The terms in Lucas sequences divisible by their indices

Abstract

For Lucas sequences of the first kind (un) and second kind (vn) defined as usual for positive n by un=(an-bn)/(a-b), vn=an+bn, where a and b are either integers or conjugate quadratic integers, we describe the set of indices n for which n divides un and also the set of indices n for which n divides vn. Building on earlier work, particularly that of Somer, we show that the numbers in these sets can be written as a product of a so-called basic number, which can only be 1, 6 or 12, and particular primes, which are described explicitly. Some properties of the set of all primes that arise in this way is also given, for each kind of sequence.