The Q-Korselt Set of pq

Abstract

Let N be a positive integer, A be a nonempty subset of Q and α=α1α2∈ A \0,N\. α is called an N-Korselt base (equivalently N is said an α-Korselt number) if α2p-α1 is a divisor of α2N-α1 for every prime p dividing N. The set of all Korselt bases of N in A is called the A-Korselt set of N and is simply denoted by A-KS(N). Let p and q be two distinct prime numbers. In this paper, we study the Q-Korselt bases of pq, where we give in detail how to provide Q-KS(pq). Consequently, we finish the incomplete characterization of the Korselt set of pq over Z given in [4], by supplying the set Z-KS(pq) when q <2p.