Explicit Burgess inequalities for cubefree moduli
Abstract
Burgess proved that for q a primitive Dirichlet character modulo q with q cubefree, |ΣM< n M+Nq(n)| N1-1rqr+14r2+ε for all integers r1. More recently, explicit versions with prime moduli q were computed by Booker, McGown, Trevi\~no, and Francis, with applications to finding the least k-th power residue, and bounding the size of Dirichlet L-functions just to name a few. Jain-Sharma, Khale, and Liu proved an explicit estimate for r=2. We improve their explicit constant for r = 2 and compute an explicit Burgess bound for cubefree q for r 3.
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