New estimates for exponential sums over multiplicative subgroups and intervals in prime fields

Abstract: Let ${\mathcal H}$ be a multiplicative subgroup of $\mathbb{F}p^*$ of order $H>p^{1/4}$. We show that $$ \max{(a,p)=1}\left|\sum_{x\in {\mathcal H}} {\mathbf{\,e}}_p(ax)\right| \le H^{1-31/2880+o(1)}, $$ where ${\mathbf{\,e}}_p(z) = \exp(2 \pi i z/p)$, which improves a result of Bourgain and Garaev (2009). We also obtain new estimates for double exponential sums with product $nx$ with $x \in {\mathcal H}$ and $n \in {\mathcal N}$ for a short interval ${\mathcal N}$ of consecutive integers.