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Search: id:A094866
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| A094866 |
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Number of truncated ST-pairs O(q^N). |
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+0
1
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| 1, 2, 4, 6, 11, 15, 26, 41, 67, 96, 138, 197, 300, 431, 636, 893, 1258, 1723, 2447, 3425, 4962, 6839, 10000, 13989, 21383, 30781, 48292, 70456, 110214, 159686, 253265, 374385, 591648, 876405, 1354888
(list; graph; listen)
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OFFSET
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3,2
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COMMENT
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Definition not clear to me. What is n-th term as a function of n? - N. J. A. Sloane (njas(AT)research.att.com), Jun 16 2004
From Garvan (pg. 79): "It appears that t(n) grows exponentially. We do not have enough data to make a real conjecture."
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REFERENCES
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F. G. Garvan, Shifted and Shiftless Partition Identities, in Number Theory for the Millennium II (M. A. Bennett et al., eds.), AK Peters, Ltd. 2002, pp. 75-92.
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CROSSREFS
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Sequence in context: A156913 A138461 A103580 this_sequence A072951 A062766 A115269
Adjacent sequences: A094863 A094864 A094865 this_sequence A094867 A094868 A094869
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KEYWORD
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nonn,uned,obsc
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AUTHOR
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Barry Cipra (bcipra(AT)rconnect.com), Jun 15 2004
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