The Sums of the k-powers of the Euler set and their connection with Artin's conjecture for primitive roots
Abstract
We examine the sums S(k,\,n) of the k-th powers of the φ(n) integers α1<α2<·s<αφ(n) less than and prime to n (Euler set) and prove a formula (new) for S(3,\,n). If n equals a prime p, we prove a theorem showing a connection of S(3,\,p) with Artin's conjectural constant for primitive roots and with other functions involving primes.
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