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Search: id:A066545
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| A066545 |
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Number of spanning trees in the line graph of the product of two complete graph, each of order n, L(K_n x K_n). |
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+0
2
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| 4, 782757789696, 391497025772177207236260602767731880976449536, 79571717825565862744861159703491334416072984127575634790474236302905519522005340\ 085288960000000000000000000000
(list; graph; listen)
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OFFSET
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2,1
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COMMENT
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a(2) = 2^2, a(3) = 2^30 * 3^6, a(4) = 2^99 * 3^31, a(5) = 2^314 * 5^22 - Gerald McGarvey (gerald.mcgarvey(AT)comcast.net), Oct 20 2007
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EXAMPLE
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NumberOfSpanningTrees(L(K_2 x K_2)) = 4
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MATHEMATICA
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NumberOfSpanningTrees[LineGraph[GraphProduct[CompleteGraph[n], CompleteGraph[n]]]] (* First load package DiscreteMath`Combinatorica` *)
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CROSSREFS
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Sequence in context: A034250 A058436 A067501 this_sequence A161405 A147876 A164796
Adjacent sequences: A066542 A066543 A066544 this_sequence A066546 A066547 A066548
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KEYWORD
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hard,nonn
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AUTHOR
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Roberto E. Martinez II (remartin(AT)fas.harvard.edu), Jan 07 2002
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EXTENSIONS
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Edited by Dean Hickerson (dean.hickerson(AT)yahoo.com), Jan 14, 2002
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