We present an approximation method to a class of parametric integration problems that naturally appear when solving the dual of the maximum entropy estimation problem. Our method builds up on a recent generalization of Gauss quadratures via an infinite-dimensional linear program, and utilizes a convex clustering algorithm to compute an approximate solution which requires reduced computational effort. It shows to be particularly appealing when looking at problems with unusual domains and in a multi-dimensional setting. As a proof of concept we apply our method to an example problem on the unit disc.Team Tamas Keviczk
International audienceIn this paper, we study entropy maximisation problems in order to reconstruct ...
Best entropy estimation is a technique that has been widely applied in many areas of science. It con...
A class of algorithms for approximation of the maximum entropy estimate of probability density func...
Abstract. We show that a simple geometric result suffices to derive the form of the optimal solution...
In this paper we unify divergence minimization and statistical inference by means of convex duality....
We consider the problem of estimating a probability distribution that maximizes the entropy while sa...
We consider the problem of estimating a probability distribution that maximizes the entropy while sa...
In density estimation task, Maximum Entropy (Maxent) model can effectively use reliable prior inform...
Abstract. Best entropy estimation is a technique that has been widely applied in many areas of scien...
Maximum entropy spectral density estimation is a technique for reconstructing an unknown density fun...
We introduce a treatment of parametric estimation in which optimality of an estimator is measured in...
We describe an algorithm to efficiently compute maximum entropy densities, i.e. densities maximizing...
A common statistical situation concerns inferring an unknown distribution Q(x) from a known distribu...
Abstract The well known maximum-entropy principle due to Jaynes, which states that given mean parame...
We introduce a novel method for estimating the partition function and marginals of distributions def...
International audienceIn this paper, we study entropy maximisation problems in order to reconstruct ...
Best entropy estimation is a technique that has been widely applied in many areas of science. It con...
A class of algorithms for approximation of the maximum entropy estimate of probability density func...
Abstract. We show that a simple geometric result suffices to derive the form of the optimal solution...
In this paper we unify divergence minimization and statistical inference by means of convex duality....
We consider the problem of estimating a probability distribution that maximizes the entropy while sa...
We consider the problem of estimating a probability distribution that maximizes the entropy while sa...
In density estimation task, Maximum Entropy (Maxent) model can effectively use reliable prior inform...
Abstract. Best entropy estimation is a technique that has been widely applied in many areas of scien...
Maximum entropy spectral density estimation is a technique for reconstructing an unknown density fun...
We introduce a treatment of parametric estimation in which optimality of an estimator is measured in...
We describe an algorithm to efficiently compute maximum entropy densities, i.e. densities maximizing...
A common statistical situation concerns inferring an unknown distribution Q(x) from a known distribu...
Abstract The well known maximum-entropy principle due to Jaynes, which states that given mean parame...
We introduce a novel method for estimating the partition function and marginals of distributions def...
International audienceIn this paper, we study entropy maximisation problems in order to reconstruct ...
Best entropy estimation is a technique that has been widely applied in many areas of science. It con...
A class of algorithms for approximation of the maximum entropy estimate of probability density func...