Variations of Lucas' Theorem Modulo Prime Powers

Abstract

Let p be a prime, and let k,n,m,n0 and m0 be nonnegative integers such that k 1, and 0 and m0 are both less than p. K. Davis and W. Webb established that for a prime p 5 the following variation of Lucas' Theorem modulo prime powers holds npk +n0 mpk+m0np(k-1)/3 mp(k-1)/3 n0 m0 pk. In the proof the authors used their earlier result that present a generalized version of Lucas' Theorem. In this paper we present a a simple inductive proof of the above congruence. Our proof is based on a classical congruence due to Jacobsthal, and we additionally use only some well known identities for binomial coefficients. Moreover, we prove that the assertion is also true for p=2 and p=3 if in the above congruence one replace (k-1)/3 by k/2, and by (k-1)/2, respectively. As an application, in terms of Lucas' type congruences, we obtain a new characterization of Wolstenholme primes.