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In statistics, Spearman's rank correlation coefficient or Spearman's ρ, named after Charles Spearman [1] and often denoted by the Greek letter (rho) or as , is a nonparametric measure of rank correlation (statistical dependence between the rankings of two variables).
Some correlation statistics, such as the rank correlation coefficient, are also invariant to monotone transformations of the marginal distributions of X and/or Y. Pearson/Spearman correlation coefficients between X and Y are shown when the two variables' ranges are unrestricted, and when the range of X is restricted to the interval (0,1).
Charles Edward Spearman, FRS [1] [3] (10 September 1863 – 17 September 1945) was an English psychologist known for work in statistics, as a pioneer of factor analysis, and for Spearman's rank correlation coefficient.
A rank correlation coefficient measures the degree of similarity between two rankings, and can be used to assess the significance of the relation between them. For example, two common nonparametric methods of significance that use rank correlation are the Mann–Whitney U test and the Wilcoxon signed-rank test .
Rank correlation is a measure of the relationship between the rankings of two variables, or two rankings of the same variable: . Spearman's rank correlation coefficient is a measure of how well the relationship between two variables can be described by a monotonic function.
Either Pearson's , Kendall's τ, or Spearman's can be used to measure pairwise correlation among raters using a scale that is ordered. Pearson assumes the rating scale is continuous; Kendall and Spearman statistics assume only that it is ordinal.
Charles Spearman developed in 1904 a procedure for correcting correlations for regression dilution, [10] i.e., to "rid a correlation coefficient from the weakening effect of measurement error". [11] In measurement and statistics, the procedure is also called correlation disattenuation or the disattenuation of correlation. [12]
Spearman's rank correlation coefficient; Mann–Whitney U test; Wilcoxon signed-rank test; Van der Waerden test; The distribution of values in decreasing order of rank is often of interest when values vary widely in scale; this is the rank-size distribution (or rank-frequency distribution), for example for city sizes or word frequencies.