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reguljär

Reguljär is a Swedish adjective borrowed from Latin regulāris and French régulier. In mathematics and closely related fields it is used to describe something that is regular in a well-defined sense: non-singular, smooth or well-behaved within a given context. The exact meaning depends on the branch of mathematics being considered.

In topology, reguljär rymd (regular space) refers to a space that satisfies a separation axiom ensuring the

In differential topology and geometry the term appears in several closely related notions. A differentiable map

In algebraic geometry and the theory of schemes, a point on a variety or scheme is reguljär

Because reguljär is context dependent, it is best understood from the specific field’s definition. The term

distinction
between
points
and
closed
sets.
Formally,
a
topological
space
X
is
regular
if,
for
every
point
x
and
closed
set
F
not
containing
x,
there
exist
disjoint
open
sets
U
containing
x
and
V
containing
F.
Regular
spaces
are
closely
related
to
the
T3
separation
axiom.
f:
M
->
N
has
a
reguljär
värde
y
if,
for
every
x
in
the
preimage
f^{-1}(y),
the
derivative
Df_x
is
surjective.
The
preimage
of
a
reguljär
värde
is
a
smooth
submanifold.
A
reguljär
kurva
(regular
curve)
is
a
parametrized
curve
with
non-vanishing
derivative,
i.e.,
its
velocity
vector
never
vanishes.
if
the
local
ring
is
regular.
This
is
equivalent
to
the
tangent
space
having
the
expected
dimension;
a
reguljär
punkt
is
non-singular.
Regularity
in
this
sense
often
aligns
with
geometric
intuition
of
smoothness.
is
commonly
contrasted
with
singular
or
irregular,
to
indicate
a
breakdown
of
smoothness,
well-definedness,
or
expected
dimension.