Home

differentierbar

Differentierbar, often rendered in German as differenzierbar, is a mathematical term describing when a function has a derivative at a point or on a domain. In real analysis, a function f: U → R is differentiable at a point a ∈ U if there exists a linear map Df(a) such that f(a+h) = f(a) + Df(a)h + o(||h||) as h → 0. In one-variable terms, this means the usual derivative f′(a) exists.

Differentiability implies continuity, but the converse is not true. For example, f(x) = |x| is continuous on

Differentiability connects to several broader concepts. The chain rule describes how derivatives compose under differentiable mappings.

In geometry and analysis, differentiable maps between manifolds are the foundation of smooth structures, enabling calculus

R
but
not
differentiable
at
x
=
0.
In
higher
dimensions,
a
function
f:
U
⊆
R^n
→
R^m
is
differentiable
at
a
if
there
is
a
linear
map
Df(a):
R^n
→
R^m
with
f(a+h)
=
f(a)
+
Df(a)h
+
o(||h||).
The
matrix
Df(a)
is
the
Jacobian,
encoding
all
first-order
partial
derivatives.
Classes
of
differentiability
include
C^1
(once
differentiable
with
a
continuous
derivative),
C^k
(k
times
differentiable),
and
C^∞
(infinitely
differentiable).
Real-analytic
functions
are
those
locally
equal
to
their
power
series.
on
curved
spaces.
While
many
elementary
functions
(polynomials,
exponentials,
logarithms
on
their
domains)
are
differentiable
everywhere
in
their
domains,
piecewise
definitions
may
fail
to
be
differentiable
at
joining
points.