Abstract

Let A, B, C, ... denote polynomials over the finite field GF(q). It is shown that the sequence {Bi} is uniformly distributed modulo M if the sequence {Bi+k - Bi} is uniformly distributed modulo M for all integers k>0. A similar result holds for sequences defined by functional values. Also, a result of Weyl concerning uniform distribution modulo 1 is extended to polynomials over finite fields.

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