Normal order of an arithmetic function: Difference between revisions

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In mathematics, in the field of number theory, the normal order of an arithmetic function is some simpler or better-understood function which "usually" takes the same or closely approximate values.

Let f be a function on the natural numbers. We say that the normal order of f is g if for every ε > 0, the inequalities

${\displaystyle (1-\epsilon )g(n)\leq f(n)\leq (1+\epsilon )g(n)\,}$

hold for almost all n: that is, if the proportion of n ≤ x for which this does not hold tends to 0 as x tends to infinity.

It is conventional to assume that the approximating function g is continuous and monotone.

Examples

• The Hardy–Ramanujan theorem: the normal order of ω(n), the number of distinct prime factors of n, is log(log(n));
• The normal order of log(d(n)), where d(n) is the number of divisors of n, is log(2) log log(n).

See also

• Average order of an arithmetic function
• Divisor function

References

• G.H. Hardy; S. Ramanujan (1917). "The normal number of prime factors of a number". Quart. J. Math. 48: 76–92.

• G.H. Hardy; E.M. Wright (2008). An Introduction to the Theory of Numbers, 6th ed.. Oxford University Press, 473. ISBN 0-19-921986-5. 
• Gérald Tenenbaum (1995). Introduction to Analytic and Probabilistic Number Theory. Cambridge University Press, 299-324. ISBN 0-521-41261-7.