Search: id:A006066 Results 1-1 of 1 results found. %I A006066 M1334 %S A006066 0,0,1,2,5,7,11,15,21 %N A006066 Kobon triangles: maximal number of nonoverlapping triangles that can be formed from n lines drawn in the plane. %C A006066 The known values a = a(n) and upperbounds U (usually A032765(n)) with name of discoverer of the arrangement when known are as follows: %C A006066 n a U [Found by] %C A006066 --------------- %C A006066 1 0 0 %C A006066 2 0 0 %C A006066 3 1 1 %C A006066 4 2 2 %C A006066 5 5 5 %C A006066 6 7 7 %C A006066 7 11 11 %C A006066 8 15 16 %C A006066 9 21 21 %C A006066 10 25? 26 [Gruenbaum] %C A006066 11 32? 33 [See link below] %C A006066 12 ? 40 %C A006066 13 47 47 [Kabanovitch] %C A006066 14 >= 53 56 [Bader] %C A006066 15 65 65 [Suzuki] %C A006066 16 >=72 74 [Bader] %C A006066 17 85 85 [Bader] %C A006066 18 >= 93 96 [Bader] %C A006066 19 >= 104 107 [Bader] %C A006066 20 >= 115 120 [Bader] %C A006066 21 >= 130 133 [Bader] %C A006066 22 ? 146 %C A006066 23 ? 161 %C A006066 24 ? 176 %C A006066 25 ? 191 %C A006066 26 ? 208 %C A006066 27 ? 225 %C A006066 28 ? 242 %C A006066 29 ? 261 %C A006066 30 ? 280 %C A006066 31 ? 299 %C A006066 32 ? 320 %C A006066 Ed Pegg's web page gives the upper bound for a(6) as 8. But by considering all possible arrangements of 6 lines - the sixth term of A048872 - one can see that 8 is impossible. - N. J. A. Sloane (njas(AT)research.att.com), Nov 11 2007 %C A006066 Although they are somewhat similar, this sequence is strictly different from A084935, since A084935(12) = 48 exceeds the upper bound on a(12) from A032765. - Floor en Lyanne van Lamoen (fvanlamoen(AT)planet.nl), Nov 16 2005 %C A006066 The name is sometimes incorrectly entered as "Kodon" triangles. %D A006066 N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence). %D A006066 M. Gardner, Wheels, Life and Other Mathematical Amusements. Freeman, NY, 1983, p. 171. %D A006066 Branko Gruenbaum, Convex Polytopes; p. 400 shows that a(10) >= 25. %D A006066 Viatcheslav Kabanovitch, Kobon Triangle Solutions, Sharada (Charade, by the Russian puzzle club Diogen), pp. 1-2, June 1999. %H A006066 J. Bader, Kobon Triangles %H A006066 J. Bader, Illustration showing a(17)=85, Nov 28 2007. %H A006066 S. Honma, Title? (A related site) %H A006066 S. Honma, Title? (A related site) %H A006066 S. Honma, Illustration showing a(11)>=32 %H A006066 S. Honma, Title? (A related site) %H A006066 S. Honma, Title? (A related site) %H A006066 S. Honma, Title? (A related site) %H A006066 Ed Pegg, Jr., Kobon triangles %H A006066 Alexandre Wajnberg, Illustration showing a(10) >= 25 [A different construction from Gruenbaum's] %H A006066 Eric Weisstein's World of Mathematics, Kobon Triangle %F A006066 An upper bound on this sequence is given by A032765. %e A006066 a(17) = 85 because the a configuration with 85 exists meeting the upper bound. %Y A006066 Sequence in context: A157001 A134640 A032616 this_sequence A084935 A062409 A089781 %Y A006066 Adjacent sequences: A006063 A006064 A006065 this_sequence A006067 A006068 A006069 %K A006066 nonn %O A006066 1,4 %A A006066 N. J. A. Sloane (njas(AT)research.att.com). %E A006066 a(15) = 65 found by T. Suzuki on Oct 02, 2005. - Eric Weisstein (eric(AT)weisstein.com), Oct 04, 2005. %E A006066 Gruenbaum reference from Anthony Labarre, Dec 19 2005 %E A006066 Additional links to Japanese web sites from Alexandre Wajnberg (alexandre.wajnberg(AT)skynet.be), Dec 29 2005 and Anthony Labarre (alabarre(AT)ulb.ac.be), Dec 30 2005 %E A006066 A perfect solution for 13 lines was found in 1999 by Kabanovitch. - Ed Pegg, Jr., Feb 08 2006 %E A006066 Updated with results from Johannes Bader (johannes.bader(AT)tik.ee.ethz.ch), Dec 06 2007, who says "Acknowledgments and dedication to Corinne Thomet". Search completed in 0.001 seconds