Remarques sur une somme li\'ee \`a la fonction de M\"obius
Abstract
For integer n≥slant 1 and real number z≥slant 1, define M(n,z):=Σd|n,\,d≤slant zμ(d) where μ denotes the M\"obius function. Put L(y):=\( y)3/5/(2y)1/5\ (y≥slant 3). We show that, for a suitable, explicit, constant L>0 and some absolute c>0, we have S(x,z)= Lx+O(x/ L(3)c) uniformly for x≥slant 1, ≤slant z≤slant x/.
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