The estimation of categorical distributions under marginal constraints summarizing some sample from a population in the most-generalizable way is key for many machine-learning and data-driven approaches. We provide a parameter-agnostic theoretical framework that enables this task ensuring (i) that a categorical distribution of Maximum Entropy under marginal constraints always exists and (ii) that it is unique. The procedure of iterative proportional fitting (IPF) naturally estimates that distribution from any consistent set of marginal constraints directly in the space of probabilities, thus deductively identifying a least-biased characterization of the population. The theoretical framework together with IPF leads to a holistic workflow tha...
This paper is a review of a particular approach to the method of maximum entropy as a general framew...
ABSTRACT. \Ve give a characterilla.tion of Maximum Entropy JMinimum Relative En~ tropy inference by ...
It is shown that (i) every probability density is the unique maximizer of relative entropy in an a...
<p>The maximum-entropy probability distribution with pairwise constraints for continuous random vari...
In this letter, we elaborate on some of the issues raised by a recent paper by Neapolitan and Jiang ...
The principle of maximum entropy is a method for assigning values to probability distributions on th...
In many practical situations, we have only partial information about the probabilities. In some case...
Abstract—In many practical situations, we have only partial information about the probabilities. In ...
The maximum entropy principle (MEP) is a powerful statistical inference tool that provides a rigorou...
The need to estimate smooth probability distributions (a.k.a. probability densities) from finite sam...
We present a new approach to inferring a probability distribution which is incompletely specified by...
We commonly encounter the problem of identifying an optimally weight adjusted version of the empiric...
The maximum entropy principle introduced by Jaynes proposes that a data distribution should maximize...
The combination of mathematical models and uncertainty measures can be applied in the area of data m...
We consider the problem of specifying the joint distribution of a collection of variables with maxim...
This paper is a review of a particular approach to the method of maximum entropy as a general framew...
ABSTRACT. \Ve give a characterilla.tion of Maximum Entropy JMinimum Relative En~ tropy inference by ...
It is shown that (i) every probability density is the unique maximizer of relative entropy in an a...
<p>The maximum-entropy probability distribution with pairwise constraints for continuous random vari...
In this letter, we elaborate on some of the issues raised by a recent paper by Neapolitan and Jiang ...
The principle of maximum entropy is a method for assigning values to probability distributions on th...
In many practical situations, we have only partial information about the probabilities. In some case...
Abstract—In many practical situations, we have only partial information about the probabilities. In ...
The maximum entropy principle (MEP) is a powerful statistical inference tool that provides a rigorou...
The need to estimate smooth probability distributions (a.k.a. probability densities) from finite sam...
We present a new approach to inferring a probability distribution which is incompletely specified by...
We commonly encounter the problem of identifying an optimally weight adjusted version of the empiric...
The maximum entropy principle introduced by Jaynes proposes that a data distribution should maximize...
The combination of mathematical models and uncertainty measures can be applied in the area of data m...
We consider the problem of specifying the joint distribution of a collection of variables with maxim...
This paper is a review of a particular approach to the method of maximum entropy as a general framew...
ABSTRACT. \Ve give a characterilla.tion of Maximum Entropy JMinimum Relative En~ tropy inference by ...
It is shown that (i) every probability density is the unique maximizer of relative entropy in an a...