On the Smarandache Lucas base and related counting function

for n ~ 0, Lo = 2, L1 = 1, Fo = 0 and FI = 1. These sequences playa very important role in the studies of the theory and application of mathematics. Therefore, the various properties of Ln and Fn were investigated by many authors. For example, R. L. Duncan [1] and L. Kuipers [2J proved that (logFn) is uniformly distributed mod 1. H.London and R.Finkelstein [3] studied the Fibonacci and Lucas numbers which are perfect powers. The author [4] obtained some identities involving the Fibonacci numbers. In this paper, we introduce a new counting function a(m) related to the Lucas numbers, then use elementary methods to give an exact calculating formula for its mean value. First we consider the Smarandache's generalized base, Professor F.Smarandach defined over the set of natural numbers the following infinite generalized base: 1 = go < gl < ... < gk < .... He proved that every positive integer N may be uniquely written in the Smarandache Generalized Ba..c;e a.s: