The relaxed maximum entropy problem is concerned with finding a probability distribution on a finite set that minimizes the relative entropy to a given prior distribution, while satisfying relaxed max-norm constraints with respect to a third observed multinomial distribution. We study the entire relaxation path for this problem in detail. We show existence and a geometric description of the relaxation path. Specifically, we show that the maximum entropy relaxation path admits a planar geometric description as an increasing, piecewise linear function in the in-verse relaxation parameter. We derive fast algorithms for tracking the path. In various realistic settings, our algorithms require O(n log(n)) operations for proba-bility distributions...
Abstract—In many practical situations, we have only partial information about the probabilities. In ...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
We give a characterization of Maximum Entropy/Minimum Relative Entropy inference by providing two ‘s...
We develop a novel approach to approximate a specified collection of marginal distributions on subse...
A rate equation for a discrete probability distribution is discussed as a route to describe smooth r...
We propose a new approach for learning a sparse graphical model approximation to a specified multi...
Abstract. We consider the problem of estimating an unknown probability distribution from samples usi...
In many practical situations, we have only partial information about the probabilities. In some case...
In many practical situations, we only have partial information about the probabilities; this means t...
We present an extension to Jaynes’ maximum entropy principle that incorporates latent variables. The...
We consider the problem of specifying the joint distribution of a collection of variables with maxim...
We describe an algorithm to efficiently compute maximum entropy densities, i.e. densities maximizing...
Abstract. With reference to two general probabilistic description frameworks, Information Theory and...
<p>The maximum-entropy probability distribution with pairwise constraints for continuous random vari...
We consider a new nonlinear relaxation for the Constrained Maximum-Entropy Sampling Problem -- the p...
Abstract—In many practical situations, we have only partial information about the probabilities. In ...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
We give a characterization of Maximum Entropy/Minimum Relative Entropy inference by providing two ‘s...
We develop a novel approach to approximate a specified collection of marginal distributions on subse...
A rate equation for a discrete probability distribution is discussed as a route to describe smooth r...
We propose a new approach for learning a sparse graphical model approximation to a specified multi...
Abstract. We consider the problem of estimating an unknown probability distribution from samples usi...
In many practical situations, we have only partial information about the probabilities. In some case...
In many practical situations, we only have partial information about the probabilities; this means t...
We present an extension to Jaynes’ maximum entropy principle that incorporates latent variables. The...
We consider the problem of specifying the joint distribution of a collection of variables with maxim...
We describe an algorithm to efficiently compute maximum entropy densities, i.e. densities maximizing...
Abstract. With reference to two general probabilistic description frameworks, Information Theory and...
<p>The maximum-entropy probability distribution with pairwise constraints for continuous random vari...
We consider a new nonlinear relaxation for the Constrained Maximum-Entropy Sampling Problem -- the p...
Abstract—In many practical situations, we have only partial information about the probabilities. In ...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
We give a characterization of Maximum Entropy/Minimum Relative Entropy inference by providing two ‘s...