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rechterstaart

Rechterstaart is a term used in probability theory and statistics to denote the portion of a distribution that lies on the high-value end. It is defined relative to a threshold or central location, and contrasts with the linkerstaart (the lower-value end).

Given a random variable X with cumulative distribution function F, the right-tail probability above x is P(X

Key concepts associated with the rechterstaart include tail quantiles, survival function, and tail index. In heavy-tailed

Applications of rechterstaart analysis appear in risk assessment, finance, meteorology, and engineering, where understanding the probability

>
x)
=
1
−
F(x).
For
a
probability
density
f
on
(−∞,
∞),
the
right
tail
corresponds
to
the
integral
from
x
to
∞
of
f(t)
dt.
In
discrete
distributions,
the
right
tail
comprises
outcomes
with
values
above
the
threshold.
distributions,
the
right
tail
decays
slowly,
and
tail
behavior
is
often
summarized
by
asymptotics
such
as
P(X
>
x)
~
L(x)
x^−α
or
by
models
like
the
Pareto
or
lognormal.
Tail
estimation
in
data
often
uses
empirical
survival
probabilities,
Hill
estimators
for
the
tail
index,
or
threshold-based
methods
in
extreme
value
theory.
The
choice
of
threshold
and
sample
size
critically
affects
accuracy.
of
extreme
high
outcomes
is
important.
In
finance,
the
right
tail
can
relate
to
upside
potential
or,
in
some
contexts,
to
tail
risks
when
focusing
on
extreme
gains
or
losses
beyond
a
threshold.
See
also:
linkerstaart,
upper
tail,
tail
distribution,
survival
function,
extreme
value
theory.