This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
%I A104310 #16 Feb 24 2021 09:08:27 %S A104310 2,7,18,25,32,59,71,81,103,135 %N A104310 Maximum length of perfect rulers that can be made from segments not exceeding n. %C A104310 We conjecture the extension a(8)=81. For nomenclature related to perfect and optimal rulers see Peter Luschny's "Perfect Rulers" web pages. %H A104310 Peter Luschny, <a href="http://www.luschny.de/math/rulers/introe.html">Perfect and Optimal Rulers.</a> A short introduction. %H A104310 Hugo Pfoertner, <a href="http://www.randomwalk.de/scimath/diffset/consdifs.txt">Largest and smallest maximum differences of consecutive marks of perfect rulers.</a> %H A104310 F. Schwartau, Y. Schröder, L. Wolf and J. Schoebel, <a href="https://dx.doi.org/10.21227/cd4b-nb07">MRLA search results and source code</a>, Nov 6 2020. %H A104310 F. Schwartau, Y. Schröder, L. Wolf and J. Schoebel, <a href="https://doi.org/10.1109/OJAP.2020.3043541">Large Minimum Redundancy Linear Arrays: Systematic Search of Perfect and Optimal Rulers Exploiting Parallel Processing</a>, IEEE Open Journal of Antennas and Propagation, 2 (2021), 79-85. %H A104310 <a href="/index/Per#perul">Index entries for sequences related to perfect rulers.</a> %e A104310 The complete list of these rulers starts: %e A104310 n.a(n)..rulers %e A104310 1..2....[0,1,2] %e A104310 2..7....[0,1,3,5,7] %e A104310 3.18....[0,1,4,7,10,13,16] %e A104310 4.25....[0,1,2,6,10,13,17,21,25] %e A104310 ........[0,1,2,6,10,14,17,21,25] %e A104310 ........[0,1,2,6,10,14,18,21,25] %e A104310 ........[0,1,3,7,11,15,19,23,25] %e A104310 5.37....[0,1,2,3,8,13,18,23,28,33,37] %e A104310 6.59....[0,1,4,10,16,22,28,34,40,46,52,54,57,59] %Y A104310 Cf. A104307 Least maximum of differences between consecutive marks, A104309 minimum length of perfect rulers containing a segment of length n, A103294 definitions related to complete rulers. %K A104310 hard,more,nonn %O A104310 1,1 %A A104310 _Hugo Pfoertner_, Mar 01 2005 %E A104310 Conjectured a(8) proven via exhaustive search and a(9) ... a(10) added by Fabian Schwartau, _Yannic Schröder_, Lars Wolf, Joerg Schoebel, Feb 23 2021