Tribonacci sequence

An extension of the sequence of Fibonacci numbers having the form (with $a$, $b$, $c$ given constants):

$$t_0=a,t_1=b,t_2=c,$$

$$t_{n+3}=t_{n+2}+t_{n+1}+t_n(n\geq0).$$

The concept was introduced by the fourteen-year-old student M. Feinberg in 1963 in [a1] for the case: $a=b=1$, $c=2$. The basic properties are introduced in [a5], [a3], [a4], [a2].

The Tribonacci sequence was generalized in [a6], [a7] to the form of two sequences:

$$a_{n+3}=u_{n+2}+w_{n+1}+y_n,$$

$$b_{n+3}=v_{n+2}+x_{n+1}+z_n,$$

where $u,v,w,x,y,z\in\{a,b\}$ and each of the tuples $(u,v)$, $(w,x)$, $(y,z)$ contains the two symbols $a$ and $b$. There are eight different such schemes. An open problem (as of 2000) is the construction of an explicit formula for each of them.

See also Tribonacci number.

References