Prime-Residue-Class of Uniform Charges on the Integers
Abstract
There is a probability charge on the power set of the integers that gives probability 1/p to every residue class modulo a prime p. There exists such a charge that gives probability w to the set of prime numbers iff w ∈ [0,1/2]. Similarly, there is such a charge that gives probability x to a residue class modulo c, where c is composite, iff x ∈ [0,1/y], where y is the largest prime factor of c.
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