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Search: id:A069764
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| A069764 |
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Frobenius number of the numerical semigroup generated by consecutive octahedral numbers. |
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+0
9
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| 89, 773, 3611, 12179, 33349, 78889, 167383, 326471, 595409, 1027949, 1695539, 2690843, 4131581, 6164689, 8970799, 12769039, 17822153, 24441941, 32995019, 43908899, 57678389
(list; graph; listen)
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OFFSET
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2,1
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COMMENT
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The Frobenius number of a numerical semigroup generated by relatively prime integers a_1,...,a_n is the largest positive integer that is not a nonnegative linear combination of a_1,...,a_n. Since consecutive octahedral numbers are relatively prime, they generate a numerical semigroup with a Frobenius number. The Frobenius number of a 2-generated semigroup <a,b> has the formula ab-a-b.
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REFERENCES
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R. Froberg, C. Gottlieb and R. Haggkvist, "On numerical semigroups", Semigroup Forum, 35 (1987), 63-83 (for definition of Frobenius number).
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FORMULA
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a(n)=((1/3)n(2n^2+1)-1)((1/3)(n+1)(2(n+1)^2+1)-1)-1
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EXAMPLE
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a(2)=89 because 89 is not a nonnegative linear combination of 6 and 19 (the second and third octahedral numbers), but all integers greater than 89 are.
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CROSSREFS
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Cf. A005900, A037165, A059769, A069755-A069763.
Sequence in context: A136646 A142566 A063654 this_sequence A053580 A103548 A097155
Adjacent sequences: A069761 A069762 A069763 this_sequence A069765 A069766 A069767
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KEYWORD
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nonn
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AUTHOR
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Victoria A Sapko (vsapko(AT)canes.gsw.edu), Apr 18 2002
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