Judith Rousseau
Judith Rousseau is a Bayesian statistician who studies frequentist properties of Bayesian methods.[1] She is a professor of statistics at the University of Oxford, a Fellow of Jesus College, Oxford,[2] a Fellow of the Institute of Mathematical Statistics,[3] and a Fellow of the International Society for Bayesian Analysis.[4]
Education and career
Rousseau studied statistics and economics at ENSAE ParisTech, starting in pure mathematics but changing fields after taking a statistics class "because of all the interactions it has with other fields".[1] She completed a doctorate in 1997 at Pierre and Marie Curie University. Her dissertation, Asymptotic properties of Bayes estimates, was supervised by Christian Robert.[2][5]
She taught at Paris Descartes University from 1998 to 2004, Paris Dauphine University beginning in 2004, and (while on leave from Paris Dauphine) at ENSAE from 2009 to 2014.[2] She joined Oxford in 2017.[6]
Recognition
In 2015 Rousseau won the inaugural Ethel Newbold Prize of the Bernoulli Society for Mathematical Statistics and Probability. The award recognizes a "recipient of any gender who is an outstanding statistical scientist for a body of work that represents excellence in research in mathematical statistics". The body of work for which Rousseau was recognized includes her work on infinite-dimensional variants of the Bernstein–von Mises theorem.[1]
References
- ""I like the Bayesian approach because I find it natural and it has this kind of internal coherence that makes it very appealing": An interview with Judith Rousseau", Statistics Views, John Wiley & Sons, 30 August 2016, retrieved 2018-02-08
- Professor Judith Rousseau, Jesus College, Oxford, retrieved 2018-02-08
- Honored IMS Fellows, Institute of Mathematical Statistics, archived from the original on 2014-03-02, retrieved 2018-02-08
- ISBA Fellows, International Society for Bayesian Analysis, retrieved 2018-02-08
- Judith Rousseau at the Mathematics Genealogy Project
- "Appointments", Oxford University Gazette, 5160, 23 February 2017