Primitive Roots In Short Intervals
Abstract
Let p≥ 2 be a large prime, and let N ( p)1+. This note proves the existence of primitive roots in the short interval [M,M+N], where M ≥ 2 is a fixed number, and >0 is a small number. In particular, the least primitive root g(p)= O (( p)1+ ), and the least prime primitive root g*(p)= O (( p)1+ ) unconditionally.
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