احتمال فراوانی‌گرا (Persian Wikipedia)

Analysis of information sources in references of the Wikipedia article "احتمال فراوانی‌گرا" in Persian language version.

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7doi.org

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4nih.gov

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1harvard.edu

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1leidenuniv.nl

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1jstor.org

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1stanford.edu

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1lse.ac.uk

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doi.org

Goodman, Steven N. (1999). "Toward Evidence-Based Medical Statistics. 1: The P Value Fallacy". Annals of Internal Medicine. 130 (12): 995–1004. doi:10.7326/0003-4819-130-12-199906150-00008. PMID 10383371.
Morey, Richard D.; Hoekstra, Rink; Rouder, Jeffrey N.; Lee, Michael D.; Wagenmakers, Eric-Jan (2016). "The fallacy of placing confidence in confidence intervals". Psychonomic Bulletin & Review. 23 (1): 103–123. doi:10.3758/s13423-015-0947-8. PMC 4742505. PMID 26450628.
Matthews, Robert (2021). "The p ‐value statement, five years on". Significance. 18 (2): 16–19. doi:10.1111/1740-9713.01505.
Rubin, M. (2020). ""Repeated sampling from the same population?" A critique of Neyman and Pearson's responses to Fisher". European Journal for Philosophy of Science. 10 (42): 1–15. doi:10.1007/s13194-020-00309-6.
Neyman, Jerzy (30 August 1937). "Outline of a Theory of Statistical Estimation Based on the Classical Theory of Probability". Phil. Trans. R. Soc. Lond. A. 236 (767): 333–380. Bibcode:1937RSPTA.236..333N. doi:10.1098/rsta.1937.0005. Neyman's derivation of confidence intervals embraced the measure theoretic axioms of probability published by Kolmogorov a few years previously and referenced the subjective (Bayesian) probability definitions of Jeffreys published earlier in the decade. Neyman defined frequentist probability (under the name classical) and stated the need for randomness in the repeated samples or trials. He accepted in principle the possibility of multiple competing theories of probability while expressing several specific reservations about the existing alternative probability interpretation.
Kendall, Maurice George (1949). "On the Reconciliation of Theories of Probability". Biometrika. Biometrika Trust. 36 (1/2): 101–116. doi:10.1093/biomet/36.1-2.101. JSTOR 2332534. PMID 18132087.
Fairfield, Tasha; Charman, Andrew E. (15 May 2017). "Explicit Bayesian Analysis for Process Tracing: Guidelines, Opportunities, and Caveats". Political Analysis. 25 (3): 363–380. doi:10.1017/pan.2017.14.

harvard.edu

ui.adsabs.harvard.edu

Neyman, Jerzy (30 August 1937). "Outline of a Theory of Statistical Estimation Based on the Classical Theory of Probability". Phil. Trans. R. Soc. Lond. A. 236 (767): 333–380. Bibcode:1937RSPTA.236..333N. doi:10.1098/rsta.1937.0005. Neyman's derivation of confidence intervals embraced the measure theoretic axioms of probability published by Kolmogorov a few years previously and referenced the subjective (Bayesian) probability definitions of Jeffreys published earlier in the decade. Neyman defined frequentist probability (under the name classical) and stated the need for randomness in the repeated samples or trials. He accepted in principle the possibility of multiple competing theories of probability while expressing several specific reservations about the existing alternative probability interpretation.

jstor.org

Kendall, Maurice George (1949). "On the Reconciliation of Theories of Probability". Biometrika. Biometrika Trust. 36 (1/2): 101–116. doi:10.1093/biomet/36.1-2.101. JSTOR 2332534. PMID 18132087.

leidenuniv.nl

"Earliest Known Uses of Some of the Words of Probability & Statistics".

lse.ac.uk

eprints.lse.ac.uk

Fairfield, Tasha; Charman, Andrew E. (15 May 2017). "Explicit Bayesian Analysis for Process Tracing: Guidelines, Opportunities, and Caveats". Political Analysis. 25 (3): 363–380. doi:10.1017/pan.2017.14.

nih.gov

pubmed.ncbi.nlm.nih.gov

Goodman, Steven N. (1999). "Toward Evidence-Based Medical Statistics. 1: The P Value Fallacy". Annals of Internal Medicine. 130 (12): 995–1004. doi:10.7326/0003-4819-130-12-199906150-00008. PMID 10383371.
Morey, Richard D.; Hoekstra, Rink; Rouder, Jeffrey N.; Lee, Michael D.; Wagenmakers, Eric-Jan (2016). "The fallacy of placing confidence in confidence intervals". Psychonomic Bulletin & Review. 23 (1): 103–123. doi:10.3758/s13423-015-0947-8. PMC 4742505. PMID 26450628.
Kendall, Maurice George (1949). "On the Reconciliation of Theories of Probability". Biometrika. Biometrika Trust. 36 (1/2): 101–116. doi:10.1093/biomet/36.1-2.101. JSTOR 2332534. PMID 18132087.

ncbi.nlm.nih.gov

Morey, Richard D.; Hoekstra, Rink; Rouder, Jeffrey N.; Lee, Michael D.; Wagenmakers, Eric-Jan (2016). "The fallacy of placing confidence in confidence intervals". Psychonomic Bulletin & Review. 23 (1): 103–123. doi:10.3758/s13423-015-0947-8. PMC 4742505. PMID 26450628.

stanford.edu

plato.stanford.edu

Hájek, Alan (21 October 2002), Zalta, Edward N. (ed.), Interpretations of Probability, The Stanford Encyclopedia of Philosophy {{citation}}: Check date values in: |archivedate= (help) خطای یادکرد: برچسب <ref> نامعتبر؛ نام «SEPIP» چندین بار با محتوای متفاوت تعریف شده است. (صفحهٔ راهنما را مطالعه کنید.).