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periodicities

Periodicities are the properties of processes or signals that repeat at regular intervals in time or space. The length of the repeat interval is called the period, and the inverse of the period is the frequency. An exactly periodic signal satisfies f(t+T) = f(t) for all t, where T is the fundamental period. In practice, many real-world signals are only approximately periodic or contain several overlapping periodic components, making their behavior more complex.

Methods of analysis for periodicities include both time-domain and frequency-domain approaches. For evenly sampled data, Fourier

Applications and examples span multiple disciplines. Periodicities arise in physics and astronomy (orbital, rotational, and pulsation

Variants of periodicity include quasi-periodicity, where signals have recurring structure without a fixed period, and multi-periodic

analysis
reveals
spectral
peaks
corresponding
to
repeating
components.
For
irregularly
sampled
data,
methods
such
as
the
Lomb-Scargle
periodogram
are
commonly
used.
Time-domain
approaches
include
autocorrelation
and
phase
dispersion
minimization.
Analysts
must
consider
sampling
rate,
windowing,
noise,
and
aliasing,
which
can
create
or
obscure
apparent
periodicities.
periods),
biology
(circadian
rhythms
with
roughly
24-hour
cycles),
meteorology
and
climatology
(seasonal
cycles
and
longer
Milankovitch
cycles),
and
engineering
(vibrations
and
musical
tones).
In
many
systems
multiple
periods
interact,
producing
harmonics
or
beating
patterns.
phenomena,
where
several
distinct
periods
coexist.
Distinguishing
true
periodicities
from
noise
and
non-repeating
patterns
is
a
central
challenge
in
data
analysis.