A319971 - cp's OEIS frontend

11, 35, 55, 79, 92, 116, 136, 160, 184, 204, 228, 241, 265, 285, 309, 329, 353, 366, 390, 410, 434, 458, 478, 502, 515, 539, 559, 583, 596, 620, 640, 664, 688, 708, 732, 745, 769, 789, 813, 833, 857, 870, 894, 914, 938, 962, 982, 1006, 1019, 1043, 1063, 1087

Offset: 1

N. J. A. Sloane, Oct 05 2018

nonn

By analogy with the Wythoff compound sequences A003622 etc., the nine compounds of A003144, A003145, A003146 might be called the tribonacci compound sequences. They are A278040, A278041, and A319966-A319972.

This sequence gives the positions of the word cabab in the tribonacci word t = abacabaa..., fixed point of the morphism a->ab, b->ac, c->a. This follows from the fact that the word bab is always preceded in t by the word ca, and the formula CB = BC-2, where A := A003144, B := A003145, C := A003146. See A319969 for BC, the positional sequence of the word bab. - Michel Dekking, Apr 09 2019

Rémy Sigrist, Table of n, a(n) for n = 1..10000
Elena Barcucci, Luc Belanger and Srecko Brlek, On tribonacci sequences, Fib. Q., 42 (2004), 314-320. Compare page 318.
L. Carlitz, R. Scoville and V. E. Hoggatt, Jr., Fibonacci representations of higher order, Fib. Quart., 10 (1972), 43-69, Theorem 13.

Cf. A003144, A003145, A003146, A003622, A278039, A278040, A278041, and A319966-A319972.

a(n) = A003146(A003145(n)).

a(n) = 3*A003144(n) + 4*A003145(n) + 2*(n-1) = 4*A278040(n-1) + 3*A278039(A27n-1) + 2*n + 5, n >= 1. For a proof see the W. Lang link in A278040, Proposition 9, eq. (54). Wolfdieter Lang, Apr 11 2019

More terms from Rémy Sigrist, Oct 16 2018

cp's OEIS Frontend

A319971 a(n) = A003146(A003145(n)).

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