Distribution of mixed character sums and extremal problems for Littlewood polynomials
Abstract
We prove distributional results for mixed character sums equation* Σn x (n)e(nθ), equation* for fixed θ∈ [0,1] and random character q, as well as for a fixed character and randomly sampled θ∈ [0,1]. We present various applications of our results. For example, we construct Littlewood polynomials with large Mahler measure and L1 norm, thus establishing new records in the Mahler and Newman problems. We also show that L2k norms of well-known Turyn polynomials are asymptotically minimized at the shift α=1/4, proving a conjecture of G\"unther and Schmidt. An important ingredient in our work is a general way of dealing with "log-integrability" problems.
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