Quantile: Difference between revisions
imported>Peter Schmitt (new article) |
imported>Peter Schmitt m (fixing two links) |
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<br> | <br> | ||
An α-quantile is | An α-quantile is | ||
* a [[median]] for <math>\alpha=0.5</math> | * a [[median (statistics)|median]] for <math>\alpha=0.5</math> | ||
* a (first) quartile for <math>\alpha=0.25</math> and <br> a (third quartile) for <math>\alpha=0.75</math> | * a (first) quartile for <math>\alpha=0.25</math> and <br> a (third quartile) for <math>\alpha=0.75</math> | ||
* a ''k''th decile for <math>\alpha={k\over10}</math> | * a ''k''th decile for <math>\alpha={k\over10}</math> | ||
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Essentially, quantiles are the values of the inverse function to | Essentially, quantiles are the values of the inverse function to | ||
the (cumulative) [[distribution function]], defined as <math> F(y) := P (X \le y) </math>, | the (cumulative) [[distribution function (measure theory)|distribution function]], defined as <math> F(y) := P (X \le y) </math>, | ||
<br> | <br> | ||
with two exceptions: | with two exceptions: |
Revision as of 04:35, 9 December 2009
Quantiles are statistical parameters
that divide the range of a random variable into two parts
— values less than it and values greater than it —
according to a given probability.
More precisely, an α-quantile is a real number Xα
such that the random variable is less or equal to it
with probability at least α, and
greater or equal to it with probability at least (1–α).
It is not possible to require equality because the probability of
α may be positive.
On the other hand, Xα may not be uniquely determined
because of gaps in the range of the random variable.
In descriptive statistics, some frequently used quantiles have names of their own:
An α-quantile is
- a median for
- a (first) quartile for and
a (third quartile) for - a kth decile for
- a kth percentile for
Moreover, for statistical tests the critical values (used to determine whether a result is significant or not) are quantiles of the test statistic.
Definition
For a real random variable and a real number , a real number is an -quantile if and only if
Remark:
At least one of the inequalities is strict if .
and equality holds in both cases if .
Quantiles and the distribution function
Essentially, quantiles are the values of the inverse function to
the (cumulative) distribution function, defined as ,
with two exceptions:
- F is monotone, but not strictly monotone.
There may be (at most countably many) values for which the is a closed interval.
In this case every element of that interval is an α-quantile. (For all these values equality holds in both cases).
- The range of F may have (at most countably many) gaps (discontinuities).
For values in one of these gaps is empty, but the quantile is unique.
(These gaps correspond to those values Xα that occur with positive probability.)