Distribution of values of general Euler totient function
Abstract
Let k(n)=|\ (x1, x2, ·s, xk)∈ (Z/nZ)k; \ (x12+x22+ ·s+ xk2, n)=1\| be a general totient function introduced first by Cald\'eron et. al. Motivated by the classical works of Schoenberg, Erdos, Bateman and Diamond on the distribution of 1(n), we prove results on the joint distribution of k(n) for any k 1. Additionally, we also exhibit the extremal order of k(n).
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