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Kneiphof (English Wikipedia)

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

refsWebsite
Global rank English rank
2doi.org
2nd place
2nd place
2semanticscholar.org
11th place
8th place
1archive.org
6th place
6th place
1cantab.net
low place
low place

archive.org

  • Euler, Leonhard (1741). "Solutio problematis ad geometriam situs pertinentis" [Solution of a problem in the geometry of position]. Commentarii Academiae Scientiarum Petropolitanae (in Latin). 8: 128-140 + Plate VIII. {{cite journal}}: External link in |trans-title= (help)

cantab.net

  • Euler, Leonhard (1741). "Solutio problematis ad geometriam situs pertinentis" [Solution of a problem in the geometry of position]. Commentarii Academiae Scientiarum Petropolitanae (in Latin). 8: 128-140 + Plate VIII. {{cite journal}}: External link in |trans-title= (help)

doi.org

  • Räz, Tim (2018). "Euler's Königsberg: The explanatory power of mathematics". European Journal for Philosophy of Science. 8 (3): 331–346. doi:10.1007/s13194-017-0189-x. S2CID 125194454. Arguably, the fact that Euler's paper stands at the beginnings of graph theory is its most important innovation. This supports an observation by Rav (1999) that one of the most important roles of proving theorems lies in the novel insights generated by proof methods beyond determining the truth of particular theorems.
  • Shields, Rob (2012). "Cultural Topology: The Seven Bridges of Königsburg 1736". Theory, Culture & Society. 29 (4–5): 43–57. doi:10.1177/0263276412451161. S2CID 146875675.

semanticscholar.org

api.semanticscholar.org

  • Räz, Tim (2018). "Euler's Königsberg: The explanatory power of mathematics". European Journal for Philosophy of Science. 8 (3): 331–346. doi:10.1007/s13194-017-0189-x. S2CID 125194454. Arguably, the fact that Euler's paper stands at the beginnings of graph theory is its most important innovation. This supports an observation by Rav (1999) that one of the most important roles of proving theorems lies in the novel insights generated by proof methods beyond determining the truth of particular theorems.
  • Shields, Rob (2012). "Cultural Topology: The Seven Bridges of Königsburg 1736". Theory, Culture & Society. 29 (4–5): 43–57. doi:10.1177/0263276412451161. S2CID 146875675.