On the density of Sylow numbers
Abstract
Let p be a prime number. We say that a positive integer n is a Sylow p-number if there exists a finite group having exactly n Sylow p-subgroups. When p=2, every odd integer is a Sylow 2-number. In contrast, when p is odd, there exist two positive constants cp and cp such that, denoting by β(p,x) the number of Sylow p-numbers less than or equal to x, \[cp\,x( x)1p-1-1 ≤ β(p,x)≤ cp\,x( x)1p-1-1. \] Moreover if βs(p,x) is the number of positive integers n x such that n is the Sylow p-number of some finite solvable group then βs(p,x) cp\,x( x)\,1p-1-1 x∞. In particular, when p is odd, the natural density of Sylow p-numbers is 0.
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