Geodesic
Acute Triangulation of a Triangle in a General Setting
Canadian mathematical bulletin, Tome 53 (2010) no. 3, pp. 534-541

Voir la notice de l'article provenant de la source Cambridge University Press

We prove that, in ordered plane geometries endowed with a very weak notion of orthogonality, one can always triangulate any triangle into seven acute triangles, and, in case the given triangle is not acute, into no fewer than seven.
DOI : 10.4153/CMB-2010-059-4
Mots-clés : 51G05, 51F20, 51F05 
Pambuccian, Victor. Acute Triangulation of a Triangle in a General Setting. Canadian mathematical bulletin, Tome 53 (2010) no. 3, pp. 534-541. doi: 10.4153/CMB-2010-059-4
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[1] [1] Bachmann, F., Aufbau der Geometrie aus dem Spiegelungsbegriff. Zweite ergãnzte Auflage. Die Grundlehren der mathematischenWissenschaften, 96, Springer-Verlag, Berlin, 1973. Google Scholar

[2] [2] Bachmann, O., Zur spiegelungsgeometrischen Begründung von Geometrien. Geom. Dedicata 5(1976), no. 4, 497–516. Google Scholar

[3] [3] Burago, Ju. D., Zalgaller, V. A., Polyhedral embedding of a net. (Russian) Vestnik Leningrad Univ. 15(1960), no. 7, 66–80. Google Scholar

[4] [4] Coppel, W. A., Foundations of convex geometry. Australian Mathematical Society Lecture Series, 12, Cambridge University Press, Cambridge, 1998. Google Scholar

[5] [5] Düvelmeyer, N., A new characterization of Radon curves via angular bisectors. J. Geom. 80(2004), no. 1–2, 75–81. doi:10.1007/s00022-003-1717-8 Google Scholar

[6] [6] Düvelmeyer, N., Angle measures and bisectors in Minkowski planes. Canad. Math. Bull. 48(2005), no. 4, 523–534. Google Scholar

[7] [7] Gardner, M., Mathematical games. A fifth collection of “brain-teasers”. Sci. Amer. 202(1960), no. 2, 150–154. Google Scholar

[8] [8] Gardner, M., Mathematical games. The games and puzzles of Lewis Carroll, and the answers to February's problems. Sci. Amer. 202(1960), no. 3, 172–182. Google Scholar

[9] [9] Goldberg, M. and Manheimer, W., Elementary problems and solutions: solutions: E1406. Amer. Math. Monthly 67(1960), no. 9, 923. doi:10.2307/2309476 Google Scholar

[10] [10] Hangan, T., Itoh, J.-i., and Zamfirescu, T., Acute triangulations. Bull. Math. Soc. Sci. Math. Roumanie (N.S.) 43(91)(2000), no. 3–4, 279–285. Google Scholar

[11] [11] Hilbert, D., über den Satz von der Gleichheit der Basiswinkel im gleichschenkligen Dreieck, Proc. London Math. Soc., , 50–68 (1903); also In: Hilbert, D., Grundlagen der Geometrie, Anhang II, 14. Auflage. Teubner Verlag, Stuttgart, 1999, pp. 88–107. Google Scholar

[12] [12] Itoh, J.-I. and Zamfirescu, T., Acute triangulations of triangles on the sphere. IV Rend. Circ. Mat. Palermo (2) Suppl. No. 70, part II(2002), 59–64. Google Scholar

[13] [13] Itoh, J.-I. and Zamfirescu, T., Acute triangulations of the regular icosahedral surface. Discrete Comput. Geom. 31(2004), no. 2, 197–206. doi:10.1007/s00454-003-0805-8 Google Scholar

[14] [14] Itoh, J.-I. and Zamfirescu, T., Acute triangulations of the regular dodecahedral surface. European J. Combin. 28(2007), no. 4, 1072–1086. doi:10.1016/j.ejc.2006.04.008 Google Scholar

[15] [15] Kaiser, H., Zerlegungen euklidischer und nichteuklidischer Polygone in spitzwinklige Dreiecke. Rad. Jugoslav. Akad. Znan. Umjet. 444(1989), 75–86. Google Scholar

[16] [16] Kusak, E., Desarguesian Euclidean planes and their axiom system. Bull. Polish Acad. Sci. Math. 35(1987), no. 1–2, 87–92. Google Scholar

[17] [17] Lettrich, J., The orthogonality in affine parallel structure. Math. Slovaca 43(1993), no. 1, 45–68. Google Scholar

[18] [18] Maehara, H., On acute triangulations of quadrilaterals. In: Discrete and computational geometry (Tokyo, 2000), Lecture Notes in Computer Science, 2098, Springer, Berlin, 2001, pp. 237–243. Google Scholar

[19] [19] Maehara, H., Acute triangulations of polygons. European J. Combin. 23(2002), no. 1, 45–55. doi:10.1006/eujc.2001.0531 Google Scholar

[20] [20] Martini, H. and Swanepoel, K. J., Antinorms and Radon curves. Aequationes Math. 72(2006), no. 1–2, 110–138. doi:10.1007/s00010-006-2825-y Google Scholar

[21] [21] Naumann, H., Eine affine Rechtwinkelgeometrie. Math. Ann. 131(1956), 17–27. doi:10.1007/BF01354663 Google Scholar

[22] [22] Naumann, H. and Reidemeister, K., Über Schließungssätze der Rechtwinkelgeometrie. Abh. Math. Sem. Univ. Hamburg 21(1957), 1–12. doi:10.1007/BF02941920 Google Scholar

[23] [23] Pejas, W., Eine algebraische Beschreibung der angeordneten Ebenen mit nichteuklidischer Metrik. Math. Z. 83(1964), 434–457. doi:10.1007/BF01111004 Google Scholar

[24] [24] Schütte, K., Die Winkelmetrik in der affin-orthogonalen Ebene. Math. Ann. 130(1955), 183–195. doi:10.1007/BF01343347 Google Scholar

[25] [25] Schütte, K., Gruppentheoretisches Axiomensystem einer verallgemeinerten euklidischen Geometrie. Math. Ann. 132(1956), 43–62. doi:10.1007/BF01343330 Google Scholar

[26] [26] Schütte, K., Schließungssätze für orthogonale Abbildungen euklidischer Ebenen. Math. Ann. 132(1956), 106–120. doi:10.1007/BF01452321 Google Scholar

[27] [27] Thompson, A. C., Minkowski geometry. Encyclopedia of Mathematics and its Applications, 63, Cambridge University Press, Cambridge, 1996. Google Scholar

[28] [28] Veblen, O., A system of axioms for geometry. Trans. Amer. Math. Soc., 5(1904), no. 3, 343–384. doi:10.2307/1986462 Google Scholar

[29] [29] Yuan, L., Acute triangulations of polygons. Discrete Comput. Geom. 34(2005), no. 4, 697–706. doi:10.1007/s00454-005-1188-9 Google Scholar

[30] [30] Yuan, L. and Zamfirescu, T., Acute triangulations of flat Möbius strips. Discrete Comput. Geom. 37(2007), no. 4, 671–676. doi:10.1007/s00454-007-1312-0 Google Scholar

[31] [31] Zamfirescu, C., Acute triangulations of the double triangle. Bull. Math. Soc. Sci. Math. Roumanie (N.S.) 47(95)(2004), no. 3–4, 189–193. Google Scholar

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