Linear combinations of primitive elements of a finite field
arXiv:1711.06392 · doi:10.1016/j.ffa.2018.02.009
Abstract
We examine linear sums of primitive roots and their inverses in finite fields. In particular, we refine a result by Li and Han, and show that every $p> 13$ has a pair of primitive roots $a$ and $b$ such that $a+ b$ and $a^{-1} + b^{-1}$ are also primitive roots mod $p$.
19 pages; to appear in Finite Fields Appl