Some results concerning maximum Renyi entropy distributions
概率论
2010-08-17 v2
摘要
We consider the Student-t and Student-r distributions, which maximise Renyi entropy under a covariance condition. We show that they have information-theoretic properties which mirror those of the Gaussian distributions, which maximise Shannon entropy under the same condition. We introduce a convolution which preserves the Renyi maximising family, and show that the Renyi maximisers are the case of equality in a version of the Entropy Power Inequality. Further, we show that the Renyi maximisers satisfy a version of the heat equation, motivating the definition of a generalized Fisher information.
引用
@article{arxiv.math/0507400,
title = {Some results concerning maximum Renyi entropy distributions},
author = {Oliver Johnson and Christophe Vignat},
journal= {arXiv preprint arXiv:math/0507400},
year = {2010}
}
备注
Revised version taking into account referee's comments