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Search: id:A030179
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| 0, 0, 1, 4, 16, 36, 81, 144, 256, 400, 625, 900, 1296, 1764, 2401, 3136, 4096, 5184, 6561, 8100, 10000, 12100, 14641, 17424, 20736, 24336, 28561, 33124, 38416, 44100, 50625, 57600, 65536, 73984, 83521, 93636, 104976, 116964
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OFFSET
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0,4
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COMMENT
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Conjectured to be crossing number of complete bipartite graph K_{n,n}. Known to be true for n <= 7.
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REFERENCES
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C. Thomassen, Embeddings and minors, pp. 301-349 of R. L. Graham et al., eds., Handbook of Combinatorics, MIT Press.
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LINKS
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G. Xiao, Contfrac
E. Weisstein, Zarankiewicz's Conjecture.html
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FORMULA
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Floor(n^2/4)^2.
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CROSSREFS
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C. A000241, A002620, A014540.
Sequence in context: A121317 A063755 A085040 this_sequence A005722 A075408 A114268
Adjacent sequences: A030176 A030177 A030178 this_sequence A030180 A030181 A030182
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KEYWORD
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nonn
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AUTHOR
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njas, Jan 10 2002
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