Negative dependence and stochastic orderings
Probability
2016-01-22 v2
Abstract
We explore negative dependence and stochastic orderings, showing that if an integer-valued random variable satisfies a certain negative dependence assumption, then is smaller (in the convex sense) than a Poisson variable of equal mean. Such include those which may be written as a sum of totally negatively dependent indicators. This is generalised to other stochastic orderings. Applications include entropy bounds, Poisson approximation and concentration. The proof uses thinning and size-biasing. We also show how these give a different Poisson approximation result, which is applied to mixed Poisson distributions. Analogous results for the binomial distribution are also presented.
Cite
@article{arxiv.1504.06493,
title = {Negative dependence and stochastic orderings},
author = {Fraser Daly},
journal= {arXiv preprint arXiv:1504.06493},
year = {2016}
}
Comments
26 pages; minor corrections and new examples added