A primality criterion based on a Lucas' congruence

Abstract

Let p be a prime. In 1878 \'E. Lucas proved that the congruence p-1 k (-1)kp holds for any nonnegative integer k∈\0,1,…,p-1\. The converse statement was given in Problem 1494 of Mathematics Magazine proposed in 1997 by E. Deutsch and I.M. Gessel. In this note we generalize this converse assertion by the following result: If n>1 and q>1 are integers such that n-1 k (-1)k q for every integer k∈\0,1,…, n-1\, then q is a prime and n is a power of q.