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Paul Jean Joseph Barbarin

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Paul Jean Joseph Barbarin
Born(1855-10-20)20 October 1855
Died28 September 1931(1931-09-28) (aged 75)
NationalityFrench
Alma materÉcole polytechnique
École normale supérieure
OccupationMathematician

Paul Jean Joseph Barbarin (20 October 1855, Tarbes – 28 September 1931) was a French mathematician, specializing in geometry.[1][2]

Education and career

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Barbarin studied mathematics for a brief time at the École Polytechnique, but changed, at the age of 1912, to the École Normale Supérieure, where he studied mathematics under Briot, Bouquet, Tannery, and Darboux. After graduation, Barbarin became a professor of mathematics at the Lyceum of Nice and then at the School of St.-Cyr of the Lyceum of Toulon. In 1891 he became a professor at the Lyceum of Bordeaux, where he taught for many years.[1] At the time of his death he was a professor at the École Spéciale des Travaux Publics in Paris.[2]

In 1903 the Kazan Physical and Mathematical Society of Kazan State University awarded the Lobachevsky Prize to Hilbert but the Society cited Barbarin as the second choice among the nominees considered.[1] When Hilbert received the Society's award, Henri Poincaré contributed a report on the work of Hilbert, and Professor Mansion of Ghent contributed a report on the work of Barbarin. In a 1904 article published in the journal Science, G. B. Halsted gave an English summary of the two French reports.[3]

Athanase Papadopoulos edited and translated Lobachevsky's Pangéométrie ou Précis de géométrie fondée sur une théorie générale et rigoureuse des parallèles (Pangeometry) and provided a footnote concerning Barbarin:[4]

P. Barbarin, La géométrie non euclidienne ... This is an excellent introductory textbook on hyperbolic geometry, although it presents some of the results without complete proofs. The book also contains interesting historical remarks. The third edition of the book (1928) contains supplementary chapters by A. Buhl on the relation between non-Euclidean geometry and physics. ... Barbarin was a high-school teacher in Bordeaux. We owe him several results on hyperbolic geometry, in particular, the first complete classification of conics and quadrics in the non-Euclidean plane, and new formulae for volumes of tetrahedra.

Barbarin was an Invited Speaker of the ICM in 1928 in Bologna.

Selected publications

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Articles

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Books

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  • Études de géométrie analytique non euclidienne. Bruxelles. 1900.{{cite book}}: CS1 maint: location missing publisher (link)
  • Géométrie infinitésimal non euclidienne. Lisbonne. 1901.{{cite book}}: CS1 maint: location missing publisher (link)
  • Barbarin, Paul (1902). La géométrie non euclidienne. Paris.{{cite book}}: CS1 maint: location missing publisher (link)[5][6] deuxième édition. Scientia. [Serie] physico-mathematique; no 15. Gauthier-Villars. 1907. troisième édition. 1928; notes détaillées par Adolphe Buhl{{cite book}}: CS1 maint: postscript (link)[7]

References

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  1. ^ Jump up to: a b c Halsted, G. B. (November 1908). "Biographical Sketch of Paul Barbarin". The American Mathematical Monthly. 15 (11): 195–196. doi:10.1080/00029890.1908.11997455.
  2. ^ Jump up to: a b "Notes". Bulletin of the American Mathematical Society. 38 (7): 481–485. 1932. doi:10.1090/S0002-9904-1932-05456-8. (See p. 484.)
  3. ^ Halsted, G. B. (16 September 1904). "The Lobachevsky Prize". Science. 20 (507): 353–367. Bibcode:1904Sci....20..353H. doi:10.1126/science.20.507.353. PMID 17734039. (report on Barbarin's work, pp. 363–367)
  4. ^ Lobachevsky, Nikolai I. (2010). Pangeometry. European Mathematical Society. p. 288. ISBN 978-3-03719-087-6; translated and edited by Athanase Papadopoulos{{cite book}}: CS1 maint: postscript (link)
  5. ^ Halsted, G. B. (1902). "Review of La Géométrie non-euclidienne par P. Barbarin". The American Mathematical Monthly. 9 (6/7): 153–159. doi:10.2307/2968815. JSTOR 2968815.
  6. ^ Buhl, A. (1902). "critique de livre: Géométrie non euclidienne par P. Barbarin". L'Enseignement mathématique. série 1, tome 4: 223–226.
  7. ^ Allen, Edward Switzer (1929). "Three books on non-euclidean geometry". Bull. Amer. Math. Soc. 35: 271–276. doi:10.1090/S0002-9904-1929-04726-8.(See pp. 275–276.)