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sharpwave

Sharpwave is a term used in some discussions of transient signal behavior to describe a class of waveforms with abrupt or steep amplitude changes. These waveforms are characterized by a fast rise time, short duration, and substantial high-frequency content relative to their overall energy. The concept is often employed as a theoretical or synthetic construct to probe the limits of measurement, sampling, and processing systems rather than as a standardized physical signal.

For mathematical modeling, sharpwave can be represented by functions with non-smooth transitions, such as piecewise linear

Applications of sharpwave concepts include testing the dynamic range and impulse response of analog-to-digital converters, evaluating

See also transient signal, impulse, step function, Gibbs phenomenon, time-frequency analysis.

ramps,
derivatives
of
smooth
kernels,
or
exponentially
rising
fronts
constrained
by
short
lifetimes.
In
practice,
sharpwave
is
approximated
by
high-order
polynomials,
windowed
impulses,
or
by
differentiating
step-like
functions.
Because
of
their
sharp
edges,
sharpwaves
place
strong
demands
on
time-domain
sampling
and
frequency-domain
filtering,
and
they
are
susceptible
to
Gibbs
ringing
when
reconstructed
from
finite
data.
time-frequency
algorithms,
and
simulating
abrupt
transients
in
models
of
neural
activity,
seismology,
or
radar
reflections.
In
all
cases,
the
precise
definition
of
sharpwave
is
context-dependent,
and
there
is
no
universal
standard
for
its
parameters
such
as
rise
time,
duration,
or
spectral
content.