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Schoenheim bound L_1(n,5,4).

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1, 5, 9, 18, 26, 50, 66, 113, 149, 219, 273, 397, 476, 659, 787, 1028, 1197, 1549, 1771, 2237, 2550, 3120, 3510, 4273, 4751, 5700, 6324, 7444, 8184, 9595, 10472, 12161, 13254, 15185, 16451, 18800, 20254, 22991, 24743, 27817, 29799, 33433 (list; graph; listen)

	OFFSET	`5,2`
	REFERENCES	`W. H. Mills and R. C. Mullin, Coverings and packings, pp. 371-399 of J. H. Dinitz and D. R. Stinson, editors,a Contemporary Design Theory, Wiley, 1992. See Eq. 1.`
	LINKS	`Index entries for covering numbers`
	MAPLE	`L := proc(v, k, t, l) local i, t1; t1 := l; for i from v-t+1 to v do t1 := ceil(t1*i/(i-(v-k))); od: t1; end; # gives Schoenheim bound L_l(v, k, t). Current sequence is L_1(n, 5, 4, 1).`
	CROSSREFS	`Lower bound to A011983.` `A column of A036838.` `Sequence in context: A146067 A061502 A110349 this_sequence A116453 A046578 A046590` `Adjacent sequences: A036829 A036830 A036831 this_sequence A036833 A036834 A036835`
	KEYWORD	`nonn`
	AUTHOR	`N. J. A. Sloane (njas(AT)research.att.com), Jan 11 2002`

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Last modified November 29 12:46 EST 2009. Contains 167659 sequences.

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