Search: id:A014552 Results 1-1 of 1 results found. %I A014552 %S A014552 0,0,1,1,0,0,26,150,0,0,17792,108144,0,0,39809640,326721800,0,0, %T A014552 256814891280,2636337861200,0,0,3799455942515488,46845158056515936 %N A014552 Number of solutions to Langford (or Langford-Skolem) problem. %C A014552 How many ways are of arranging the numbers 1,1,2,2,3,3,...,n,n so that there is one number between the two 1's, two numbers between the two 2's, ..., n numbers between the two n's? %D A014552 Jaromir Abrham, "Exponential lower bounds for the numbers of Skolem and extremal Langford sequences," Ars Combinatoria 22 (1986), 187-198. %D A014552 R. O. Davies, On Langford's problem II, Math. Gaz., 1959, vol. 43, 253-255. %D A014552 M. Gardner, Mathematical Magic Show, New York: Vintage, pp. 70 and 77-78, 1978. %D A014552 M. Gardner, Mathematical Magic Show, Revised edition published by Math. Assoc. Amer. in 1989. Contains a postscript on pp. 283-284 devoted to a discussion of early computations of the number of Langford sequences. %D A014552 R. K. Guy, The unity of combinatorics, Proc. 25th Iranian Math. Conf, Tehran, (1994), Math. Appl 329 129-159, Kluwer Dordrecht 1995, Math. Rev. 96k:05001. %D A014552 M. Krajecki, Christophe Jaillet and Alain Bui, "Parallel tree search for combinatorial problems: A comparative study between OpenMP and MPI," Studia Informatica Universalis 4 (2005), 151-190. %D A014552 C. D. Langford, Math. Gaz., 1958, vol. 42, p. 228. %D A014552 C. J. Priday, On Langford's Problem I, Math. Gaz., 1959, vol. 43, 250-253. %D A014552 Saito and Hayasaka, Langford sequences: a progress report, Math. Gaz., 1979, vol. 63, #426, 261-262. %D A014552 J. E. Simpson, Langford Sequences: perfect and hooked, Discrete Math., 1983, vol. 44, #1, 97-104. %D A014552 T. Skolem, On certain distributions of integers in pairs with given differences, Math. Scand., 1957, vol. 5, 57-68. %H A014552 Michael Krajecki, L(2,23)=3,799,455,942,515,488. %H A014552 J. E. Miller, Langford's Problem %H A014552 J. E. Miller, Latest report on Langford's problem %H A014552 G. Nordh, Perfect Skolem sequences %H A014552 W. Schneider, Langford's Problem %H A014552 T. Skolem, On certain distributions of integers in pairs with given differences, Math. Scand., 1957, vol. 5, 57-68. %H A014552 Eric Weisstein's World of Mathematics, Langford's Problem. %F A014552 a(n) > 0 iff n == -1 or 0 mod 4. %e A014552 Solutions for n=3 and 4: 312132 and 41312432. Solution for n=16: 16, 14, 12, 10, 13, 5, 6, 4, 15, 11, 9, 5, 4, 6, 10, 12, 14, 16, 13, 8, 9, 11, 7, 1, 15, 1, 2, 3, 8, 2, 7, 3. %Y A014552 See A050998 for further examples of solutions. Cf. A059106, A059107, A059108, A125762. %Y A014552 Sequence in context: A042316 A042318 A166801 this_sequence A042314 A027280 A006354 %Y A014552 Adjacent sequences: A014549 A014550 A014551 this_sequence A014553 A014554 A014555 %K A014552 nonn,hard,nice %O A014552 1,7 %A A014552 John Miller (miller(AT)lclark.edu), Eric Weisstein (eric(AT)weisstein.com), N. J. A. Sloane (njas(AT)research.att.com). %E A014552 a(20) from Ron van Bruchem and Mike Godfrey, Feb 18, 2002 %E A014552 a(21)-a(23) sent by John Miller (miller(AT)lclark.edu) and Pab Ter (pabrlos(AT)yahoo.com), May 26 2004. These values were found by a team at Universite de Reims Champagne-Ardenne, headed by Michael Krajecki, using over 50 processors for 4 days. %E A014552 a(24)=46845158056515936 was computed circa Apr 15 2005 by the Krajecki team. - D. E. Knuth, Feb 03 2007 Search completed in 0.002 seconds