Multiplicative function
- Outside number theory, the term multiplicative function is usually used for completely multiplicative functions. This article discusses number theoretic multiplicative functions.
In number theory, a multiplicative function is an arithmetic function f(n) of the positive integer n with the property that f(1) = 1 and whenever a and b are coprime, then
- f(ab) = f(a) f(b).
An arithmetic function f(n) is said to be completely multiplicative (or totally multiplicative) if f(1) = 1 and f(ab) = f(a) f(b) holds for all positive integers a and b, even when they are not coprime.
Contents
Examples
Some multiplicative functions are defined to make formulas easier to write:
- 1(n): the constant function, defined by 1(n) = 1 (completely multiplicative)
- Id(n): identity function, defined by Id(n) = n (completely multiplicative)
- Idk(n): the power functions, defined by Idk(n) = nk for any complex number k (completely multiplicative). As special cases we have
- Id0(n) = 1(n) and
- Id1(n) = Id(n).
- ε(n): the function defined by ε(n) = 1 if n = 1 and 0 otherwise, sometimes called multiplication unit for Dirichlet convolution or simply the unit function (completely multiplicative). Sometimes written as u(n), but not to be confused with μ(n) .
- 1C(n), the indicator function of the set C ⊂ Z, for certain sets C. The indicator function 1C(n) is multiplicative precisely when the set C has the following property for any coprime numbers a and b: the product ab is in C if and only if the numbers a and b are both themselves in C. This is the case if C is the set of squares, cubes, or k-th powers, or if C is the set of square-free numbers.
Other examples of multiplicative functions include many functions of importance in number theory, such as:
- gcd(n,k): the greatest common divisor of n and k, as a function of n, where k is a fixed integer.
- (n): Euler's totient function , counting the positive integers coprime to (but not bigger than) n
- μ(n): the Möbius function, the parity (−1 for odd, +1 for even) of the number of prime factors of square-free numbers; 0 if n is not square-free
- σk(n): the divisor function, which is the sum of the k-th powers of all the positive divisors of n (where k may be any complex number). Special cases we have
- σ0(n) = d(n) the number of positive divisors of n,
- σ1(n) = σ(n), the sum of all the positive divisors of n.
- a(n): the number of non-isomorphic abelian groups of order n.
- λ(n): the Liouville function, λ(n) = (−1)Ω(n) where Ω(n) is the total number of primes (counted with multiplicity) dividing n. (completely multiplicative).
- γ(n), defined by γ(n) = (−1)ω(n), where the additive function ω(n) is the number of distinct primes dividing n.
- τ(n): the Ramanujan tau function.
- All Dirichlet characters are completely multiplicative functions. For example
- (n/p), the Legendre symbol, considered as a function of n where p is a fixed prime number.
An example of a non-multiplicative function is the arithmetic function r2(n) - the number of representations of n as a sum of squares of two integers, positive, negative, or zero, where in counting the number of ways, reversal of order is allowed. For example:
- 1 = 12 + 02 = (-1)2 + 02 = 02 + 12 = 02 + (-1)2
and therefore r2(1) = 4 ≠ 1. This shows that the function is not multiplicative. However, r2(n)/4 is multiplicative.
In the On-Line Encyclopedia of Integer Sequences, sequences of values of a multiplicative function have the keyword "mult".
See arithmetic function for some other examples of non-multiplicative functions.
Properties
A multiplicative function is completely determined by its values at the powers of prime numbers, a consequence of the fundamental theorem of arithmetic. Thus, if n is a product of powers of distinct primes, say n = pa qb ..., then f(n) = f(pa) f(qb) ...
This property of multiplicative functions significantly reduces the need for computation, as in the following examples for n = 144 = 24 · 32:
- d(144) = σ0(144) = σ0(24)σ0(32) = (10 + 20 + 40 + 80 + 160)(10 + 30 + 90) = 5 · 3 = 15,
- σ(144) = σ1(144) = σ1(24)σ1(32) = (11 + 21 + 41 + 81 + 161)(11 + 31 + 91) = 31 · 13 = 403,
- σ*(144) = σ*(24)σ*(32) = (11 + 161)(11 + 91) = 17 · 10 = 170.
Similarly, we have:
- (144)=(24)(32) = 8 · 6 = 48
In general, if f(n) is a multiplicative function and a, b are any two positive integers, then
Every completely multiplicative function is a homomorphism of monoids and is completely determined by its restriction to the prime numbers.
Convolution
If f and g are two multiplicative functions, one defines a new multiplicative function f * g, the Dirichlet convolution of f and g, by
where the sum extends over all positive divisors d of n. With this operation, the set of all multiplicative functions turns into an abelian group; the identity element is ε. Convolution is commutative, associative, and distributive over addition.
Relations among the multiplicative functions discussed above include:
- μ * 1 = ε (the Möbius inversion formula)
- (μ Idk) * Idk = ε (generalized Möbius inversion)
- * 1 = Id
- d = 1 * 1
- σ = Id * 1 = * d
- σk = Idk * 1
- Id = * 1 = σ * μ
- Idk = σk * μ
The Dirichlet convolution can be defined for general arithmetic functions, and yields a ring structure, the Dirichlet ring.
Dirichlet series for some multiplicative functions
More examples are shown in the article on Dirichlet series.
Multiplicative function over Fq[X]
Let A=Fq[X], the polynomial ring over the finite field with q elements. A is principal ideal domain and therefore A is unique factorization domain.
a complex-valued function on A is called multiplicative if , whenever f and g are relatively prime.
Zeta function and Dirichlet series in Fq[X]
Let h be a polynomial arithmetic function (i.e. a function on set of monic polynomials over A). Its corresponding Dirichlet series define to be
,
where for , set if , and otherwise.
The polynomial zeta function is then
.
Similar to the situation in N, every Dirichlet series of a multiplicative function h has a product representation (Euler product):
,
Where the product runs over all monic irreducible polynomials P.
For example, the product representation of the zeta function is as for the integers: .
Unlike the classical zeta function, is a simple rational function:
.
In a similar way, If ƒ and g are two polynomial arithmetic functions, one defines ƒ * g, the Dirichlet convolution of ƒ and g, by
where the sum extends over all monic divisors d of m, or equivalently over all pairs (a, b) of monic polynomials whose product is m. The identity still holds.
See also
References
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