Large values of L(1,) for k-th order characters and applications to character sums

Abstract

For any given integer k≥ 2 we prove the existence of infinitely many q and characters q of order k, such that |L(1,)|≥ (eγ+o(1)) q. We believe this bound to be best possible. When the order k is even, we obtain similar results for L(1,) and L(1,) where is restricted to even (or odd) characters of order k, and is a fixed quadratic character. As an application of these results, we exhibit large even order character sums, which are likely to be optimal.