On some congruences and exponential sums

Let $\epsilon >0$ be a fixed small constant, $F_p$ be the finite field of p elements for prime p. We consider additive and multiplicative problems in $F_p$ that involve intervals and arbitrary sets. Representative examples of our results are as follows. Let $M$ be an arbitrary subset of $F_p$. If $\#M>p^{1/3+\epsilon }$ and $H⩾p^{2/3}$ or if $\#M>p^{3/5+\epsilon }$ and $H⩾p^{3/5+\epsilon }$ then all, but $O\left(p^{1-\delta }\right)$ elements of $F_p$ can be represented in the form hm with $h\in [1,H]$ and $m\in M$, where $\delta >0$ depends only on ε. Furthermore, let $X$ be an arbitrary interval of length H and s be a fixed positive integer. If$H>p^{17/35+\epsilon },\#M>p^{17/35+\epsilon },$ then the number $T_6\left(\lambda \right)$ of solutions to the congruence$\frac{m_1}{x_1^s}+\frac{m_2}{x_2^s}+\frac{m_3}{x_3^s}+\frac{m_4}{x_4^s}+\frac{m_5}{x_5^s}+\frac{m_6}{x_6^s}\equiv \lambda \mathrm{mod}p,m_i\in M,x_i\in X,i=1,\dots ,6,$ satisfies$T_6\left(\lambda \right)=\frac{H^6{\left(\#M\right)}^6}{p}(1+O(p^{-\delta }\left)\right).$