We consider the problem of estimating a probability distribution that maximizes the entropy while satisfying a finite number of moment constraints, possibly corrupted by noise. Based on duality of convex programming, we present a novel approximation scheme using a smoothed fast gradient method that is equipped with explicit bounds on the approximation error. We further demonstrate how the presented scheme can be used for approximating the chemical master equation through the zero-information moment closure method, and for an approximate dynamic programming approach in the context of constrained Markov decision processes with uncountable state and action spaces.</p
A useful technique in underdetermined inverse problems is that of maximum entropy. A simple error bo...
In this paper we unify divergence minimization and statistical inference by means of convex duality....
International audienceCombining recent moment and sparse semidefinite programming (SDP) relaxation t...
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...
16 pagesWe tackle the inverse problem of reconstructing an unknown finite measure $\mu$ from a noisy...
The recovering of a discrete probability distribution taking on a countable values, when only partia...
The maximum entropy principle is a powerful tool for solving underdetermined inverse problems. This ...
Abstract. We consider the problem of estimating an unknown probability distribution from samples usi...
Traditionally, the Method of (Shannon-Kullback's) Relative Entropy Maximization (REM) is considered ...
International audienceWe consider the linear inverse problem of reconstructing an unknown finite mea...
This article revisits the maximum entropy algorithm in the context of recovering the probability dis...
AbstractWe consider the linear inverse problem of reconstructing an unknown finite measure μ from a ...
Maximum entropy spectral density estimation is a technique for reconstructing an unknown density fun...
We study a parametric estimation problem related to moment condition models. As an alternative to th...
A useful technique in underdetermined inverse problems is that of maximum entropy. A simple error bo...
In this paper we unify divergence minimization and statistical inference by means of convex duality....
International audienceCombining recent moment and sparse semidefinite programming (SDP) relaxation t...
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...
16 pagesWe tackle the inverse problem of reconstructing an unknown finite measure $\mu$ from a noisy...
The recovering of a discrete probability distribution taking on a countable values, when only partia...
The maximum entropy principle is a powerful tool for solving underdetermined inverse problems. This ...
Abstract. We consider the problem of estimating an unknown probability distribution from samples usi...
Traditionally, the Method of (Shannon-Kullback's) Relative Entropy Maximization (REM) is considered ...
International audienceWe consider the linear inverse problem of reconstructing an unknown finite mea...
This article revisits the maximum entropy algorithm in the context of recovering the probability dis...
AbstractWe consider the linear inverse problem of reconstructing an unknown finite measure μ from a ...
Maximum entropy spectral density estimation is a technique for reconstructing an unknown density fun...
We study a parametric estimation problem related to moment condition models. As an alternative to th...
A useful technique in underdetermined inverse problems is that of maximum entropy. A simple error bo...
In this paper we unify divergence minimization and statistical inference by means of convex duality....
International audienceCombining recent moment and sparse semidefinite programming (SDP) relaxation t...