Search: id:A003022 Results 1-1 of 1 results found. %I A003022 M2540 %S A003022 1,3,6,11,17,25,34,44,55,72,85,106,127,151,177,199,216,246,283,333,356, %T A003022 372,425 %N A003022 Length of shortest (or optimal) Golomb ruler with n marks. %C A003022 a(n) is the least integer such that there is an n-element set of integers between 0 and a(n), the sums of pairs (of not necessarily distinct elements) of which are distinct. %C A003022 Comments from David W. Wilson (davidwwilson(AT)comcast.net), Aug 17 2007: (Start) %C A003022 An n-mark Golomb ruler has a unique integer distance between any pair of marks and thus measures n(n-1)/2 distinct integer distances. %C A003022 An optimal n-mark Golomb ruler has the smallest possible length (distance between the two end marks) for an n-mark ruler. %C A003022 A perfect n-mark Golomb ruler has length exactly n(n-1)/2 and measures each distance from 1 to n(n-1)/2. (End) %C A003022 Comment from Ed Pegg, Jr. (ed(AT)mathpuzzle.com), Aug 17 2007: If you're looking for something practical, which can measure any distance, you need a "sparse ruler". David Fowler has studied these (see link below). %D A003022 N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence). %D A003022 CRC Handbook of Combinatorial Designs, 1996, p. 315. %D A003022 A. K. Dewdney, Computer Recreations, Scientific Amer. 253 (No. 6, Jun), 1985, pp. 16ff; 254 (No. 3, March), 1986, pp. 20ff. %D A003022 S. W. Golomb, How to number a graph, pp. 23-37 of R. C. Read, editor, Graph Theory and Computing. Academic Press, NY, 1972. %D A003022 A. Kotzig and P. J. Laufer, Sum triangles of natural numbers having minimum top, Ars. Combin. 21 (1986), 5-13. %H A003022 Anonymous, In Search Of The Optimal 20, 21 and 22 Mark Golomb Rulers %H A003022 Distributed.Net, Project OGR %H A003022 Google Scholar, Golomb Ruler %H A003022 G. Martin and K. O'Bryant, Constructions of generalized Sidon sets %H A003022 L. Miller, Golomb Rulers %H A003022 Ed Pegg, Jr., Golomb Rulers %H A003022 B. Rankin, Golomb Ruler Calculations %H A003022 W. Schneider, Golomb Rulers %H A003022 J. B. Shearer, Golomb ruler table %H A003022 J. B. Shearer, Table of Known Optimal Golomb Rulers %H A003022 N. J. A. Sloane, First few optimal Golomb rulers %H A003022 D. Vanderschel et al., In Search Of The Optimal 20, 21 and 22 Mark Golomb Rulers %H A003022 Eric Weisstein's World of Mathematics, Link to a section of The World of Mathematics. %H A003022 Wikipedia, Golomb ruler %H A003022 Index entries for sequences related to Golomb rulers %F A003022 a(n) >= n(n-1)/2, with strict inequality for n >= 5 (Golomb). - David W Wilson (davidwwilson(AT)comcast.net), Aug 18 2007 %e A003022 a(4)=11 because 0-1-4-9-11 (0-2-7-10-11) resp. 0-3-4-9-11 (0-2-7-8-11) are shortest: there is no b0-b1-b2-b3-b4 with different distances |bi-bj| and max. |bi-bj| < 11 %Y A003022 See A106683 for triangle of marks. %Y A003022 Cf. A008404, A036501, A039953, A078106, A030873. %Y A003022 0-1-4-9-11 corresponds to 1-3-5-2 in A039953: 0+1+3+5+2=11 %Y A003022 Sequence in context: A025735 A023601 A109413 this_sequence A025722 A022775 A025743 %Y A003022 Adjacent sequences: A003019 A003020 A003021 this_sequence A003023 A003024 A003025 %K A003022 nonn,hard,nice %O A003022 2,2 %A A003022 N. J. A. Sloane (njas(AT)research.att.com). %E A003022 425 sent by Ed Pegg, Jr., Nov 15 2004. Search completed in 0.002 seconds