On a special congruence of Carlitz
Abstract
We prove that if q is a power of a prime p and pk divides a, with k 0, then \[ 1+(q-1)Σ0 b(q-1)<a ab(q-1) 0pk+1. \] The special case of this congruence where q=p was proved by Carlitz in 1953 by means of rather deep properties of the Bernoulli numbers. A more direct approach produces our generalization and several related results.
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