Difference between revisions of "Jordan totient function"
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==References== | ==References== | ||
− | * Dickson, L.E. History of the Theory of Numbers I, Chelsea (1971) p. 147, | + | * Dickson, L.E. History of the Theory of Numbers I, Chelsea (1971) p. 147, {{ISBN|0-8284-0086-5}} |
− | * Ram Murty, M. Problems in Analytic Number Theory, ser. Graduate Texts in Mathematics '''206''' Springer-Verlag (2001) p. 11 | + | * Ram Murty, M. Problems in Analytic Number Theory, ser. Graduate Texts in Mathematics '''206''' Springer-Verlag (2001) p. 11. {{ISBN|0387951431}} {{ZBL|0971.11001}} |
− | * Sándor, Jozsef; Crstici, Borislav, | + | * Sándor, Jozsef; Crstici, Borislav, ed. Handbook of number theory II. Dordrecht: Kluwer Academic (2004). pp. 32–36. {{ISBN|1-4020-2546-7}} {{ZBL|1079.11001}} |
Latest revision as of 13:07, 19 March 2023
2020 Mathematics Subject Classification: Primary: 11A [MSN][ZBL]
An arithmetic function $J_k(n)$ of a natural number $n$, named after Camille Jordan, counting the $k$-tuples of positive integers all less than or equal to $n$ that form a coprime $(k + 1)$-tuple together with $n$. This is a generalisation of Euler's totient function, which is $J_1$.
Jordan's totient function is multiplicative and may be evaluated as $$ J_k(n)=n^k \prod_{p|n}\left(1-\frac{1}{p^k}\right) \ . $$
By Möbius inversion we have $\sum_{d | n } J_k(d) = n^k $. The average order of $J_k(n)$ is $c n^k$ for some $c$.
References
- Dickson, L.E. History of the Theory of Numbers I, Chelsea (1971) p. 147, ISBN 0-8284-0086-5
- Ram Murty, M. Problems in Analytic Number Theory, ser. Graduate Texts in Mathematics 206 Springer-Verlag (2001) p. 11. ISBN 0387951431 Zbl 0971.11001
- Sándor, Jozsef; Crstici, Borislav, ed. Handbook of number theory II. Dordrecht: Kluwer Academic (2004). pp. 32–36. ISBN 1-4020-2546-7 Zbl 1079.11001
How to Cite This Entry:
Jordan totient function. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Jordan_totient_function&oldid=34695
Jordan totient function. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Jordan_totient_function&oldid=34695