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Cor: Covariance and Correlation (Matrices)

Description

Cov and Cor compute the covariance or correlation of x and y if these are vectors. If x and y are matrices then the covariances (or correlations) between the columns of x and the columns of y are computed.

Usage

Cov(x, y = NULL, use = "everything",
    method = c("pearson", "kendall", "spearman"))

Cor(x, y = NULL, use = "everything", method = c("pearson", "kendall", "spearman"))

Value

For r <- Cor(*, use = "all.obs"), it is now guaranteed that

all(abs(r) <= 1).

Arguments

x

a numeric vector, matrix or data frame.

y

NULL (default) or a vector, matrix or data frame with compatible dimensions to x. The default is equivalent to y = x (but more efficient).

use

an optional character string giving a method for computing covariances in the presence of missing values. This must be (an abbreviation of) one of the strings "everything", "all.obs", "complete.obs", "na.or.complete", or "pairwise.complete.obs".

method

a character string indicating which correlation coefficient (or covariance) is to be computed. One of "pearson" (default), "kendall", or "spearman": can be abbreviated.

Details

For Cov and Cor one must either give a matrix or data frame for x or give both x and y.

The inputs must be numeric (as determined by is.numeric: logical values are also allowed for historical compatibility): the "kendall" and "spearman" methods make sense for ordered inputs but xtfrm can be used to find a suitable prior transformation to numbers.

If use is "everything", NAs will propagate conceptually, i.e., a resulting value will be NA whenever one of its contributing observations is NA.
If use is "all.obs", then the presence of missing observations will produce an error. If use is "complete.obs" then missing values are handled by casewise deletion (and if there are no complete cases, that gives an error).
"na.or.complete" is the same unless there are no complete cases, that gives NA. Finally, if use has the value "pairwise.complete.obs" then the correlation or covariance between each pair of variables is computed using all complete pairs of observations on those variables. This can result in covariance or correlation matrices which are not positive semi-definite, as well as NA entries if there are no complete pairs for that pair of variables. For Cov and Var, "pairwise.complete.obs" only works with the "pearson" method. Note that (the equivalent of) Var(double(0), use = *) gives NA for use = "everything" and "na.or.complete", and gives an error in the other cases.

The denominator \(n - 1\) is used which gives an unbiased estimator of the (co)variance for i.i.d. observations. These functions return NA when there is only one observation (whereas S-PLUS has been returning NaN), and fail if x has length zero.

For Cor(), if method is "kendall" or "spearman", Kendall's \(\tau\) or Spearman's \(\rho\) statistic is used to estimate a rank-based measure of association. These are more robust and have been recommended if the data do not necessarily come from a bivariate normal distribution.
For Cov(), a non-Pearson method is unusual but available for the sake of completeness. Note that "spearman" basically computes Cor(R(x), R(y)) (or Cov(., .)) where R(u) := rank(u, na.last = "keep"). In the case of missing values, the ranks are calculated depending on the value of use, either based on complete observations, or based on pairwise completeness with reranking for each pair.

Scaling a covariance matrix into a correlation one can be achieved in many ways, mathematically most appealing by multiplication with a diagonal matrix from left and right, or more efficiently by using sweep(.., FUN = "/") twice.

References

Becker, R. A., Chambers, J. M. and Wilks, A. R. (1988) The New S Language. Wadsworth & Brooks/Cole.

See Also

cor.test for confidence intervals (and tests).

cov.wt for weighted covariance computation.

Var, SD for variance and standard deviation (vectors).

Examples

Run this code
## Two simple vectors
Cor(1:10, 2:11) # == 1

## Correlation Matrix of Multivariate sample:
(Cl <- Cor(longley))
## Graphical Correlation Matrix:
symnum(Cl) # highly correlated

## Spearman's rho  and  Kendall's tau
symnum(clS <- Cor(longley, method = "spearman"))
symnum(clK <- Cor(longley, method = "kendall"))
## How much do they differ?
i <- lower.tri(Cl)
Cor(cbind(P = Cl[i], S = clS[i], K = clK[i]))


##--- Missing value treatment:

C1 <- Cov(swiss)
range(eigen(C1, only.values = TRUE)$values) # 6.19        1921

## swM := "swiss" with  3 "missing"s :
swM <- swiss
colnames(swM) <- abbreviate(colnames(swiss), min=6)
swM[1,2] <- swM[7,3] <- swM[25,5] <- NA # create 3 "missing"

## Consider all 5 "use" cases :
(C. <- Cov(swM)) # use="everything"  quite a few NA's in cov.matrix
try(Cov(swM, use = "all")) # Error: missing obs...
C2 <- Cov(swM, use = "complete")
stopifnot(identical(C2, Cov(swM, use = "na.or.complete")))
range(eigen(C2, only.values = TRUE)$values) # 6.46   1930
C3 <- Cov(swM, use = "pairwise")
range(eigen(C3, only.values = TRUE)$values) # 6.19   1938

## Kendall's tau doesn't change much:
symnum(Rc <- Cor(swM, method = "kendall", use = "complete"))
symnum(Rp <- Cor(swM, method = "kendall", use = "pairwise"))
symnum(R. <- Cor(swiss, method = "kendall"))

## "pairwise" is closer componentwise,
summary(abs(c(1 - Rp/R.)))
summary(abs(c(1 - Rc/R.)))

## but "complete" is closer in Eigen space:
EV <- function(m) eigen(m, only.values=TRUE)$values
summary(abs(1 - EV(Rp)/EV(R.)) / abs(1 - EV(Rc)/EV(R.)))

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