0
1

Delete article

Deleted articles cannot be recovered.

Draft of this article would be also deleted.

Are you sure you want to delete this article?

R3(42) on "W.a.t.m.i. statistical ideas of the past 50 years? " Andrew Gelman, Aki Vehtari

Last updated at Posted at 2021-11-07

R3(References on References on References) on "What are the most important statistical ideas of the past 50 years? " Andrew Gelman, Aki Vehtari(39)

R3(0) on "What are the most important statistical ideas of the past 50 years? " Andrew Gelman, Aki Vehtari
https://qiita.com/kaizen_nagoya/items/a8eac9afbf16d2188901

What are the most important statistical ideas of the past 50 years?
Andrew Gelman, Aki Vehtari
https://arxiv.org/abs/2012.00174

References 42

Efron, B., and Morris, C. (1971). Limiting the risk of Bayes and empirical Bayes estimators—Part I: The Bayes case. Journal of the American Statistical Association 66, 807–815.

References on 42

42.1

Blackwell, D. and Girshick, M. A. 1954. Theory of Games and Statistical Decisions, New York: John Wiley and Sons, Inc..

42.2

Efron, B. 1970. “Comments on the Inference and Decision Models of Statistics,”. Annals of Mathematical Statistics, 41(3) June: 1049–54.

References on 42.2

42.2.1

[1] Blyth, Colin R. (1968), "On the Inference And Decision Models of Statistics", to appear in the Annals.

42.2.2

[2] Hotelling, H. (1967), "The behavior of some standard statistical tests under nonstandard conditions", Proc. 4th Berk. Symp. Vol. 1, pp. 319-360.

42.2.3

[3] Reisol, O. (1954), "Tests of linear hypotheses concerning binomial experiments", Skand. Aktur Vol. 37, pp. 38-59.

42.2.4

[4] Stein, C. (1966), "An Approach to the Recovery of Interblock Information in Balanced Incomplete Block designs", Festschrift for J. Heymann, pp. 351-366, John Wiley, N. Y.

42.2.5

[5] Rao, L. R. (1965), Linear Statistical Inference And Its Appli-cations, John Wiley, N. Y. [6] Raiff a, H. and Schleifer, R. (1961), Applied Statistical Decision Theory, Harvard Press.

42.3

Elfving, G. November 1966. “Robustness of Bayes Decisions Against the Choice of Prior,”, November, Stanford University, Department of Statistics. Technical Report No. 122

References on 42.3

42.3.1

[1] Feller, W. (1943). "The general form of the so-called law of the iterated logarithm," Trans. Amer. Math. Soc., 54.

42.3.2

[2] Jeffreys, H. (3rd ed. 1961). Theory of Probability. Clarendon Press, Oxford.

42.3.3

[3] Lindley, D.V. (1960). "The use of prior probability distributions in statistical inference and decisions," Proceedings of the Fourth Berkeley Symposium on Mathematical Statistics and Probability (ed. J. Neyman).

42.3.4

[4] Lindley, D.V. (1965). Introduction to probability and statistics from a Bayesian view point, I-II. Cambridge.

42.3.5

[5] v. Mises, R. (1919). "Fundamentalsatze der Wahrscheinlichkeitsrechnune Math. Zeitschr. 4.

42.4

Fisher, R. A. 1957. “Comments on the Notes by Neyman, Bartlett, and Welch in This Journal (Vol. 18 (2), 1956),”. Journal Royal Statistical Society, 19 March: 79 Ser. B

42.5

Hartigan, J. A. 1969. “Linear Bayes Methods,”. Journal Royal Statistical Society, 31(3) September: 446–54. Ser. B

42.6

Hodges, J. L. Jr. and Lehmann, E. L. 1952. “The Use of Previous Experience in Reaching Statistical Decisions,”. Annals of Mathematical Statistics, 23(3) September: 396–407.

42.7

Lindley, D. V. 1965. Introduction to Probability and Statistics From a Bayesian Point of View I-II, New York: Cambridge University Press.

42.8

Lukacs, E. 1970. Characteristic Functions, New York: Hafner Publishing Co..

参考資料(References)

Data Scientist の基礎(2)
https://qiita.com/kaizen_nagoya/items/8b2f27353a9980bf445c

岩波数学辞典 二つの版がCDに入ってお得
https://qiita.com/kaizen_nagoya/items/1210940fe2121423d777

岩波数学辞典
https://qiita.com/kaizen_nagoya/items/b37bfd303658cb5ee11e

アンの部屋(人名から学ぶ数学:岩波数学辞典)英語(24)
https://qiita.com/kaizen_nagoya/items/e02cbe23b96d5fb96aa1

<この記事は個人の過去の経験に基づく個人の感想です。現在所属する組織、業務とは関係がありません。>

最後までおよみいただきありがとうございました。

いいね 💚、フォローをお願いします。

Thank you very much for reading to the last sentence.

Please press the like icon 💚 and follow me for your happy life.

0
1
0

Register as a new user and use Qiita more conveniently

  1. You get articles that match your needs
  2. You can efficiently read back useful information
  3. You can use dark theme
What you can do with signing up
0
1

Delete article

Deleted articles cannot be recovered.

Draft of this article would be also deleted.

Are you sure you want to delete this article?