Algebraic analogues of results of Alladi-Johnson using the Chebotarev Density Theorem
Abstract
We aim to get an algebraic generalization of Alladi-Johnson's (A-J) work on Duality between Prime Factors and the Prime Number Theorem for Arithmetic Progressions - II, using the Chebotarev Density Theorem (CDT). It has been proved by A-J, that for all positive integers k, such that 1≤ ≤ k and (,k)=1, equation Σn≥ 2;\;p1(n) \;(mod\;k)μ(n)ω(n)n = 0, equation where μ(n) is the M\"obius function, ω(n) is the number of distinct prime factors of n, and p1(n) is the smallest prime factor of n. In our work here, we will prove the following result: If C is a conjugacy class of the Galois group of some finite extension K of Q, then equation Σ n ≥ 2;\;[K/Qp1(n)]=C μ(n)ω(n)n = 0. equation where [K/Qp1(n)] is the Artin symbol. When K is a cyclotomic extension of Q, this reduces to the exact case of A-J's result.
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