Let $d$ be a nonnegative integer, and let the sequence ${F_d(n)}$ be defined as follows:
$F_d(n) = 1$ for $n = 0, 1, \ldots, d$
$F_d(n) = F_d(n-1) + F_d(n-1-d)$ for $n>d$
For $d=0$ the sequence becomes:
$F_0(n) = F_0(n-1) + F_0(n-1)$ for $n>0$ and $F_0(0)=1$,
so it is a sequence of powers of $2$.
For $d=1$ the sequence becomes:
$F_1(n) = F_1(n-1) + F_1(n-2)$ for $n>1$ and $F_1(0) = F_1(1) = 1$,
so it is a Fibonacci sequence.
For $d=2$ the sequence is known as Narayana's cows sequence.
The sequence looks quite interesting to me, but for now I'm particularly interested in how fast it grows. To be more specific, I want to be able to calculate the number of digits of $F_d(n)$ for arbitrary $d$ and $n$ ($n$ can be very big). I can do it for $d=0$ and $d=1$, since I know the closed formula for $F_d(n)$ in those cases. But what about arbitrary $d$?
