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vegan (version 2.0-10)

CCorA: Canonical Correlation Analysis

Description

Canonical correlation analysis, following Brian McArdle's unpublished graduate course notes, plus improvements to allow the calculations in the case of very sparse and collinear matrices, and permutation test of Pillai's trace statistic.

Usage

CCorA(Y, X, stand.Y=FALSE, stand.X=FALSE, nperm = 0, ...)

## S3 method for class 'CCorA': biplot(x, plot.type="ov", xlabs, plot.axes = 1:2, int=0.5, col.Y="red", col.X="blue", cex=c(0.7,0.9), ...)

Arguments

Y
Left matrix (object class: matrix or data.frame).
X
Right matrix (object class: matrix or data.frame).
stand.Y
Logical; should Y be standardized?
stand.X
Logical; should X be standardized?
nperm
Numeric; number of permutations to evaluate the significance of Pillai's trace, e.g. nperm=99 or nperm=999.
x
CCoaR result object.
plot.type
A character string indicating which of the following plots should be produced: "objects", "variables", "ov" (separate graphs for objects and variables), or "biplots". Any unambiguous subse
xlabs
Row labels. The default is to use row names, NULL uses row numbers instead, and NA suppresses plotting row names completely.
plot.axes
A vector with 2 values containing the order numbers of the canonical axes to be plotted. Default: first two axes.
int
Radius of the inner circles plotted as visual references in the plots of the variables. Default: int=0.5. With int=0, no inner circle is plotted.
col.Y
Color used for objects and variables in the first data table (Y) plots. In biplots, the objects are in black.
col.X
Color used for objects and variables in the second data table (X) plots.
cex
A vector with 2 values containing the size reduction factors for the object and variable names, respectively, in the plots. Default values: cex=c(0.7,0.9).
...
Other arguments passed to these functions. The function biplot.CCorA passes graphical arguments to biplot and biplot.default.

Value

  • Function CCorA returns a list containing the following elements:
  • PillaiPillai's trace statistic = sum of the canonical eigenvalues.
  • EigenvaluesCanonical eigenvalues. They are the squares of the canonical correlations.
  • CanCorrCanonical correlations.
  • Mat.ranksRanks of matrices Y and X.
  • RDA.RsquaresBimultivariate redundancy coefficients (R-squares) of RDAs of Y|X and X|Y.
  • RDA.adj.RsqRDA.Rsquares adjusted for n and the number of explanatory variables.
  • npermNumber of permutations.
  • p.PillaiParametric probability value associated with Pillai's trace.
  • p.permPermutational probability associated with Pillai's trace.
  • CyObject scores in Y biplot.
  • CxObject scores in X biplot.
  • corr.Y.CyScores of Y variables in Y biplot, computed as cor(Y,Cy).
  • corr.X.CxScores of X variables in X biplot, computed as cor(X,Cx).
  • corr.Y.Cxcor(Y,Cy) available for plotting variables Y in space of X manually.
  • corr.X.Cycor(X,Cx) available for plotting variables X in space of Y manually.
  • callCall to the CCorA function.

concept

ordination

Details

Canonical correlation analysis (Hotelling 1936) seeks linear combinations of the variables of Y that are maximally correlated to linear combinations of the variables of X. The analysis estimates the relationships and displays them in graphs. Pillai's trace statistic is computed and tested parametrically (F-test); a permutation test is also available.

Algorithmic note -- The blunt approach would be to read the two matrices, compute the covariance matrices, then the matrix S12 %*% inv(S22) %*% t(S12) %*% inv(S11). Its trace is Pillai's trace statistic. This approach may fail, however, when there is heavy multicollinearity in very sparse data matrices. The safe approach is to replace all data matrices by their PCA object scores.

The function can produce different types of plots depending on the option chosen: "objects" produces two plots of the objects, one in the space of Y, the second in the space of X; "variables" produces two plots of the variables, one of the variables of Y in the space of Y, the second of the variables of X in the space of X; "ov" produces four plots, two of the objects and two of the variables; "biplots" produces two biplots, one for the first matrix (Y) and one for second matrix (X) solutions. For biplots, the function passes all arguments to biplot.default; consult its help page for configuring biplots.

References

Hotelling, H. 1936. Relations between two sets of variates. Biometrika 28: 321-377. Legendre, P. 2005. Species associations: the Kendall coefficient of concordance revisited. Journal of Agricultural, Biological, and Environmental Statistics 10: 226-245.

Examples

Run this code
# Example using two mite groups. The mite data are available in vegan
data(mite)
# Two mite species associations (Legendre 2005, Fig. 4)
group.1 <- c(1,2,4:8,10:15,17,19:22,24,26:30)
group.2 <- c(3,9,16,18,23,25,31:35)
# Separate Hellinger transformations of the two groups of species 
mite.hel.1 <- decostand(mite[,group.1], "hel")
mite.hel.2 <- decostand(mite[,group.2], "hel")
rownames(mite.hel.1) = paste("S",1:nrow(mite),sep="")
rownames(mite.hel.2) = paste("S",1:nrow(mite),sep="")
out <- CCorA(mite.hel.1, mite.hel.2)
out
biplot(out, "ob")                 # Two plots of objects
biplot(out, "v", cex=c(0.7,0.6))  # Two plots of variables
biplot(out, "ov", cex=c(0.7,0.6)) # Four plots (2 for objects, 2 for variables)
biplot(out, "b", cex=c(0.7,0.6))  # Two biplots
biplot(out, xlabs = NA, plot.axes = c(3,5))    # Plot axes 3, 5. No object names
biplot(out, plot.type="biplots", xlabs = NULL) # Replace object names by numbers

# Example using random numbers. No significant relationship is expected
mat1 <- matrix(rnorm(60),20,3)
mat2 <- matrix(rnorm(100),20,5)
out2 = CCorA(mat1, mat2, nperm=99)
out2
biplot(out2, "b")

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