Th\'eor\`eme d'Erdos-Kac dans un r\'egime de grande d\'eviation pour les translat\'es d'entiers ayant k facteurs premiers

Abstract

Let x≥slant 3, for 1≤slant n ≤slant x an integer, let ω(n) be its number of distinct prime factors. We show that, among the values n≤slant x with ω(n)=k where 1≤slant k 2 x, ω(n-1) satisfies an Erdos-Kac type theorem around 22 x, so in large deviation regime, when weighted by 2ω(n-1). This sharpens a result of Gorodetsky and Grimmelt with a quantitative and quasi-optimal error term. The proof of the main theorem is based on the characteristic function method and uses recent progress on Titchmarsh's divisor problem.

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