Wikipedia:Reference desk/Archives/Mathematics/2013 May 30

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May 30

Generalized totient function

Is there such a thing as a generalized totient function? Specifically, a function φ_i(n) that is the count of positive integers less than n with exactly i prime divisors. This means that Euler's totient function φ(n) is φ₁(n) in the more general form (i.e., it is the number of positive integers less than n with only one prime divisor). Likewise, φ₂(n) is the number of positive composite integers less than n with only two prime divisors, e.g., numbers from the set {4,6,9,10,14,15,21,22,25,...,n}, which includes all the squares of primes. φ₃(n) includes {8,12,18,27,28,30,...,n}, and so forth. I dimly recall seeing something about Ramanujan studying something similar to this(?). Perhaps such a thing might also be related to the Riemann hypothesis? — Loadmaster (talk) 17:24, 30 May 2013 (UTC)[reply]

Do you mean prime counting function rather than totient function? Otherwise I'm very confused. Sławomir Biały (talk) 17:29, 30 May 2013 (UTC)[reply]

Yes, that's what I meant. So (replacing φ above with π): Is there such a thing as a generalized prime counting function? Specifically, a function π_i(n) that is the count of positive integers less than n with exactly i prime divisors. — Loadmaster (talk) 18:48, 30 May 2013 (UTC)[reply]

Yes, but these can be expressed in terms of the functions pi[n^(1/i)] using Mobius inversion. Count Iblis (talk) 19:54, 30 May 2013 (UTC)[reply]

Elliptic integrals and Gaussian integrals

With your help, I would like to find out a mathematical relationship between complete elliptic integrals of the first kind

${\displaystyle K(n)\ =\ \int _{0}^{\pi \over 2}{\frac {d\theta }{\sqrt {1-n^{2}\sin ^{2}\theta }}}\ =\ \int _{0}^{1}{\frac {dt}{\sqrt {(1-t^{2})(1-n^{2}t^{2})}}}}$ 

and gaussian integrals

${\displaystyle G(n)\ =\ \int _{0}^{\infty }{e^{-x^{n}}}dx}$ 

all of which are known to possess the following property

${\displaystyle {\frac {G(m)\cdot G(n)}{G({m\ \cdot \ n \over m\ +\ n})}}\ =\ \int _{0}^{1}{\sqrt[{m}]{1-x^{n}}}dx\ =\ \int _{0}^{1}{\sqrt[{n}]{1-x^{m}}}dx}$ 

where

${\displaystyle {\tfrac {m\ n}{m+n}}}$  is half of the harmonic mean between m and n, and the entire above expression is equal to the product between 1 + ${\displaystyle {\tfrac {1}{m}}}$  + ${\displaystyle {\tfrac {1}{n}}}$  and the beta function of arguments 1 + ${\displaystyle {\tfrac {1}{m}}}$  and 1 + ${\displaystyle {\tfrac {1}{n}}}$  .

It also goes on without saying that the factorial of every positive number is the gaussian integral of its reciprocal or multiplicative inverse

${\displaystyle n!\ =\ G({\tfrac {1}{n}})\ =\ \int _{0}^{\infty }{e^{-{\sqrt[{n}]{x}}}}dx}$ 

— 79.118.171.165 (talk) 18:33, 30 May 2013 (UTC)[reply]

  Resolved

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