z 2 with the endpoints fixed at 0 = (0, 0) and n = (n1, n...
This paper proves large deviation theorems for a general class of random vectors taking values in Rd...
Let V be a topological space and B(V ) the Borel oe--field on V . A sequence of probability measures...
By comparing curve length in a manifold and a standard sphere, we prove a local uniform bound for th...
70 pages, we added the description of measures which we have large deviation lower bound using the f...
Presented on December 10, 2019 at 9:10 a.m. in the Bill Moore Student Success Center, Press Rooms A ...
Let Πn be the set of planar convex lattice polygons Γ (i.e., with vertices on Z2+ and non-negative i...
Large deviation estimates are by now a standard tool in Asymptotic Convex Geometry, contrary to smal...
International audienceWe derive a general large deviation principle for a canonical sequence of prob...
Abstract. Let B be a convex body in the plane. The purpose of this paper is a systematic study of th...
Let B be a convex body in R2, with piecewise smooth boundary and let ^?B denote the Fourier transfor...
Presented on December 12, 2019 at 9:10 a.m. in the Bill Moore Student Success Center, Press Rooms A ...
We prove a large deviations principle for the empirical law of the block sizes of a uniformly distri...
Abstract. The purpose of this note is to present several aspects of concentration phenomena in high ...
The large deviation principle is proved for the long time asymptotic of empirical measures associate...
It is known that convex polygonal lines on Z 2 with the endpoints fixed at 0 = (0, 0) and n = (n1, n...
This paper proves large deviation theorems for a general class of random vectors taking values in Rd...
Let V be a topological space and B(V ) the Borel oe--field on V . A sequence of probability measures...
By comparing curve length in a manifold and a standard sphere, we prove a local uniform bound for th...
70 pages, we added the description of measures which we have large deviation lower bound using the f...
Presented on December 10, 2019 at 9:10 a.m. in the Bill Moore Student Success Center, Press Rooms A ...
Let Πn be the set of planar convex lattice polygons Γ (i.e., with vertices on Z2+ and non-negative i...
Large deviation estimates are by now a standard tool in Asymptotic Convex Geometry, contrary to smal...
International audienceWe derive a general large deviation principle for a canonical sequence of prob...
Abstract. Let B be a convex body in the plane. The purpose of this paper is a systematic study of th...
Let B be a convex body in R2, with piecewise smooth boundary and let ^?B denote the Fourier transfor...
Presented on December 12, 2019 at 9:10 a.m. in the Bill Moore Student Success Center, Press Rooms A ...
We prove a large deviations principle for the empirical law of the block sizes of a uniformly distri...
Abstract. The purpose of this note is to present several aspects of concentration phenomena in high ...
The large deviation principle is proved for the long time asymptotic of empirical measures associate...