AbstractWe describe a maximum entropy approach for computing volumes and counting integer points in polyhedra. To estimate the number of points from a particular set X⊂Rn in a polyhedron P⊂Rn, by solving a certain entropy maximization problem, we construct a probability distribution on the set X such that a) the probability mass function is constant on the set P∩X and b) the expectation of the distribution lies in P. This allows us to apply Central Limit Theorem type arguments to deduce computationally efficient approximations for the number of integer points, volumes, and the number of 0–1 vectors in the polytope. As an application, we obtain asymptotic formulas for volumes of multi-index transportation polytopes and for the number of mult...
We answer an old question: what are possible growth rates of the expected number of vector-maximal p...
International audienceWe experimentally study the fundamental problem of computing the volume of a c...
We give a method for computing asymptotic formulas and approximations for the volumes of spectrahedr...
Counting the integer points of transportation polytopes has important applications in statistics for...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We outline the most recent theory for the computation of the exponential growth rate of the number o...
A class of algorithms for approximation of the maximum entropy estimate of probability density func...
We describe a perturbation method that can be used to compute the multivariate generating function (...
We describe an algorithm to efficiently compute maximum entropy densities, i.e. densities maximizing...
Triangulations are important objects of study in combinatorics, finite element simulations and quant...
We present an approximation method to a class of parametric integration problems that naturally appe...
Random tilings are interesting as idealizations of atomistic models of quasicrystals and for their c...
The entropy bounds for constructive upper bound on the needed number-of-bits for solving a dichotomy...
We consider the problem of approximating the entropy of a discrete distribution under several models...
We answer an old question: what are possible growth rates of the expected number of vector-maximal p...
International audienceWe experimentally study the fundamental problem of computing the volume of a c...
We give a method for computing asymptotic formulas and approximations for the volumes of spectrahedr...
Counting the integer points of transportation polytopes has important applications in statistics for...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We outline the most recent theory for the computation of the exponential growth rate of the number o...
A class of algorithms for approximation of the maximum entropy estimate of probability density func...
We describe a perturbation method that can be used to compute the multivariate generating function (...
We describe an algorithm to efficiently compute maximum entropy densities, i.e. densities maximizing...
Triangulations are important objects of study in combinatorics, finite element simulations and quant...
We present an approximation method to a class of parametric integration problems that naturally appe...
Random tilings are interesting as idealizations of atomistic models of quasicrystals and for their c...
The entropy bounds for constructive upper bound on the needed number-of-bits for solving a dichotomy...
We consider the problem of approximating the entropy of a discrete distribution under several models...
We answer an old question: what are possible growth rates of the expected number of vector-maximal p...
International audienceWe experimentally study the fundamental problem of computing the volume of a c...
We give a method for computing asymptotic formulas and approximations for the volumes of spectrahedr...