On sumsets involving $k$th power residues

Abstract

In this paper, we study some topics concerning the additive decompostions of the set $D_k$ of all $k$th power residues modulo a prime $p$. For example, we prove that $$\lim_{x\rightarrow+\infty}\frac{B(x)}{\pi(x)}=0,$$ where $\pi(x)$ is the number of primes $\le x$ and $B(x)$ denotes the cardinality of the set $$\{p\le x: p\equiv1\pmod k; D_k\ \text{has a non-trivial 2-additive decomposition}\}.$