Large odd order character sums and improvements of the P\'olya-Vinogradov inequality

Abstract

For a primitive Dirichlet character modulo q, we define M()=t |Σn ≤ t (n)|. In this paper, we study this quantity for characters of a fixed odd order g≥ 3. Our main result provides a further improvement of the classical P\'olya-Vinogradov inequality in this case. More specifically, we show that for any such character we have M() q( q)1-δg( q)-1/4+, where δg := 1-gπ(π/g). This improves upon the works of Granville and Soundararajan and of Goldmakher. Furthermore, assuming the Generalized Riemann hypothesis (GRH) we prove that M() q (2 q)1-δg (3 q)-14(4 q)O(1), where j is the j-th iterated logarithm. We also show unconditionally that this bound is best possible (up to a power of 4 q). One of the key ingredients in the proof of the upper bounds is a new Hal\'asz-type inequality for logarithmic mean values of completely multiplicative functions, which might be of independent interest.