Originally Posted by carpetpool
Recall the two types of divisibility sequences which are primarily involved in Lucas Sequences:
For U(n), if r divides s, then U(r) divides U(s).
For V(n), if r divides s, and r/s is odd, then V(r) divides V(s).
Most divisibility sequences terms U(n) and V(n), if not all, are generated by a recurrence relation of order n, meaning the first n terms (denoted [a1,a2,...an] of the sequence are given, and the rest of the terms depend on the past n previous terms.
The question is, for any recurrence relation of order n, are there finitely or infinitely many starting values or initial terms [a1,a2,...an] such that a(n) has the divisibility properties as U(n)? The same question can be asked about V(n).
For example, consider the recurrence relation
a(n)=a(n1)+a(n2) with starting values a(1) and a(2). Are there infinitely many pairs of numbers {a(1), a(2)} such that a(n) is a U(n) divisibility sequence, and there is also a corresponding V(n) sequence?
The only values I am aware which make this true is {1, 1} and {1, 3}
If a(1) = 1, and a(2) = 1, then a(n) is a divisibility sequence such that if r divides s, then a(r) divides a(s) (The U(n) sequence). These are the Fibonacci Numbers. The corresponding V(n) sequence has starting values a(1) = 1, and a(2) = 3.
Are there any more (two) sets values a(1) and a(2) which form divisibility sequences of the first kind, U(n), and the second kind V(n), with a(n)=a(n1)+a(n2) for n > 2? Consider this problem for all fixed recurrence relations of any order.
The same idea goes with a(n)=a(n1)+a(n2)+a(n3), for instance, except given the first three starting values a(1), a(2) and a(3).
j
Any help, comments, suggestions appreciated. Thank you.
