In statistics, Cook's distance or Cook's D is a commonly used estimate of the influence of a data point when performing a least-squares regression analysis.[1] In a practical ordinary least squares analysis, Cook's distance can be used in several ways: to indicate influential data points that are particularly worth checking for validity; or to indicate regions of the design space where it would be good to be able to obtain more data points. It is named after the American statistician R. Dennis Cook, who introduced the concept in 1977.[2][3]

Definition

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Data points with large residuals (outliers) and/or high leverage may distort the outcome and accuracy of a regression. Cook's distance measures the effect of deleting a given observation. Points with a large Cook's distance are considered to merit closer examination in the analysis.

For the algebraic expression, first define

 

where   is the error term,   is the coefficient matrix,   is the number of covariates or predictors for each observation, and   is the design matrix including a constant. The least squares estimator then is  , and consequently the fitted (predicted) values for the mean of   are

 

where   is the projection matrix (or hat matrix). The  -th diagonal element of  , given by  ,[4] is known as the leverage of the  -th observation. Similarly, the  -th element of the residual vector   is denoted by  .

Cook's distance   of observation   is defined as the sum of all the changes in the regression model when observation   is removed from it[5]

 

where p is the rank of the model (i.e., number of independent variables in the design matrix) and   is the fitted response value obtained when excluding  , and   is the mean squared error of the regression model.[6]

Equivalently, it can be expressed using the leverage[5] ( ):

 

Detecting highly influential observations

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There are different opinions regarding what cut-off values to use for spotting highly influential points. Since Cook's distance is in the metric of an F distribution with   and   (as defined for the design matrix   above) degrees of freedom, the median point (i.e.,  ) can be used as a cut-off.[7] Since this value is close to 1 for large  , a simple operational guideline of   has been suggested.[8]

The  -dimensional random vector  , which is the change of   due to a deletion of the  -th observation, has a covariance matrix of rank one and therefore it is distributed entirely over one dimensional subspace (a line, say  ) of the  -dimensional space. The distributional property of   mentioned above implies that information about the influence of the  -th observation provided by   should be obtained not from outside of the line   but from the line   itself. However, in the introduction of Cook’s distance, a scaling matrix of full rank   is chosen and as a result   is treated as if it is a random vector distributed over the whole space of   dimensions. This means that information about the influence of the  -th observation provided by   through the Cook’s distance comes from the whole space of   dimensions. Hence the Cook's distance measure is likely to distort the real influence of observations, misleading the right identification of influential observations.[9][10]


Relationship to other influence measures (and interpretation)

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  can be expressed using the leverage[5] ( ) and the square of the internally Studentized residual ( ), as follows:

 

The benefit in the last formulation is that it clearly shows the relationship between   and   to   (while p and n are the same for all observations). If   is large then it (for non-extreme values of  ) will increase  . If   is close to 0 then   will be small, while if   is close to 1 then   will become very large (as long as  , i.e.: that the observation   is not exactly on the regression line that was fitted without observation  ).

  is related to DFFITS through the following relationship (note that   is the externally studentized residual, and   are defined here):

 

  can be interpreted as the distance one's estimates move within the confidence ellipsoid that represents a region of plausible values for the parameters.[clarification needed] This is shown by an alternative but equivalent representation of Cook's distance in terms of changes to the estimates of the regression parameters between the cases, where the particular observation is either included or excluded from the regression analysis.

An alternative to   has been proposed. Instead of considering the influence a single observation has on the overall model, the statistics   serves as a measure of how sensitive the prediction of the  -th observation is to the deletion of each observation in the original data set. It can be formulated as a weighted linear combination of the  's of all data points. Again, the projection matrix is involved in the calculation to obtain the required weights:

 

In this context,   ( ) resembles the correlation between the predictions   and  [a].
In contrast to  , the distribution of   is asymptotically normal for large sample sizes and models with many predictors. In absence of outliers the expected value of   is approximately  . An influential observation can be identified if

 

with   as the median and   as the median absolute deviation of all  -values within the original data set, i.e., a robust measure of location and a robust measure of scale for the distribution of  . The factor 4.5 covers approx. 3 standard deviations of   around its centre.
When compared to Cook's distance,   was found to perform well for high- and intermediate-leverage outliers, even in presence of masking effects for which   failed.[12]
Interestingly,   and   are closely related because they can both be expressed in terms of the matrix   which holds the effects of the deletion of the  -th data point on the  -th prediction:

 

With   at hand,   is given by:

 

where   if   is symmetric and idempotent, which is not necessarily the case. In contrast,   can be calculated as:

 

where   extracts the main diagonal of a square matrix  . In this context,   is referred to as the influence matrix whereas   resembles the so-called sensitivity matrix. An eigenvector analysis of   and   - which both share the same eigenvalues – serves as a tool in outlier detection, although the eigenvectors of the sensitivity matrix are more powerful. [13]

Software implementations

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Many programs and statistics packages, such as R, Python, Julia, etc., include implementations of Cook's distance.

Language/Program Function Notes
Stata predict, cooksd See [1]
R cooks.distance(model, ...) See [2]
Python CooksDistance().fit(X, y) See [3]
Julia cooksdistance(model, ...) See [4]

Extensions

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High-dimensional Influence Measure (HIM) is an alternative to Cook's distance for when   (i.e., when there are more predictors than observations).[14] While the Cook's distance quantifies the individual observation's influence on the least squares regression coefficient estimate, the HIM measures the influence of an observation on the marginal correlations.

See also

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Notes

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  1. ^ The indices   and   are often interchanged in the original publication as the projection matrix   is symmetric in ordinary linear regression, i.e.,  . Since this is not always the case, e.g., in weighted linear regression, the indices have been written consistently here to account for potential asymmetry and thus allow for direct usage.[11]

References

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  1. ^ Mendenhall, William; Sincich, Terry (1996). A Second Course in Statistics: Regression Analysis (5th ed.). Upper Saddle River, NJ: Prentice-Hall. p. 422. ISBN 0-13-396821-9. A measure of overall influence an outlying observation has on the estimated   coefficients was proposed by R. D. Cook (1979). Cook's distance, Di, is calculated...
  2. ^ Cook, R. Dennis (February 1977). "Detection of Influential Observations in Linear Regression". Technometrics. 19 (1). American Statistical Association: 15–18. doi:10.2307/1268249. JSTOR 1268249. MR 0436478.
  3. ^ Cook, R. Dennis (March 1979). "Influential Observations in Linear Regression". Journal of the American Statistical Association. 74 (365). American Statistical Association: 169–174. doi:10.2307/2286747. hdl:11299/199280. JSTOR 2286747. MR 0529533.
  4. ^ Hayashi, Fumio (2000). Econometrics. Princeton University Press. pp. 21–23. ISBN 1400823838.
  5. ^ a b c "Cook's Distance".
  6. ^ "Statistics 512: Applied Linear Models" (PDF). Purdue University. Archived from the original (PDF) on 2016-11-30. Retrieved 2016-03-25.
  7. ^ Bollen, Kenneth A.; Jackman, Robert W. (1990). "Regression Diagnostics: An Expository Treatment of Outliers and Influential Cases". In Fox, John; Long, J. Scott (eds.). Modern Methods of Data Analysis. Newbury Park, CA: Sage. pp. 266. ISBN 0-8039-3366-5.
  8. ^ Cook, R. Dennis; Weisberg, Sanford (1982). Residuals and Influence in Regression. New York, NY: Chapman & Hall. hdl:11299/37076. ISBN 0-412-24280-X.
  9. ^ Kim, Myung Geun (31 May 2017). "A cautionary note on the use of Cook's distance". Communications for Statistical Applications and Methods. 24 (3): 317–324. doi:10.5351/csam.2017.24.3.317. ISSN 2383-4757.
  10. ^ On deletion diagnostic statistic in regression
  11. ^ Peña 2005, p. 2.
  12. ^ Peña, Daniel (2005). "A New Statistic for Influence in Linear Regression". Technometrics. 47 (1). American Society for Quality and the American Statistical Association: 1–12. doi:10.1198/004017004000000662. S2CID 1802937.
  13. ^ Peña, Daniel (2006). Pham, Hoang (ed.). Springer Handbook of Engineering Statistics. Springer London. pp. 523–536. doi:10.1007/978-1-84628-288-1. ISBN 978-1-84628-288-1. S2CID 60460007.
  14. ^ High-dimensional influence measure

Further reading

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