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nichtglatte

Nichtglatte is a German term used in mathematics and related disciplines to describe objects that lack smoothness in a precise sense. In analysis and differential geometry, “glatt” generally denotes a function, surface, or manifold of high regularity, often of class C∞ (infinitely differentiable). A object or function is nichtglatt if it fails to meet the required smoothness criteria at some points or with respect to a chosen order of differentiability.

In practice, nichtglatte functions are those that are not differentiable at certain points or not differentiable

In optimization and numerical analysis, nichtglatte (non-smooth) problems are widespread. They require specialized techniques such as

Overall, nichtglatte describes a broad class of objects that do not possess the strongest forms of smoothness,

of
a
given
order.
Common
examples
include
the
absolute
value
function
|x|,
which
is
not
differentiable
at
x
=
0,
and
the
maximum
function
max(x,
y),
which
is
not
differentiable
on
the
line
where
x
=
y.
More
subtle
examples
include
functions
like
x1/3,
which
are
not
differentiable
at
0.
In
geometry,
a
polyhedral
surface
is
nichtglatt
along
edges
and
vertices
where
the
surface
has
corners
or
creases,
in
contrast
to
smooth
(glatte)
surfaces
with
well-defined
tangent
planes
everywhere.
subgradient
methods,
subdifferentials,
proximal
operators,
and
bundle
methods.
Smoothing
or
regularization
approaches
may
be
employed
to
approximate
nichtglatte
problems
by
smooth
ones.
with
specific
meaning
dependent
on
the
chosen
smoothness
framework
(differentiability,
continuity,
or
analytic
properties).