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tarderived

Tarderived is a term encountered in some mathematical discussions to describe an operation that combines differentiation with a fixed time delay. In this sense, tarderived objects arise when the derivative of a function is considered after a lag, producing a delayed derivative that reflects both change and timing.

Formally, for a fixed delay tau greater than zero, one may define a tarderivative operator D_tau by

Relation to other concepts is centered on the interaction of differentiation with time shifts. The tarderivative

History and usage notes: tarderived is not a standard or widely adopted term in formal mathematical texts.

See also: delayed differential equations, time-delay systems, shift operators, Laplace transform.

(D_tau
f)(t)
=
f'(t
-
tau),
with
the
usual
domain
restrictions
to
ensure
t
-
tau
lies
within
the
function’s
domain.
Equivalently,
some
authors
describe
a
tarderivative
as
the
image
of
a
function
under
this
delayed
differentiation.
A
function
f
is
called
tarderived
(with
respect
to
D_tau)
if
there
exists
a
function
g
such
that
f
=
D_tau
g.
For
example,
if
g(t)
=
e^{a
t},
then
(D_tau
g)(t)
=
a
e^{a
(t
-
tau)}.
operator
is
connected
to
shift
operators
and
to
the
study
of
delay
differential
equations,
where
delays
in
observation
or
actuation
affect
system
dynamics.
In
applied
contexts
such
as
control
theory
and
signal
processing,
tarderived
expressions
model
situations
in
which
a
response
or
measurement
is
observed
after
a
fixed
lag,
influencing
stability
and
performance
analyses.
It
has
appeared
in
informal
discussions
and
explanatory
writings
to
convey
the
intuition
of
differentiating
after
a
delay.
Because
of
its
informal
status,
precise
definitions
and
conventions
may
vary
across
authors.