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Borwein integral (English Wikipedia)

Analysis of information sources in references of the Wikipedia article "Borwein integral" in English language version.

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7doi.org
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4semanticscholar.org
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3arxiv.org
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2harvard.edu
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2jstor.org
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1ams.org
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1web.archive.org
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1johncarlosbaez.wordpress.com
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1unt.edu
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ams.org

mathscinet.ams.org

  • Borwein, David; Borwein, Jonathan M. (2001), "Some remarkable properties of sinc and related integrals", The Ramanujan Journal, 5 (1): 73–89, doi:10.1023/A:1011497229317, ISSN 1382-4090, MR 1829810, S2CID 6515110

arxiv.org

doi.org

  • Borwein, David; Borwein, Jonathan M. (2001), "Some remarkable properties of sinc and related integrals", The Ramanujan Journal, 5 (1): 73–89, doi:10.1023/A:1011497229317, ISSN 1382-4090, MR 1829810, S2CID 6515110
  • Hill, Heather (2019). "Random walkers illuminate a math problem". Physics Today. doi:10.1063/PT.6.1.20190808a. S2CID 202930808.
  • Schmid, Hanspeter (2014), "Two curious integrals and a graphic proof" (PDF), Elemente der Mathematik, 69 (1): 11–17, doi:10.4171/EM/239, ISSN 0013-6018
  • Satya Majumdar; Emmanuel Trizac (2019), "When random walkers help solving intriguing integrals", Physical Review Letters, 123 (2): 020201, arXiv:1906.04545, Bibcode:2019PhRvL.123b0201M, doi:10.1103/PhysRevLett.123.020201, ISSN 1079-7114, PMID 31386528, S2CID 184488105
  • Jia; Tang; Kempf (2017), "Integration by differentiation: new proofs, methods and examples", Journal of Physics A, 50 (23): 235201, arXiv:1610.09702, Bibcode:2017JPhA...50w5201J, doi:10.1088/1751-8121/aa6f32, S2CID 56012760
  • Bailey, David H.; Borwein, Jonathan M.; Kapoor, Vishaal; Weisstein, Eric W. (2006-06-01). "Ten Problems in Experimental Mathematics". The American Mathematical Monthly. 113 (6): 481. doi:10.2307/27641975. hdl:1959.13/928097. JSTOR 27641975.
  • Schmuland, Byron (2003). "Random Harmonic Series". The American Mathematical Monthly. 110 (5): 407–416. doi:10.2307/3647827. JSTOR 3647827.

handle.net

hdl.handle.net

harvard.edu

ui.adsabs.harvard.edu

johncarlosbaez.wordpress.com

jstor.org

nih.gov

pubmed.ncbi.nlm.nih.gov

schmid-werren.ch

semanticscholar.org

api.semanticscholar.org

  • Borwein, David; Borwein, Jonathan M. (2001), "Some remarkable properties of sinc and related integrals", The Ramanujan Journal, 5 (1): 73–89, doi:10.1023/A:1011497229317, ISSN 1382-4090, MR 1829810, S2CID 6515110
  • Hill, Heather (2019). "Random walkers illuminate a math problem". Physics Today. doi:10.1063/PT.6.1.20190808a. S2CID 202930808.
  • Satya Majumdar; Emmanuel Trizac (2019), "When random walkers help solving intriguing integrals", Physical Review Letters, 123 (2): 020201, arXiv:1906.04545, Bibcode:2019PhRvL.123b0201M, doi:10.1103/PhysRevLett.123.020201, ISSN 1079-7114, PMID 31386528, S2CID 184488105
  • Jia; Tang; Kempf (2017), "Integration by differentiation: new proofs, methods and examples", Journal of Physics A, 50 (23): 235201, arXiv:1610.09702, Bibcode:2017JPhA...50w5201J, doi:10.1088/1751-8121/aa6f32, S2CID 56012760

unt.edu

digital.library.unt.edu

web.archive.org

worldcat.org

  • Borwein, David; Borwein, Jonathan M. (2001), "Some remarkable properties of sinc and related integrals", The Ramanujan Journal, 5 (1): 73–89, doi:10.1023/A:1011497229317, ISSN 1382-4090, MR 1829810, S2CID 6515110
  • Schmid, Hanspeter (2014), "Two curious integrals and a graphic proof" (PDF), Elemente der Mathematik, 69 (1): 11–17, doi:10.4171/EM/239, ISSN 0013-6018
  • Satya Majumdar; Emmanuel Trizac (2019), "When random walkers help solving intriguing integrals", Physical Review Letters, 123 (2): 020201, arXiv:1906.04545, Bibcode:2019PhRvL.123b0201M, doi:10.1103/PhysRevLett.123.020201, ISSN 1079-7114, PMID 31386528, S2CID 184488105
  • Borwein, J. M.; Bailey, D. H. (2003). Mathematics by experiment : plausible reasoning in the 21st century (1st ed.). Wellesley, MA: A K Peters. OCLC 1064987843.
  • Borwein, Jonathan M. (2004). Experimentation in mathematics : computational paths to discovery. David H. Bailey, Roland Girgensohn. Natick, Mass.: AK Peters. ISBN 1-56881-136-5. OCLC 53021555.