Lehmer's totient problem over Fq[x]

Abstract

In this paper, we consider the function field analogue of the Lehmer's totient problem. Let p(x)∈Fq[x] and (q,p(x)) be the Euler's totient function of p(x) over Fq[x], where Fq is a finite field with q elements. We prove that (q,p(x))|(q deg(p(x))-1) if and only if (i) p(x) is irreducible; or (ii) q=3, \; p(x) is the product of any 2 non-associate irreducibes of degree 1; or (iii) q=2,\; p(x) is the product of all irreducibles of degree 1, all irreducibles of degree 1 and 2, and the product of any 3 irreducibles one each of degree 1, 2 and 3.