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Difference between revisions of "Dirichlet's Theorem"

(Created page with "==Theorem== For any positive integers <math>a</math> and <math>m</math> such that <math>(a,m)=1</math>, there exists infinitely many prime <math>p</math> such that <math>p\equiv ...")
 
(Stronger Result)
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</cmath>
 
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where the sum is over all primes <math>p</math> less than <math>x</math> that are congruent to <math>a</math> mod <math>m</math>, and <math>\phi(x)</math> is the [[totient function]].
 
where the sum is over all primes <math>p</math> less than <math>x</math> that are congruent to <math>a</math> mod <math>m</math>, and <math>\phi(x)</math> is the [[totient function]].
 +
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==See Also==
 +
[[Category:Theorems]]

Revision as of 12:19, 30 May 2019

Theorem

For any positive integers $a$ and $m$ such that $(a,m)=1$, there exists infinitely many prime $p$ such that $p\equiv a\mod m$

Hence, for any arithmetic progression, unless it obviously contains finitely many primes (first term and common difference not coprime), it contains infinitely many primes.

Stronger Result

For any positive integers $a$ and $m$ such that $(a,m)=1$, \[\sum_{\substack{p\leq x\\ p\equiv a\mod m}}\frac{1}{p}=\frac{1}{\phi(m)}\log\log x+O(1)\] where the sum is over all primes $p$ less than $x$ that are congruent to $a$ mod $m$, and $\phi(x)$ is the totient function.

See Also

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