Search: id:A108941
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%I A108941
%S A108941 16,81,392,2000,9800,50421,248832,1265625,6422000,32710656
%N A108941 Maximum number of spanning trees in a cubic graph on 2n vertices.
%C A108941 a(5) = 2000 is realized by Petersen graph, a(7) = 50421 is realized by 
               the Heawood graph
%e A108941 When n=2, the only cubic graph on 2n vertices is the complete graph K4 
               with 16 spanning trees.
%Y A108941 Cf. A020871.
%Y A108941 Sequence in context: A113317 A056118 A134606 this_sequence A153157 A113849 
               A046453
%Y A108941 Adjacent sequences: A108938 A108939 A108940 this_sequence A108942 A108943 
               A108944
%K A108941 nonn
%O A108941 2,1
%A A108941 Gordon Royle (gordon(AT)maths.uwa.edu.au), Jul 20 2005

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