Necktie paradox (English Wikipedia)

Analysis of information sources in references of the Wikipedia article "Necktie paradox" in English language version.

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23doi.org

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4semanticscholar.org

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3harvard.edu

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3consequently.org

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2archive.org

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2arxiv.org

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1oup.com

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archive.org

Kraitchik, Maurice (1943). "Mathematical Recreations". London: George Allen & Unwin.
Smullyan, Raymond (1992). Satan, Cantor, and infinity and other mind-boggling puzzles. Alfred A. Knopf. pp. 189–192. ISBN 978-0-679-40688-4.

arxiv.org

Tsikogiannopoulos, Panagiotis (2012). "Παραλλαγές του προβλήματος της ανταλλαγής φακέλων" [Variations on the Two Envelopes Problem]. Mathematical Reviews (in Greek). arXiv:1411.2823. Bibcode:2014arXiv1411.2823T.
Bliss (2012). "A Concise Resolution to the Two Envelope Paradox". arXiv:1202.4669 [stat.OT].

cf.ac.uk

orca.cf.ac.uk

Clark, M.; Shackel, N. (2000). "The Two-Envelope Paradox" (PDF). Mind. 109 (435): 415–442. doi:10.1093/mind/109.435.415.

consequently.org

Priest, Graham; Restall, Greg (2007), "Envelopes and Indifference" (PDF), Dialogues, Logics and Other Strange Things, College Publications: 135–140
Priest, Graham; Restall, Greg (2007), "Envelopes and Indifference" (PDF), Dialogues, Logics and Other Strange Things, College Publications: 135–140
Priest, Graham; Restall, Greg (2007), "Envelopes and Indifference" (PDF), Dialogues, Logics and Other Strange Things, College Publications: 135–140

doi.org

Falk, Ruma (2008). "The Unrelenting Exchange Paradox". Teaching Statistics. 30 (3): 86–88. doi:10.1111/j.1467-9639.2008.00318.x. S2CID 120397860.
Syverson, Paul (1 April 2010). "Opening Two Envelopes". Acta Analytica. 25 (4): 479–498. doi:10.1007/s12136-010-0096-7. S2CID 12344371.
Markosian, Ned (2011). "A Simple Solution to the Two Envelope Problem". Logos & Episteme. II (3): 347–57. doi:10.5840/logos-episteme20112318.
McDonnell, Mark D; Grant, Alex J; Land, Ingmar; Vellambi, Badri N; Abbott, Derek; Lever, Ken (2011). "Gain from the two-envelope problem via information asymmetry: on the suboptimality of randomized switching". Proceedings of the Royal Society A. 467 (2134): 2825–2851. Bibcode:2011RSPSA.467.2825M. doi:10.1098/rspa.2010.0541.
McGrew, Timothy; Shier, David; Silverstein, Harry (1997). "The Two-Envelope Problem Resolved". Analysis. 57 (1): 28–33. doi:10.1093/analys/57.1.28.
Nickerson, Raymond S.; Falk, Ruma (2006-05-01). "The exchange paradox: Probabilistic and cognitive analysis of a psychological conundrum". Thinking & Reasoning. 12 (2): 181–213. doi:10.1080/13576500500200049. ISSN 1354-6783. S2CID 143472998.
Nalebuff, Barry (Spring 1988). "Puzzles: Cider in Your Ear, Continuing Dilemma, The Last Shall Be First, and More". Journal of Economic Perspectives. 2 (2): 149–156. doi:10.1257/jep.2.2.149. and Gardner, Martin (1989) Penrose Tiles to Trapdoor Ciphers: And the Return of Dr Matrix.
Nalebuff, Barry (1989), "Puzzles: The Other Person's Envelope is Always Greener", Journal of Economic Perspectives, 3 (1): 171–181, doi:10.1257/jep.3.1.171.
Christensen, R; Utts, J (1992), "Bayesian Resolution of the "Exchange Paradox"", The American Statistician, 46 (4): 274–76, doi:10.1080/00031305.1992.10475902.
Blachman, NM; Christensen, R; Utts, J (1996). "Letters to the Editor". The American Statistician. 50 (1): 98–99. doi:10.1080/00031305.1996.10473551.
Falk, Ruma; Nickerson, Raymond (2009), "An inside look at the two envelopes paradox", Teaching Statistics, 31 (2): 39–41, doi:10.1111/j.1467-9639.2009.00346.x, S2CID 122078010.
Broome, John (1995), "The Two-envelope Paradox", Analysis, 55 (1): 6–11, doi:10.1093/analys/55.1.6.
Binder, DA (1993), "Letter to editor and response", The American Statistician, 47 (2): 160, doi:10.1080/00031305.1991.10475791.
Ross (1994), "Letter to editor and response", The American Statistician, 48 (3): 267–269, doi:10.1080/00031305.1994.10476075.
Blachman, NM; Christensen, R; Utts, JM (1996), "Letter with corrections to the original article", The American Statistician, 50 (1): 98–99, doi:10.1080/00031305.1996.10473551.
Broome, John (1995). "The Two-envelope Paradox". Analysis. 55 (1): 6–11. doi:10.1093/analys/55.1.6. A famous example of a proper probability distribution of the amounts of money in the two envelopes, for which $E(B|A=a)>a$ for all a.
Binder, D. A. (1993). "Letters to the Editor". The American Statistician. 47 (2): 157–163. doi:10.1080/00031305.1993.10475966. Comment on Christensen and Utts (1992)
Chalmers, David J. (2002). "The St. Petersburg Two-Envelope Paradox". Analysis. 62 (2): 155–157. doi:10.1093/analys/62.2.155.
Powers, Michael R. (2015). "Paradox-Proof Utility Functions for Heavy-Tailed Payoffs: Two Instructive Two-Envelope Problems". Risks. 3 (1): 26–34. doi:10.3390/risks3010026. hdl:10419/167837.
Clark, M.; Shackel, N. (2000). "The Two-Envelope Paradox" (PDF). Mind. 109 (435): 415–442. doi:10.1093/mind/109.435.415.
Chase, James (2002). "The Non-Probabilistic Two Envelope Paradox" (PDF). Analysis. 62 (2): 157–160. doi:10.1093/analys/62.2.157.
Katz, Bernard; Olin, Doris (2007). "A tale of two envelopes". Mind. 116 (464): 903–926. doi:10.1093/mind/fzm903.
McDonnell, M. D.; Abott, D. (2009). "Randomized switching in the two-envelope problem". Proceedings of the Royal Society A. 465 (2111): 3309–3322. Bibcode:2009RSPSA.465.3309M. doi:10.1098/rspa.2009.0312.

handle.net

hdl.handle.net

Powers, Michael R. (2015). "Paradox-Proof Utility Functions for Heavy-Tailed Payoffs: Two Instructive Two-Envelope Problems". Risks. 3 (1): 26–34. doi:10.3390/risks3010026. hdl:10419/167837.

harvard.edu

ui.adsabs.harvard.edu

McDonnell, Mark D; Grant, Alex J; Land, Ingmar; Vellambi, Badri N; Abbott, Derek; Lever, Ken (2011). "Gain from the two-envelope problem via information asymmetry: on the suboptimality of randomized switching". Proceedings of the Royal Society A. 467 (2134): 2825–2851. Bibcode:2011RSPSA.467.2825M. doi:10.1098/rspa.2010.0541.
Tsikogiannopoulos, Panagiotis (2012). "Παραλλαγές του προβλήματος της ανταλλαγής φακέλων" [Variations on the Two Envelopes Problem]. Mathematical Reviews (in Greek). arXiv:1411.2823. Bibcode:2014arXiv1411.2823T.
McDonnell, M. D.; Abott, D. (2009). "Randomized switching in the two-envelope problem". Proceedings of the Royal Society A. 465 (2111): 3309–3322. Bibcode:2009RSPSA.465.3309M. doi:10.1098/rspa.2009.0312.

oup.com

academic.oup.com

McGrew, Timothy; Shier, David; Silverstein, Harry (1997). "The Two-Envelope Problem Resolved". Analysis. 57 (1): 28–33. doi:10.1093/analys/57.1.28.

semanticscholar.org

api.semanticscholar.org

Falk, Ruma (2008). "The Unrelenting Exchange Paradox". Teaching Statistics. 30 (3): 86–88. doi:10.1111/j.1467-9639.2008.00318.x. S2CID 120397860.
Syverson, Paul (1 April 2010). "Opening Two Envelopes". Acta Analytica. 25 (4): 479–498. doi:10.1007/s12136-010-0096-7. S2CID 12344371.
Nickerson, Raymond S.; Falk, Ruma (2006-05-01). "The exchange paradox: Probabilistic and cognitive analysis of a psychological conundrum". Thinking & Reasoning. 12 (2): 181–213. doi:10.1080/13576500500200049. ISSN 1354-6783. S2CID 143472998.
Falk, Ruma; Nickerson, Raymond (2009), "An inside look at the two envelopes paradox", Teaching Statistics, 31 (2): 39–41, doi:10.1111/j.1467-9639.2009.00346.x, S2CID 122078010.

sorites.org

Schwitzgebe, Eric; Dever, Josh (2008), "The Two Envelope Paradox and Using Variables Within the Expectation Formula" (PDF), Sorites: 135–140

umass.edu

srri.umass.edu

Falk, Ruma; Konold, Clifford (1992). "The Psychology of Learning Probability" (PDF). Statistics for the Twenty-first Century – via Mathematical Association of America.

utas.edu.au

eprints.utas.edu.au

Chase, James (2002). "The Non-Probabilistic Two Envelope Paradox" (PDF). Analysis. 62 (2): 157–160. doi:10.1093/analys/62.2.157.

utoronto.ca

philosophy.utoronto.ca

Byeong-Uk Yi (2009). "The Two-envelope Paradox With No Probability" (PDF). Archived from the original (PDF) on 2011-09-29. {{cite journal}}: Cite journal requires |journal= (help)

web.archive.org

Byeong-Uk Yi (2009). "The Two-envelope Paradox With No Probability" (PDF). Archived from the original (PDF) on 2011-09-29. {{cite journal}}: Cite journal requires |journal= (help)

worldcat.org

search.worldcat.org

Nickerson, Raymond S.; Falk, Ruma (2006-05-01). "The exchange paradox: Probabilistic and cognitive analysis of a psychological conundrum". Thinking & Reasoning. 12 (2): 181–213. doi:10.1080/13576500500200049. ISSN 1354-6783. S2CID 143472998.