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expectationscontinue

Expectationscontinue is a term used in probability theory and forecasting to describe the ongoing maintenance and updating of expected values as information accumulates. At its core, it treats the forecasted expectation of a random variable X as a function of the available information, and it formalizes how this expectation is extended forward in time with new data.

Mechanics: Given a filtration F_t representing information up to time t, the expectation continue process is

Origins and usage: Although not a widely standardized term, expectationscontinue is used in educational expositions and

Example: If X is future demand and F_t includes all information up to day t, then E[X

Limitations: The concept relies on well-defined filtrations and integrable variables; practical use requires careful modeling of

See also: conditional expectation, martingale, filtration, Doob's optional stopping, forecasting.

the
sequence
E[X
|
F_t]
as
t
increases.
Under
standard
conditions,
the
sequence
is
adapted
to
F_t
and,
when
X
is
integrable,
E[E[X|F_t]
|
F_s]
=
E[X|F_s]
for
s
≤
t
(the
tower
property).
When
the
process
is
a
martingale
or
submartingale,
the
expectations
continue
to
propagate
in
ways
that
preserve
or
raise
the
expected
value,
respectively.
some
applied
forecasting
frameworks
to
emphasize
the
forward
extension
of
expectations
in
dynamic
settings.
It
is
particularly
relevant
in
finance
for
pricing
under
uncertainty,
in
risk
management,
and
in
sequential
decision-making
models
such
as
reinforcement
learning
where
value
estimates
are
updated
with
new
observations.
|
F_t]
provides
the
best
current
forecast
of
X
under
mean-square
error.
As
more
data
arrives
on
day
t+1,
the
forecast
becomes
E[X
|
F_{t+1}],
continuing
the
expectation
through
time.
information
flow
and
computational
considerations.