Debabrata Basu

Debabrata Basu

Debabrata Basu (Bengali: দেবব্রত বসু) (5 July 1924 – 24 March 2001) was a mathematical statistician who made fundamental contributions to the foundations of statistics. Basu invented simple examples that displayed some difficulties of likelihood-based statistics and frequentist statistics; Basu's paradoxes were especially important in the development of survey sampling. In statistical theory, Basu's theorem established the independence of a complete sufficient statistic and an ancillary statistic.[1]

Born in Dacca, Bengal, in unpartitioned India (now in Bangladesh), Basu was associated with the Indian Statistical Institute in India, and Florida State University in the United States.[2]

Contents

Biography

Debabrata Basu was born in Dacca, Bengal, unpartitioned India, now Dhaka, Bangladesh. His father, N. M. Basu, was a mathematician specializing in number theory. Young Basu studied mathematics at Dacca University. He took a course in statistics as part of the under-graduate honours programme in Mathematics but his ambition was to become a pure mathematician.[3] After getting his Master's degree from Dacca University, Basu taught there from 1947 to 1948.[4]

Following the partition of India in 1947 Basu made several trips to India. In 1948, Basu moved to Calcutta, where he worked for some time as an actuary in an insurance company. In 1950, he joined the Indian Statistical Institute as a research scholar under C.R. Rao.[5]

In 1950, the Indian Statistical Institute was visited by Abraham Wald, who was giving a lecture tour sponsored by the International Statistical Institute. Wald greatly impressed Basu. Wald had developed a decision-theoretic foundations for statistics in which Bayesian statistics was a central part, because of Wald's theorem characterizing admissible decision rules as Bayesian decision rules (or limits of Bayesian decision rules). Wald also showed the power of using measure-theoretic probability theory in statistics.

After submitting in 1953 his thesis to the University of Calcutta,[2] Basu went as a Fullbright scholar to the University of California, Berkeley. There Basu had intensive discussions with Jerzy Neyman and "his brilliant younger colleagues" like Erich Leo Lehmann.[6] Basu's theorem comes from this time. Basu thus had a good understanding of the decision-theoretic approach to statistics of Neyman, Pearson and Wald. In fact, Basu is described as having returned from Berkeley to India as a "complete Neyman Pearsonian" by J. K. Ghosh.[7]

Basu met Ronald A. Fisher in the winter of 1954–1955; he wrote in 1988, "With his reference set argument, Sir Ronald was trying to find a via media between the two poles of Statistics – Berkeley and Bayes.[8] My efforts to understand this Fisher compromise led me to the Likelihood Principle".[9] In their festschrift for Basu, the editors M. Ghosh and Patak write that

"[Basu's] critical examination of both the Neyman–Pearsonian and the Fisherian modes of inference eventually forced him to a Bayesian point of view, via the likelihood route. The final conversion to Bayesianism came in January, 1968, when Basu was invited to speak at a Bayesian Session in the Statistics Section of the Indian Science Congress. He confesses that, while preparing for these lectures, he became convinced that Bayesian inference did indeed provide one with a logical resolution of the underlying inconsistencies of both the Neyman–Pearson and the Fisherian theories. Since then, Dr. Basu became an ardent Bayesian and, in many of his foundation papers, pointed out the deficiencies of both the Neyman–Pearsonian and the Fisherian methods."[1]

After 1968, Basu began writing polemical essays, which provided paradoxes to frequentist statistics, and which produced great discussion in statistical journals and at statistical meetings. Particularly stimulating papers were Basu's papers on the foundations of survey sampling[10] There is an extensive literature discussing Basu's problem of estimating the weight of the elephants at a circus with an enormous bull elephant named "Jumbo"[11] and on the Fisher randomization test.[12]

After teaching at the Indian Statistical Institute Dr. Basu moved to the United States and taught statistics at Florida State University from 1975 to 1990 when he was made an emeritus professor; he has supervised six students.[13]

About Basu

References

  1. ^ a b Page i in Ghosh, Malay; Pathak, Pramod K.. "Preface". In Malay Ghosh and Pramod K. Pathak. Current Issues in Statistical Inference—Essays in Honor of D. Basu. Hayward, CA: Institute for Mathematical Statistics. pp. i–ii. doi:10.1214/lnms/1215458836. MR1194407. http://projecteuclid.org/euclid.lnms/1215458836. 
  2. ^ a b Page i in "Preface" to IMS festschrift.
  3. ^ Page xvii in Basu, D. (1988). "A Summing Up". In J. K. Ghosh. Statistical Information and Likelihood : A Collection of Critical Essays by Dr. D. Basu. Lecture Notes in Statistics. 45. Springer. pp. xvii–xviii. ISBN 0-387-96751-6. MR953081. 
  4. ^ Page i in "Preface" to IMS festschrift. (C.f., Basu's preface to his collected writings, edited by Ghosh.)
  5. ^ Page i in "Preface" to IMS festschrift. (C.f., Basu, D. (1988). "A Summing Up". In J. K. Ghosh. Statistical Information and Likelihood : A Collection of Critical Essays by Dr. D. Basu. Lecture Notes in Statistics. 45. Springer. pp. xvii–xviii. ISBN 0-387-96751-6. MR953081. ).
  6. ^ Page xvii in Basu's "A Summing Up".
  7. ^ Page viii of J. K. Ghosh's preface to the selected essays of Basu.
  8. ^ The term "Berkeley" has several meanings, here. Basu refers to the leadership of Jerzy Neyman's department of statistics at the University of California at Berkeley in the world of frequentist statistics. Secondly, Basu alludes to the British philosopher George Berkeley who criticized the use of infinitesimals in mathematical analysis; Berkeley's criticisms were answered by Thomas Bayes in a pamphlet.
  9. ^ Page xvii in Ghosh (ed.).
  10. ^ Ghosh's editorial notes.
  11. ^ Brewer, Ken (2002). Combined Survey Sampling Inference: Weighing of Basu's Elephants. Hodder Arnold. ISBN 0340692294, 978-0340692295. 
    Pavía, Jose M. Estimating proportions with unequal sampling probabilities: the Basu's elephant problem revisited (2009). Far East J. Theor. Stat. 29 (2): 129–136. 
  12. ^ Kempthorne, Oscar. "Intervention experiments, randomization and inference". In Malay Ghosh and Pramod K. Pathak. Current Issues in Statistical Inference—Essays in Honor of D. Basu. Hayward, CA: Institute for Mathematical Statistics. pp. 13–31. doi:10.1214/lnms/1215458836. MR1194407. http://projecteuclid.org/euclid.lnms/1215458836. 
  13. ^ "Mathematical Genealogy". http://genealogy.math.ndsu.nodak.edu/id.php?id=48981. Retrieved 2008-03-04. 

Publications of D. Basu

Basu’s main articles are reprinted with his comments in

  • Basu, D. (1988). J. K. Ghosh. ed. Statistical information and likelihood : A collection of critical essays by Dr. D. Basu. Lecture Notes in Statistics. 45. Springer. ISBN 0-387-96751-6. MR953081. 

Selected articles

  • Basu, D. (September 1980). "Randomization Analysis of Experimental Data: The Fisher Randomization Test". Journal of the American Statistical Association 75 (371): 575–582. doi:10.2307/2287648. JSTOR 2287648. MR590687. 

External links


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