The Proof of a Conjecture Related to Divisibility Properties of z ( n )

The order of appearance of n (in the Fibonacci sequence) z ( n ) is defined as the smallest positive integer k for which n divides the k —the Fibonacci number F k . Very recently, Trojovský proved that z ( n ) is an even number for almost all positive integers n (in the natural density sense). Moreover, he conjectured that the same is valid for the set of integers n ≥ 1 for which the integer 4 divides z ( n ) . In this paper, among other things, we prove that for any k ≥ 1 , the number z ( n ) is divisible by 2 k for almost all positive integers n (in particular, we confirm Trojovský’s conjecture).