Rosemary A. Bailey Explained

Rosemary A. Bailey
Citizenship:British
Fields:Design of experiments, analysis of variance
Workplaces:Mathematical Sciences Institute of Queen Mary, University of London, England
Alma Mater:University of Oxford, England
Thesis Title:Finite Permutation Groups
Thesis Year:1974
Doctoral Advisor:Graham Higman

Rosemary A. Bailey (born 1947) is a British statistician who works in the design of experiments and the analysis of variance and in related areas of combinatorial design, especially in association schemes. She has written books on the design of experiments, on association schemes, and on linear models in statistics.

Education and career

Bailey's first degree and Ph.D. were in mathematics at the University of Oxford. She was awarded her doctorate in 1974 for a dissertation on permutation groups, Finite Permutation Groups supervised by Graham Higman. Bailey's career has not been in pure mathematics but in statistics where she has specialised in the algebraic problems associated with the design of experiments.

Bailey worked at the University of Edinburgh with David Finney and at The Open University. She spent 1981–91 in the Statistics Department of Rothamsted Experimental Station. In 1991 Bailey became Professor of Mathematical Sciences at Goldsmiths College in the University of London and then Professor of Statistics at Queen Mary, University of London where she is Professor Emerita of Statistics. She is currently Professor of Mathematics and Statistics in the School of Mathematics and Statistics at the University of St Andrews, Scotland.

Recognition

Bailey is a Fellow of the Institute of Mathematical Statistics and in 2015 was elected a Fellow of the Royal Society of Edinburgh.[1]

Selected publications

External links

Notes and References

  1. News: Professor Rosemary Anne Bailey FRSE - The Royal Society of Edinburgh. The Royal Society of Edinburgh. 2018-02-12. en-GB.
  2. Zieschang, Paul-Hermann. Review: Association schemes: Designed experiments, algebra and combinatorics, by R. A. Bailey. Bull. Amer. Math. Soc. (N.S.). 2006. 43. 2. 249–253. 10.1090/s0273-0979-05-01077-3. free.