M\"obius cancellation on polynomial sequences and the quadratic Bateman-Horn conjecture over function fields
Abstract
We establish cancellation in short sums of certain special trace functions over Fq[u] below the P\'olya-Vinogradov range, with savings approaching square-root cancellation as q grows. This is used to resolve the Fq[u]-analog of Chowla's conjecture on cancellation in M\"obius sums over polynomial sequences, and of the Bateman-Horn conjecture in degree 2, for some values of q. A final application is to sums of trace functions over primes in Fq[u].
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