A340474 - OEIS

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A340474

a(n) = n! [x^n] LW(T(x)), where T(x) = -W(-x) Euler's tree function, W(x) is the Lambert W function, and LW(x) = W(-W(x))/(-W(x)) (A340473).

1

1, 1, 3, 22, 209, 2756, 43717, 839686, 18581425, 470707192, 13352676101, 420875581754, 14566375690297, 549877190829604, 22472783629465093, 989043215802778966, 46631075599107558113, 2345376059569552767344, 125350843842721213505029, 7095169059445749303612946

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OFFSET

0,3

LINKS

Table of n, a(n) for n=0..19.

MAPLE

W := x -> LambertW(x): T := x -> -W(-x): LW := x -> W(-W(x))/(-W(x)):

ser := series(LW(T(x)), x, 24): seq(n!*coeff(ser, x, n), n=0..19);

CROSSREFS

Cf. A340473, A097174, A177885, A207833, A227176.

Cf. A000169, A000272.

Sequence in context: A330668 A001409 A260154 * A079489 A190526 A141152

Adjacent sequences: A340471 A340472 A340473 * A340475 A340476 A340477

KEYWORD

nonn

AUTHOR

Peter Luschny, Jan 09 2021

STATUS

approved