Exponential sums with automatic sequences
Abstract
We show that automatic sequences are asymptotically orthogonal to periodic exponentials of type eq(f(n)), where f is a rational fraction, in the P\'olya-Vinogradov range. This applies to Kloosterman sums, and may be used to study solubility of congruence equations over automatic sequences. We obtain this as consequence of a general result, stating that sums over automatic sequences can be bounded effectively in terms of two-point correlation sums over intervals.
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