Additive function
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In number theory, an additive function is an arithmetic function f(n) of the positive integer n such that whenever a and b are coprime, the function of the product is the sum of the functions:[1]
- f(ab) = f(a) + f(b).
Contents
Completely additive
An additive function f(n) is said to be completely additive if f(ab) = f(a) + f(b) holds for all positive integers a and b, even when they are not co-prime. Totally additive is also used in this sense by analogy with totally multiplicative functions. If f is a completely additive function then f(1) = 0.
Every completely additive function is additive, but not vice versa.
Examples
Example of arithmetic functions which are completely additive are:
- The restriction of the logarithmic function to N.
- The multiplicity of a prime factor p in n, that is the largest exponent m for which pm divides n.
- a0(n) - the sum of primes dividing n counting multiplicity, sometimes called sopfr(n), the potency of n or the integer logarithm of n (sequence A001414 in OEIS). For example:
-
- a0(4) = 2 + 2 = 4
- a0(20) = a0(22 · 5) = 2 + 2+ 5 = 9
- a0(27) = 3 + 3 + 3 = 9
- a0(144) = a0(24 · 32) = a0(24) + a0(32) = 8 + 6 = 14
- a0(2,000) = a0(24 · 53) = a0(24) + a0(53) = 8 + 15 = 23
- a0(2,003) = 2003
- a0(54,032,858,972,279) = 1240658
- a0(54,032,858,972,302) = 1780417
- a0(20,802,650,704,327,415) = 1240681
- The function Ω(n), defined as the total number of prime factors of n, counting multiple factors multiple times, sometimes called the "Big Omega function" (sequence A001222 in OEIS). For example;
-
- Ω(1) = 0, since 1 has no prime factors
- Ω(4) = 2
- Ω(16) = Ω(2·2·2·2) = 4
- Ω(20) = Ω(2·2·5) = 3
- Ω(27) = Ω(3·3·3) = 3
- Ω(144) = Ω(24 · 32) = Ω(24) + Ω(32) = 4 + 2 = 6
- Ω(2,000) = Ω(24 · 53) = Ω(24) + Ω(53) = 4 + 3 = 7
- Ω(2,001) = 3
- Ω(2,002) = 4
- Ω(2,003) = 1
- Ω(54,032,858,972,279) = 3
- Ω(54,032,858,972,302) = 6
- Ω(20,802,650,704,327,415) = 7
Example of arithmetic functions which are additive but not completely additive are:
- ω(n), defined as the total number of different prime factors of n (sequence A001221 in OEIS). For example:
-
- ω(4) = 1
- ω(16) = ω(24) = 1
- ω(20) = ω(22 · 5) = 2
- ω(27) = ω(33) = 1
- ω(144) = ω(24 · 32) = ω(24) + ω(32) = 1 + 1 = 2
- ω(2,000) = ω(24 · 53) = ω(24) + ω(53) = 1 + 1 = 2
- ω(2,001) = 3
- ω(2,002) = 4
- ω(2,003) = 1
- ω(54,032,858,972,279) = 3
- ω(54,032,858,972,302) = 5
- ω(20,802,650,704,327,415) = 5
- a1(n) - the sum of the distinct primes dividing n, sometimes called sopf(n) (sequence A008472 in OEIS). For example:
-
- a1(1) = 0
- a1(4) = 2
- a1(20) = 2 + 5 = 7
- a1(27) = 3
- a1(144) = a1(24 · 32) = a1(24) + a1(32) = 2 + 3 = 5
- a1(2,000) = a1(24 · 53) = a1(24) + a1(53) = 2 + 5 = 7
- a1(2,001) = 55
- a1(2,002) = 33
- a1(2,003) = 2003
- a1(54,032,858,972,279) = 1238665
- a1(54,032,858,972,302) = 1780410
- a1(20,802,650,704,327,415) = 1238677
Multiplicative functions
From any additive function f(n) it is easy to create a related multiplicative function g(n) i.e. with the property that whenever a and b are coprime we have:
- g(ab) = g(a) × g(b).
One such example is g(n) = 2f(n).
See also
References
Further reading
- Janko Bračič, Kolobar aritmetičnih funkcij (Ring of arithmetical functions), (Obzornik mat, fiz. 49 (2002) 4, pp. 97–108) (MSC (2000) 11A25)