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friezelpatronen

Friezelpatronen, commonly called frieze patronen in Dutch, describe frieze patterns in mathematics. A frieze pattern is a repeating arrangement of motifs along a strip that extends infinitely in one direction. They are one-dimensional analogues of two-dimensional wallpaper patterns and are used to study symmetry and tiling in a simple setting.

Symmetry is central to frieze patterns. The allowed symmetries include translations along the strip, reflections across

Construction and examples: start with a basic motif arranged along the axis and repeat it along the

History and significance: The study of frieze patterns was developed in the 20th century, notably by H.

See also: Frieze groups, Wallpaper groups, Pattern (mathematics).

a
line
parallel
or
perpendicular
to
the
strip,
and
glide
reflections
(a
reflection
combined
with
a
translation).
Based
on
which
symmetries
occur,
seven
distinct
frieze
types
are
classified.
Each
type
describes
a
different
balance
of
repetition
and
reflection
in
the
motif
sequence.
length
with
a
fixed
step.
If
the
pattern
has
a
mirror
line,
the
motif
on
one
side
mirrors
the
other.
If
glide
symmetry
is
present,
the
pattern
repeats
after
a
combined
reflection
and
shift.
These
patterns
are
used
in
design
and
crystallography
to
model
linear
repetitive
structures.
S.
M.
Coxeter
and
collaborators,
leading
to
the
standard
seven-frieze-group
classification.
They
provide
a
tractable
entry
point
into
the
broader
theory
of
symmetry
groups.