statistics-0.16.2.1: A library of statistical types, data, and functions
Copyright(c) 2009 Bryan O'Sullivan
LicenseBSD3
Maintainerbos@serpentine.com
Stabilityexperimental
Portabilityportable
Safe HaskellSafe-Inferred
LanguageHaskell2010

Statistics.Quantile

Description

Functions for approximating quantiles, i.e. points taken at regular intervals from the cumulative distribution function of a random variable.

The number of quantiles is described below by the variable q, so with q=4, a 4-quantile (also known as a quartile) has 4 intervals, and contains 5 points. The parameter k describes the desired point, where 0 ≤ kq.

Synopsis

Quantile estimation functions

Below is family of functions which use same algorithm for estimation of sample quantiles. It approximates empirical CDF as continuous piecewise function which interpolates linearly between points \((X_k,p_k)\) where \(X_k\) is k-th order statistics (k-th smallest element) and \(p_k\) is probability corresponding to it. ContParam determines how \(p_k\) is chosen. For more detailed explanation see [Hyndman1996].

This is the method used by most statistical software, such as R, Mathematica, SPSS, and S.

data ContParam Source #

Parameters α and β to the continuousBy function. Exact meaning of parameters is described in [Hyndman1996] in section "Piecewise linear functions"

Constructors

ContParam !Double !Double 

Instances

Instances details
FromJSON ContParam Source # 
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Defined in Statistics.Quantile

ToJSON ContParam Source # 
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Defined in Statistics.Quantile

Data ContParam Source # 
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Methods

gfoldl :: (forall d b. Data d => c (d -> b) -> d -> c b) -> (forall g. g -> c g) -> ContParam -> c ContParam #

gunfold :: (forall b r. Data b => c (b -> r) -> c r) -> (forall r. r -> c r) -> Constr -> c ContParam #

toConstr :: ContParam -> Constr #

dataTypeOf :: ContParam -> DataType #

dataCast1 :: Typeable t => (forall d. Data d => c (t d)) -> Maybe (c ContParam) #

dataCast2 :: Typeable t => (forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c ContParam) #

gmapT :: (forall b. Data b => b -> b) -> ContParam -> ContParam #

gmapQl :: (r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> ContParam -> r #

gmapQr :: forall r r'. (r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> ContParam -> r #

gmapQ :: (forall d. Data d => d -> u) -> ContParam -> [u] #

gmapQi :: Int -> (forall d. Data d => d -> u) -> ContParam -> u #

gmapM :: Monad m => (forall d. Data d => d -> m d) -> ContParam -> m ContParam #

gmapMp :: MonadPlus m => (forall d. Data d => d -> m d) -> ContParam -> m ContParam #

gmapMo :: MonadPlus m => (forall d. Data d => d -> m d) -> ContParam -> m ContParam #

Generic ContParam Source # 
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Defined in Statistics.Quantile

Associated Types

type Rep ContParam :: Type -> Type #

Show ContParam Source # 
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Binary ContParam Source # 
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Default ContParam Source #

We use s as default value which is same as R's default.

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Methods

def :: ContParam Source #

Eq ContParam Source # 
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Ord ContParam Source # 
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type Rep ContParam Source # 
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type Rep ContParam = D1 ('MetaData "ContParam" "Statistics.Quantile" "statistics-0.16.2.1-3pqcJx3Latt5dz24Y5Wwoa" 'False) (C1 ('MetaCons "ContParam" 'PrefixI 'False) (S1 ('MetaSel ('Nothing :: Maybe Symbol) 'SourceUnpack 'SourceStrict 'DecidedStrict) (Rec0 Double) :*: S1 ('MetaSel ('Nothing :: Maybe Symbol) 'SourceUnpack 'SourceStrict 'DecidedStrict) (Rec0 Double)))

class Default a where Source #

A class for types with a default value.

Minimal complete definition

Nothing

Methods

def :: a Source #

The default value for this type.

Instances

Instances details
Default All 
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Defined in Data.Default.Class

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def :: All Source #

Default Any 
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Methods

def :: Any Source #

Default CClock 
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def :: CClock Source #

Default CDouble 
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Defined in Data.Default.Class

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def :: CDouble Source #

Default CFloat 
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Defined in Data.Default.Class

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def :: CFloat Source #

Default CInt 
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def :: CInt Source #

Default CIntMax 
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def :: CIntMax Source #

Default CIntPtr 
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Defined in Data.Default.Class

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def :: CIntPtr Source #

Default CLLong 
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Defined in Data.Default.Class

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def :: CLLong Source #

Default CLong 
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Defined in Data.Default.Class

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def :: CLong Source #

Default CPtrdiff 
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Defined in Data.Default.Class

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def :: CPtrdiff Source #

Default CSUSeconds 
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Defined in Data.Default.Class

Default CShort 
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Defined in Data.Default.Class

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def :: CShort Source #

Default CSigAtomic 
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Defined in Data.Default.Class

Default CSize 
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Defined in Data.Default.Class

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def :: CSize Source #

Default CTime 
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Defined in Data.Default.Class

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def :: CTime Source #

Default CUInt 
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Defined in Data.Default.Class

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def :: CUInt Source #

Default CUIntMax 
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def :: CUIntMax Source #

Default CUIntPtr 
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def :: CUIntPtr Source #

Default CULLong 
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def :: CULLong Source #

Default CULong 
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def :: CULong Source #

Default CUSeconds 
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def :: CUSeconds Source #

Default CUShort 
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def :: CUShort Source #

Default Int16 
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def :: Int16 Source #

Default Int32 
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def :: Int32 Source #

Default Int64 
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def :: Int64 Source #

Default Int8 
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def :: Int8 Source #

Default Word16 
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def :: Word16 Source #

Default Word32 
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def :: Word32 Source #

Default Word64 
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def :: Word64 Source #

Default Word8 
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def :: Word8 Source #

Default Ordering 
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Defined in Data.Default.Class

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def :: Ordering Source #

Default NewtonParam 
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Defined in Numeric.RootFinding

Default RiddersParam 
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Defined in Numeric.RootFinding

Default ContParam Source #

We use s as default value which is same as R's default.

Instance details

Defined in Statistics.Quantile

Methods

def :: ContParam Source #

Default Integer 
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Defined in Data.Default.Class

Methods

def :: Integer Source #

Default () 
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def :: () Source #

Default Double 
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Defined in Data.Default.Class

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def :: Double Source #

Default Float 
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def :: Float Source #

Default Int 
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Defined in Data.Default.Class

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def :: Int Source #

Default Word 
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Defined in Data.Default.Class

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def :: Word Source #

(Default a, RealFloat a) => Default (Complex a) 
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Defined in Data.Default.Class

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def :: Complex a Source #

Default (First a) 
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def :: First a Source #

Default (Last a) 
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def :: Last a Source #

Default a => Default (Dual a) 
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def :: Dual a Source #

Default (Endo a) 
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def :: Endo a Source #

Num a => Default (Product a) 
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Defined in Data.Default.Class

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def :: Product a Source #

Num a => Default (Sum a) 
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Defined in Data.Default.Class

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def :: Sum a Source #

Integral a => Default (Ratio a) 
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def :: Ratio a Source #

Default a => Default (IO a) 
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def :: IO a Source #

Default (Maybe a) 
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def :: Maybe a Source #

Default [a] 
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def :: [a] Source #

(Default a, Default b) => Default (a, b) 
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Defined in Data.Default.Class

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def :: (a, b) Source #

Default r => Default (e -> r) 
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Defined in Data.Default.Class

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def :: e -> r Source #

(Default a, Default b, Default c) => Default (a, b, c) 
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Defined in Data.Default.Class

Methods

def :: (a, b, c) Source #

(Default a, Default b, Default c, Default d) => Default (a, b, c, d) 
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Defined in Data.Default.Class

Methods

def :: (a, b, c, d) Source #

(Default a, Default b, Default c, Default d, Default e) => Default (a, b, c, d, e) 
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Defined in Data.Default.Class

Methods

def :: (a, b, c, d, e) Source #

(Default a, Default b, Default c, Default d, Default e, Default f) => Default (a, b, c, d, e, f) 
Instance details

Defined in Data.Default.Class

Methods

def :: (a, b, c, d, e, f) Source #

(Default a, Default b, Default c, Default d, Default e, Default f, Default g) => Default (a, b, c, d, e, f, g) 
Instance details

Defined in Data.Default.Class

Methods

def :: (a, b, c, d, e, f, g) Source #

quantile Source #

Arguments

:: Vector v Double 
=> ContParam

Parameters α and β.

-> Int

k, the desired quantile.

-> Int

q, the number of quantiles.

-> v Double

x, the sample data.

-> Double 

O(n·log n). Estimate the kth q-quantile of a sample x, using the continuous sample method with the given parameters.

The following properties should hold, otherwise an error will be thrown.

  • input sample must be nonempty
  • the input does not contain NaN
  • 0 ≤ k ≤ q

quantiles :: (Vector v Double, Foldable f, Functor f) => ContParam -> f Int -> Int -> v Double -> f Double Source #

O(k·n·log n). Estimate set of the kth q-quantile of a sample x, using the continuous sample method with the given parameters. This is faster than calling quantile repeatedly since sample should be sorted only once

The following properties should hold, otherwise an error will be thrown.

  • input sample must be nonempty
  • the input does not contain NaN
  • for every k in set of quantiles 0 ≤ k ≤ q

quantilesVec :: (Vector v Double, Vector v Int) => ContParam -> v Int -> Int -> v Double -> v Double Source #

O(k·n·log n). Same as quantiles but uses Vector container instead of Foldable one.

Parameters for the continuous sample method

cadpw :: ContParam Source #

California Department of Public Works definition, α=0, β=1. Gives a linear interpolation of the empirical CDF. This corresponds to method 4 in R and Mathematica.

hazen :: ContParam Source #

Hazen's definition, α=0.5, β=0.5. This is claimed to be popular among hydrologists. This corresponds to method 5 in R and Mathematica.

spss :: ContParam Source #

Definition used by the SPSS statistics application, with α=0, β=0 (also known as Weibull's definition). This corresponds to method 6 in R and Mathematica.

s :: ContParam Source #

Definition used by the S statistics application, with α=1, β=1. The interpolation points divide the sample range into n-1 intervals. This corresponds to method 7 in R and Mathematica and is default in R.

medianUnbiased :: ContParam Source #

Median unbiased definition, α=1/3, β=1/3. The resulting quantile estimates are approximately median unbiased regardless of the distribution of x. This corresponds to method 8 in R and Mathematica.

normalUnbiased :: ContParam Source #

Normal unbiased definition, α=3/8, β=3/8. An approximately unbiased estimate if the empirical distribution approximates the normal distribution. This corresponds to method 9 in R and Mathematica.

Other algorithms

weightedAvg Source #

Arguments

:: Vector v Double 
=> Int

k, the desired quantile.

-> Int

q, the number of quantiles.

-> v Double

x, the sample data.

-> Double 

O(n·log n). Estimate the kth q-quantile of a sample, using the weighted average method. Up to rounding errors it's same as quantile s.

The following properties should hold otherwise an error will be thrown.

  • the length of the input is greater than 0
  • the input does not contain NaN
  • k ≥ 0 and k ≤ q

Median & other specializations

median Source #

Arguments

:: Vector v Double 
=> ContParam

Parameters α and β.

-> v Double

x, the sample data.

-> Double 

O(n·log n) Estimate median of sample

mad Source #

Arguments

:: Vector v Double 
=> ContParam

Parameters α and β.

-> v Double

x, the sample data.

-> Double 

O(n·log n). Estimate the median absolute deviation (MAD) of a sample x using continuousBy. It's robust estimate of variability in sample and defined as:

\[ MAD = \operatorname{median}(| X_i - \operatorname{median}(X) |) \]

midspread Source #

Arguments

:: Vector v Double 
=> ContParam

Parameters α and β.

-> Int

q, the number of quantiles.

-> v Double

x, the sample data.

-> Double 

O(n·log n). Estimate the range between q-quantiles 1 and q-1 of a sample x, using the continuous sample method with the given parameters.

For instance, the interquartile range (IQR) can be estimated as follows:

midspread medianUnbiased 4 (U.fromList [1,1,2,2,3])
==> 1.333333

Deprecated

continuousBy Source #

Arguments

:: Vector v Double 
=> ContParam

Parameters α and β.

-> Int

k, the desired quantile.

-> Int

q, the number of quantiles.

-> v Double

x, the sample data.

-> Double 

Deprecated: Use quantile instead

References