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kruissections

Kruissections are a concept in geometry and topology describing a way to decompose a space into a family of cross-sectional pieces obtained along a parameterized foliation. The term, inspired by the Dutch word kruis for cross, is used in some mathematical and computational contexts to discuss structured decompositions. There is no single universally accepted definition, and different authors may emphasize different aspects.

A common way to define a kruissection is as a collection of transversal cross-sections obtained from a

Starting with a space X that has a foliation by curves, one selects a parameter grid, picks

Kruissections yield stratifications of X into cells that reflect the chosen foliation. They can produce grid-like

In computational geometry, kruissections assist in mesh generation, volumetric modeling, and visualization. In mathematics, they provide

foliation
of
a
space
X
by
one-dimensional
leaves.
If
F
is
a
smooth
foliation
of
X
and
t
runs
over
an
index
set
T,
then
for
a
chosen
discrete
subset
{t_i}
of
T,
the
kruissection
is
the
family
{C_i}
where
C_i
is
a
cross-section
corresponding
to
t_i.
Each
C_i
is
typically
a
submanifold
of
X,
and
the
union
of
all
C_i
covers
X;
intersections
among
cross-sections
occur
along
their
boundaries
or
at
lower-dimensional
faces.
cross-sections
transverse
to
the
leaves,
ensures
regularity
(for
example,
piecewise-linear
stages
in
computational
use),
and
assembles
them
into
a
cover
or
a
cell
complex.
The
resulting
division
is
used
to
study
local
structure
and
to
build
meshes.
decompositions
on
surfaces
or
more
irregular
partitions
on
complex
3-manifolds.
The
resulting
structure
depends
on
the
foliation
choice
and
on
how
the
cross-sections
are
selected.
a
framework
for
analyzing
how
global
structure
interacts
with
local
cross-sections.
See
also:
cross-section,
foliation,
mesh
generation,
cell
complex.