Diophantine approximation of polynomials over Fq[t] satisfying a divisibility condition
Abstract
Let Fq[t] denote the ring of polynomials over Fq, the finite field of q elements. We prove an estimate for fractional parts of polynomials over Fq[t] satisfying a certain divisibility condition analogous to that of intersective polynomials in the case of integers. We then extend our result to consider linear combinations of such polynomials as well.
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