Difference between revisions of "Rank vector"
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A vector statistic (cf. [[Statistics|Statistics]]) $ R = ( R _ {1} \dots R _ {n} ) $ | A vector statistic (cf. [[Statistics|Statistics]]) $ R = ( R _ {1} \dots R _ {n} ) $ | ||
constructed from a random observation vector $ X = ( X _ {1} \dots X _ {n} ) $ | constructed from a random observation vector $ X = ( X _ {1} \dots X _ {n} ) $ | ||
− | with $ i $- | + | with $ i $-th component $ R _ {i} = R _ {i} ( X) $, |
− | th component $ R _ {i} = R _ {i} ( X) $, | ||
$ i = 1 \dots n $, | $ i = 1 \dots n $, | ||
defined by | defined by | ||
$$ | $$ | ||
− | R _ {i} = \sum _ { j= } | + | R _ {i} = \sum _ { j= 1} ^ { n } \delta ( X _ {i} - X _ {j} ) , |
$$ | $$ | ||
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The statistic $ R _ {i} $ | The statistic $ R _ {i} $ | ||
− | is called the rank of the $ i $- | + | is called the rank of the $ i $-th component $ X _ {i} $, |
− | th component $ X _ {i} $, | ||
$ i = 1 \dots n $, | $ i = 1 \dots n $, | ||
of the random vector $ X $. | of the random vector $ X $. | ||
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of the rank $ R _ {i} $ | of the rank $ R _ {i} $ | ||
is equal to the number of components of $ X $ | is equal to the number of components of $ X $ | ||
− | whose observed values do not exceed the realization of the $ i $- | + | whose observed values do not exceed the realization of the $ i $-th component $ X _ {i} $, |
− | th component $ X _ {i} $, | ||
$ i = 1 \dots n $. | $ i = 1 \dots n $. | ||
− | Let $ X ^ {( \cdot ) } = ( X _ {( | + | Let $ X ^ {( \cdot ) } = ( X _ {( n1)} \dots X _ {( nn)} ) $ |
be the vector of order statistics (cf. [[Order statistic|Order statistic]]) constructed from the observation vector $ X $. | be the vector of order statistics (cf. [[Order statistic|Order statistic]]) constructed from the observation vector $ X $. | ||
Then the pair $ ( R , X ^ {( \cdot ) } ) $ | Then the pair $ ( R , X ^ {( \cdot ) } ) $ | ||
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$$ \tag{1 } | $$ \tag{1 } | ||
p ( x) = p ( x _ {1} \dots x _ {n} ) | p ( x) = p ( x _ {1} \dots x _ {n} ) | ||
− | = \prod _ { i= } | + | = \prod _ { i= 1} ^ { n } f ( x _ {i} ) , |
$$ | $$ | ||
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\frac{( n - 1 ) ! }{( k - 1 ) ! ( n - k ) ! } | \frac{( n - 1 ) ! }{( k - 1 ) ! ( n - k ) ! } | ||
[ F ( | [ F ( | ||
− | x _ {i} ) ] ^ {k-} | + | x _ {i} ) ] ^ {k- 1} [ 1 - F ( x _ {i} ) ] ^ {n- k }f ( x _ {i} ) , |
$$ | $$ | ||
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It follows from (2) and (3) that the conditional density $ q ( X _ {i} \mid R _ {i} = k ) $ | It follows from (2) and (3) that the conditional density $ q ( X _ {i} \mid R _ {i} = k ) $ | ||
of $ X _ {i} $ | of $ X _ {i} $ | ||
− | given $ R _ {i} = k $( | + | given $ R _ {i} = k $ ($ k = 1 \dots n $) |
− | $ k = 1 \dots n $) | ||
is expressed by the formula | is expressed by the formula | ||
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$$ | $$ | ||
= \ | = \ | ||
− | n! over | + | {n! \over ( k - 1 ) ! ( n - k ) ! } [ F ( x _ {i} ) |
− | ] ^ {k-} | + | ] ^ {k- 1} [ 1 - F ( x _ {i} ) ] ^ {n- k} f ( x _ {i} ) . |
$$ | $$ | ||
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the rank vector $ R $ | the rank vector $ R $ | ||
and the vector $ X ^ {( \cdot ) } $ | and the vector $ X ^ {( \cdot ) } $ | ||
− | of order statistics, since (4) is just the probability density of the $ k $- | + | of order statistics, since (4) is just the probability density of the $ k $-th order statistic $ X _ {( nk) }$, |
− | th order statistic $ X _ {( | ||
$ k = 1 \dots n $. | $ k = 1 \dots n $. | ||
Moreover, it follows from (3) that the conditional distribution of the rank $ R _ {i} $ | Moreover, it follows from (3) that the conditional distribution of the rank $ R _ {i} $ | ||
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\frac{( n - 1 ) ! }{( k - 1 ) ! ( n - k ) ! } | \frac{( n - 1 ) ! }{( k - 1 ) ! ( n - k ) ! } | ||
− | [ F ( X _ {i} ) ] ^ {k-} | + | [ F ( X _ {i} ) ] ^ {k- 1} [ 1 - F ( X _ {i} ) ] ^ {n- k} . |
$$ | $$ | ||
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$$ | $$ | ||
\rho ( X _ {i} , R _ {i} ) = \ | \rho ( X _ {i} , R _ {i} ) = \ | ||
− | \sqrt {n- | + | \sqrt {n- \frac{1}{n+1 }} . |
− | \frac{1}{n+} | ||
− | |||
$$ | $$ | ||
Latest revision as of 07:07, 21 June 2022
A vector statistic (cf. Statistics) $ R = ( R _ {1} \dots R _ {n} ) $
constructed from a random observation vector $ X = ( X _ {1} \dots X _ {n} ) $
with $ i $-th component $ R _ {i} = R _ {i} ( X) $,
$ i = 1 \dots n $,
defined by
$$ R _ {i} = \sum _ { j= 1} ^ { n } \delta ( X _ {i} - X _ {j} ) , $$
where $ \delta ( x) $ is the characteristic function (indicator function) of $ [ 0 , + \infty ] $, that is,
$$ \delta ( x) = \ \left \{ \begin{array}{ll} 1 & \textrm{ if } x \geq 0 , \\ 0 & \textrm{ if } x < 0 . \\ \end{array} \right .$$
The statistic $ R _ {i} $ is called the rank of the $ i $-th component $ X _ {i} $, $ i = 1 \dots n $, of the random vector $ X $. This definition of a rank vector is precise under the condition
$$ {\mathsf P} \{ X _ {i} = X _ {j} \} = 0 ,\ \ i \neq j , $$
which automatically holds if the probability distribution of $ X $ is defined by a density $ p ( x) = p ( x _ {1} \dots x _ {n} ) $. It follows from the definition of a rank vector that, under these conditions, $ R $ takes values in the space $ \mathfrak R = \{ r \} $ of all permutations $ r = ( r _ {1} \dots r _ {n} ) $ of $ 1 \dots n $ and the realization $ r _ {i} $ of the rank $ R _ {i} $ is equal to the number of components of $ X $ whose observed values do not exceed the realization of the $ i $-th component $ X _ {i} $, $ i = 1 \dots n $.
Let $ X ^ {( \cdot ) } = ( X _ {( n1)} \dots X _ {( nn)} ) $ be the vector of order statistics (cf. Order statistic) constructed from the observation vector $ X $. Then the pair $ ( R , X ^ {( \cdot ) } ) $ is a sufficient statistic for the distribution of $ X $, and $ X $ itself can be uniquely recovered from $ ( R , X ^ {( \cdot ) } ) $. Moreover, under the additional assumption that the density $ p ( x) $ of $ X $ is symmetric with respect to permutations of the arguments, the components $ R $ and $ X ^ {( \cdot ) } $ of the sufficient statistic $ ( R , X ^ {( \cdot ) } ) $ are independent and
$$ {\mathsf P} \{ R = r \} = \frac{1}{n ! } ,\ \ r \in \mathfrak R . $$
In particular, if
$$ \tag{1 } p ( x) = p ( x _ {1} \dots x _ {n} ) = \prod _ { i= 1} ^ { n } f ( x _ {i} ) , $$
that is, the components $ X _ {1} \dots X _ {n} $ are independent identically-distributed random variables ( $ f ( x _ {i} ) $ stands for the density of $ X _ {i} $), then
$$ \tag{2 } \left . \begin{array}{c} {\mathsf P} \{ R _ {i} = k \} = \frac{1}{n} ,\ i = 1 \dots n , \\ {\mathsf P} \{ R _ {i} = k , R _ {j} = m \} = \frac{1}{n ( n - 1 ) } , \ i \neq j ,\ k \neq m , \\ {\mathsf E} \{ R _ {i} \} = n+ \frac{1}{2} ,\ {\mathsf D} \{ R _ {i} \} = \frac{n ^ {2} - 1 }{12} ,\ \ i = 1 \dots n , \\ \end{array} \right \} $$
for any $ k = 1 \dots n $.
If (1) holds, there is a joint density $ q ( x _ {i} , k ) $, $ k = 1 \dots n $, of $ X _ {i} $ and $ R _ {i} $, defined by the formula
$$ \tag{3 } q ( x _ {i} , k ) = $$
$$ = \ \frac{( n - 1 ) ! }{( k - 1 ) ! ( n - k ) ! } [ F ( x _ {i} ) ] ^ {k- 1} [ 1 - F ( x _ {i} ) ] ^ {n- k }f ( x _ {i} ) , $$
where $ F ( x _ {i} ) $ is the distribution function of $ X _ {i} $. It follows from (2) and (3) that the conditional density $ q ( X _ {i} \mid R _ {i} = k ) $ of $ X _ {i} $ given $ R _ {i} = k $ ($ k = 1 \dots n $) is expressed by the formula
$$ \tag{4 } q ( x _ {i} \mid R _ {i} = k ) = $$
$$ = \ {n! \over ( k - 1 ) ! ( n - k ) ! } [ F ( x _ {i} ) ] ^ {k- 1} [ 1 - F ( x _ {i} ) ] ^ {n- k} f ( x _ {i} ) . $$
The latter formula allows one to trace the internal connection between the observation vector $ X $, the rank vector $ R $ and the vector $ X ^ {( \cdot ) } $ of order statistics, since (4) is just the probability density of the $ k $-th order statistic $ X _ {( nk) }$, $ k = 1 \dots n $. Moreover, it follows from (3) that the conditional distribution of the rank $ R _ {i} $ is given by the formula
$$ {\mathsf P} \{ R _ {i} = k \mid X _ {i} \} = $$
$$ = \ \frac{( n - 1 ) ! }{( k - 1 ) ! ( n - k ) ! } [ F ( X _ {i} ) ] ^ {k- 1} [ 1 - F ( X _ {i} ) ] ^ {n- k} . $$
Finally, under the assumption that the moments $ {\mathsf E} \{ X _ {i} \} $ and $ {\mathsf D} \{ X _ {i} \} $ exist and that (1) holds, (2) and (3) imply that the correlation coefficient $ \rho ( X _ {i} , R _ {i} ) $ between $ X _ {i} $ and $ R _ {i} $ is equal to
$$ \rho ( X _ {i} , R _ {i} ) = \ \sqrt { \frac{12 ( n - 1 ) }{( n + 1 ) {\mathsf D} \{ X _ {i} \} } } \int\limits _ {- \infty } ^ \infty x _ {i} \left [ F ( x _ {i} ) - \frac{1}{2} \right ] d F ( x _ {i} ) . $$
In particular, if $ X _ {i} $ is uniformly distributed on $ [ 0 , 1 ] $, then
$$ \rho ( X _ {i} , R _ {i} ) = \ \sqrt {n- \frac{1}{n+1 }} . $$
If $ X $ has the normal distribution $ N ( a , \sigma ^ {2} ) $, then
$$ \rho ( X _ {i} , R _ {i} ) = \ \sqrt { \frac{3 ( n - 1 ) }{\pi ( n + 1 ) } } , $$
and $ \rho ( X _ {i} , R _ {i} ) $ does not depend on the parameters of the normal distribution.
References
[1] | W. Hoeffding, " "Optimum" nonparametric tests" , Proc. 2nd Berkeley Symp. Math. Stat. Probab. (1950) , Univ. California Press (1951) pp. 83–92 |
[2] | J. Hájek, Z. Sidák, "Theory of rank tests" , Acad. Press (1967) |
[3] | F.P. Tarasenko, "Non-parametric statistics" , Tomsk (1976) (In Russian) |
Rank vector. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Rank_vector&oldid=49547