Search: id:A002336
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%I A002336
%S A002336 0,2,6,12,24,40,72,126,240,272,336,438,648,906,1422,2340,4320,5346,
%T A002336 7398,10668,17400,27720,49896,93150,196560,196656
%N A002336 Maximal kissing number of n-dimensional laminated lattice.
%D A002336 J. H. Conway and N. J. A. Sloane, "Sphere Packings, Lattices and Groups", 
               Springer-Verlag, p. 174.
%D A002336 C. Muses, The dimensional family approach in (hyper)sphere packing..., 
               Applied Math. Computation 88 (1997), pp. 1-26.
%H A002336 G. Nebe and N. J. A. Sloane, <a href="http://www.research.att.com/~njas/
               lattices/kiss.html">Table of highest kissing numbers known</a>
%Y A002336 Sequence in context: A067718 A028923 A001116 this_sequence A030625 A029929 
               A053635
%Y A002336 Adjacent sequences: A002333 A002334 A002335 this_sequence A002337 A002338 
               A002339
%K A002336 nonn,nice
%O A002336 0,2
%A A002336 N. J. A. Sloane (njas(AT)research.att.com) and J. H. Conway (conway(AT)math.princeton.edu)
%E A002336 In dimensions 25-32 the highest kissing numbers presently known for laminated 
               lattices are 196848, 197142, 197736, 198506, 200046, 202692, 208320.

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