The Normal Distribution of ω(φ(m)) in Function Fields

The Normal Distribution of ω(φ(m)) in Function Fields

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Let ω(m) be the number of distinct prime factors of m. A celebrated theorem of Erdös-Kac states that the quantity (ω(m)-loglog m)/√(loglog m) distributes normally. Let φ(m) be Euler's φ-function. Erdös and Pomerance proved that the quantity(ω(φ(m)-(1/2)(loglog m)^2)\((1/√(3)(loglog m)^(3/2))...

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Bibliographic Details
Main Author: Li, Li
Language:en
Published: 2008
Subjects:
Number Theory
Pure Mathematics
Online Access:http://hdl.handle.net/10012/3567
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