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A074029
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Number of binary Lyndon words of length n with trace 1 and subtrace 0 over Z_2.
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7
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1, 1, 1, 1, 1, 2, 4, 8, 15, 27, 48, 85, 155, 288, 541, 1024, 1935, 3654, 6912, 13107, 24940, 47616, 91136, 174760, 335626, 645435, 1242904, 2396745, 4627915, 8947294, 17317888, 33554432, 65076240, 126324495, 245428574, 477218560, 928638035, 1808400384, 3524068955
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OFFSET
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1,6
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COMMENTS
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Same as the number of binary Lyndon words of length n with trace 1 and subtrace 0 over GF(2).
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LINKS
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Table of n, a(n) for n=1..39.
Max Alekseyev, PARI/GP scripts for miscellaneous math problems
F. Ruskey, Binary Lyndon words with given trace and subtrace
F. Ruskey, Binary Lyndon words with given trace and subtrace over GF(2)
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FORMULA
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a(2n) = A042982(2n), a(2n+1) = A049281(2n+1). This follows from Cattell et al. (see A042979), Main Theorem on p. 33 and Theorem 4 on p. 44.
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EXAMPLE
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a(3;1,0)=1 since the one binary Lyndon word of trace 1, subtrace 0 and length 3 is ( 001 }.
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CROSSREFS
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Cf. A074027, A074028, A074030.
Sequence in context: A143281 A098057 A289692 * A248729 A138653 A284275
Adjacent sequences: A074026 A074027 A074028 * A074030 A074031 A074032
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KEYWORD
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easy,nonn
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AUTHOR
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Frank Ruskey and Nate Kube, Aug 21 2002
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EXTENSIONS
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Terms a(33) onward from Max Alekseyev, Apr 09 2013
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STATUS
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approved
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