Home

multiplikativ

Multiplikativ, in mathematics, describes a property of functions or operations that preserve multiplication. In the common context of arithmetic functions on the positive integers, a function f is called multiplicativ if f(1) = 1 and f(mn) = f(m) f(n) whenever m and n are coprime (gcd(m, n) = 1). If the equality f(mn) = f(m) f(n) holds for all positive integers m and n without the coprime restriction, the function is called completely multiplicative.

The distinction between multiplicative and completely multiplicative is important in number theory, as many functions satisfy

Beyond arithmetic functions, the term also appears in algebra to describe maps that preserve multiplication. A

In German-language mathematics, either "multiplikativ" or its English counterpart "multiplicative" is used to denote these ideas.

one
property
but
not
the
other.
Classic
examples
include
the
Möbius
function
μ(n)
and
Euler’s
totient
function
φ(n),
both
of
which
are
multiplicative.
Functions
like
f(n)
=
n^k
(for
any
fixed
k)
are
completely
multiplicative,
as
f(mn)
=
(mn)^k
=
m^k
n^k
for
all
m,
n.
Dirichlet
characters
are
another
broad
family
of
completely
multiplicative
functions.
function
f
between
semigroups
or
rings
is
multiplicative
if
f(xy)
=
f(x)
f(y)
for
all
x,
y
in
the
domain.
In
ring
theory,
a
ring
homomorphism
is
a
multiplicative
map
that
also
preserves
addition.
The
concept
underpins
many
constructions,
including
Dirichlet
convolution,
multiplicative
functions,
and
various
product-preserving
mappings
across
algebraic
structures.