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A015477
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q-Fibonacci numbers for q=6.
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15
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0, 1, 6, 217, 46878, 60754105, 472423967358, 22041412681808953, 6170184900967295034366, 10363541282645125629123492409, 104440618529953822157016270251244030, 6315124821581059445960128077000914860421689
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OFFSET
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0,3
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LINKS
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FORMULA
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a(n) = 6^(n-1)*a(n-1) + a(n-2).
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MAPLE
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q:=6; seq(add((product((1-q^(2*(n-j-1-k)))/(1-q^(2*k+2)), k=0..j-1))* q^binomial(n-2*j, 2), j = 0..floor((n-1)/2)), n = 0..20); # G. C. Greubel, Dec 17 2019
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MATHEMATICA
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RecurrenceTable[{a[0]==0, a[1]==1, a[n]==a[n-1]*6^(n-1) + a[n-2]}, a, {n, 20}] (* Vincenzo Librandi, Nov 09 2012 *)
F[n_, q_]:= Sum[QBinomial[n-j-1, j, q^2]*q^Binomial[n-2*j, 2], {j, 0, Floor[(n-1)/2]}]; Table[F[n, 6], {n, 0, 20}] (* G. C. Greubel, Dec 17 2019 *)
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PROG
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(PARI) q=6; m=20; v=concat([0, 1], vector(m-2)); for(n=3, m, v[n]=q^(n-2)*v[n-1]+v[n-2]); v \\ G. C. Greubel, Dec 17 2019
(Magma) q:=6; I:=[0, 1]; [n le 2 select I[n] else q^(n-2)*Self(n-1) + Self(n-2): n in [1..20]]; // G. C. Greubel, Dec 17 2019
(Sage)
def F(n, q): return sum( q_binomial(n-j-1, j, q^2)*q^binomial(n-2*j, 2) for j in (0..floor((n-1)/2)))
(GAP) q:=6;; a:=[0, 1];; for n in [3..20] do a[n]:=q^(n-2)*a[n-1]+a[n-2]; od; a; # G. C. Greubel, Dec 17 2019
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CROSSREFS
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q-Fibonacci numbers: A000045 (q=1), A015473 (q=2), A015474 (q=3), A015475 (q=4), A015476 (q=5), this sequence (q=6), A015479 (q=7), A015480 (q=8), A015481 (q=9), A015482 (q=10), A015484 (q=11), A015485 (q=12).
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KEYWORD
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nonn,easy
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AUTHOR
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STATUS
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approved
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