%I #16 Sep 23 2019 09:42:52
%S 1,1,3,4,8,10,19,24
%N Number of pretzel (stellar or prismatic) knots and links.
%D Conway, J. (1970) An enumeration of knots and links and some of their related properties, in Computational Problems in Abstract Algebra, Proc. Conf. Oxford 1967 (Ed. J. Leech), 329-358, Pergamon Press, New York.
%H A. Caudron, <a href="http://sites.mathdoc.fr/PMO/PDF/C_CAUDRON_82_04.pdf">Classification des noeuds et des enlacements</a>, Public. Math. d'Orsay 82. Orsay: Univ. Paris Sud, Dept. Math., 1982.
%H Alain Caudron, <a href="/A002863/a002863_3.pdf">Classification des noeuds et des enlacements (Thèse et additifs)</a>, Univ. Paris-Sud, 1989 [Scanned copy, included with permission] Contains additional material.
%H S. V. Jablan, <a href="http://www.mi.sanu.ac.rs/vismath/sl/">Ordering Knots</a>
%H S. V. Jablan and Radmila Sazdanovic, <a href="http://www.mi.sanu.ac.rs/vismath/linknot/">LinKnot</a>
%e E.g. knots and links given in Conway notation as 2,2,2 for n=6, 3,2,2 for n=7, 2,2,2,2; 3,3,2; 4,2,2 for n=8, etc.
%K nonn,more
%O 6,3
%A Slavik Jablan and Radmila Sazdanovic, Jan 03 2004
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