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vegan (version 2.4-2)

decorana: Detrended Correspondence Analysis and Basic Reciprocal Averaging

Description

Performs detrended correspondence analysis and basic reciprocal averaging or orthogonal correspondence analysis.

Usage

decorana(veg, iweigh=0, iresc=4, ira=0, mk=26, short=0, before=NULL, after=NULL)
"plot"(x, choices=c(1,2), origin=TRUE, display=c("both","sites","species","none"), cex = 0.8, cols = c(1,2), type, xlim, ylim, ...)
"text"(x, display = c("sites", "species"), labels, choices = 1:2, origin = TRUE, select, ...)
"points"(x, display = c("sites", "species"), choices=1:2, origin = TRUE, select, ...)
"summary"(object, digits=3, origin=TRUE, display=c("both", "species","sites","none"), ...)
"print"(x, head = NA, tail = head, ...)
downweight(veg, fraction = 5)
"scores"(x, display=c("sites","species"), choices=1:4, origin=TRUE, ...)

Arguments

veg
Community data, a matrix-like object.
iweigh
Downweighting of rare species (0: no).
iresc
Number of rescaling cycles (0: no rescaling).
ira
Type of analysis (0: detrended, 1: basic reciprocal averaging).
mk
Number of segments in rescaling.
short
Shortest gradient to be rescaled.
before
Hill's piecewise transformation: values before transformation.
after
Hill's piecewise transformation: values after transformation -- these must correspond to values in before.
x, object
A decorana result object.
choices
Axes shown.
origin
Use true origin even in detrended correspondence analysis.
display
Display only sites, only species, both or neither.
cex
Plot character size.
cols
Colours used for sites and species.
type
Type of plots, partial match to "text", "points" or "none".
labels
Optional text to be used instead of row names.
select
Items to be displayed. This can either be a logical vector which is TRUE for displayed items or a vector of indices of displayed items.
xlim, ylim
the x and y limits (min,max) of the plot.
digits
Number of digits in summary output.
head, tail
Number of rows printed from the head and tail of species and site scores. Default NA prints all.
fraction
Abundance fraction where downweighting begins.
...
Other arguments for plot function.

Value

decorana returns an object of class "decorana", which has print, summary and plot methods.

Details

In late 1970s, correspondence analysis became the method of choice for ordination in vegetation science, since it seemed better able to cope with non-linear species responses than principal components analysis. However, even correspondence analysis can produce an arc-shaped configuration of a single gradient. Mark Hill developed detrended correspondence analysis to correct two assumed `faults' in correspondence analysis: curvature of straight gradients and packing of sites at the ends of the gradient.

The curvature is removed by replacing the orthogonalization of axes with detrending. In orthogonalization successive axes are made non-correlated, but detrending should remove all systematic dependence between axes. Detrending is performed using a five-segment smoothing window with weights (1,2,3,2,1) on mk segments --- which indeed is more robust than the suggested alternative of detrending by polynomials. The packing of sites at the ends of the gradient is undone by rescaling the axes after extraction. After rescaling, the axis is supposed to be scaled by `SD' units, so that the average width of Gaussian species responses is supposed to be one over whole axis. Other innovations were the piecewise linear transformation of species abundances and downweighting of rare species which were regarded to have an unduly high influence on ordination axes.

It seems that detrending actually works by twisting the ordination space, so that the results look non-curved in two-dimensional projections (`lolly paper effect'). As a result, the points usually have an easily recognized triangular or diamond shaped pattern, obviously an artefact of detrending. Rescaling works differently than commonly presented, too. decorana does not use, or even evaluate, the widths of species responses. Instead, it tries to equalize the weighted variance of species scores on axis segments (parameter mk has only a small effect, since decorana finds the segment number from the current estimate of axis length). This equalizes response widths only for the idealized species packing model, where all species initially have unit width responses and equally spaced modes.

The summary method prints the ordination scores, possible prior weights used in downweighting, and the marginal totals after applying these weights. The plot method plots species and site scores. Classical decorana scaled the axes so that smallest site score was 0 (and smallest species score was negative), but summary, plot and scores use the true origin, unless origin = FALSE.

In addition to proper eigenvalues, the function also reports `decorana values' in detrended analysis. These `decorana values' are the values that the legacy code of decorana returns as `eigenvalues'. They are estimated internally during iteration, and it seems that detrending interferes the estimation so that these values are generally too low and have unclear interpretation. Moreover, `decorana values' are estimated before rescaling which will change the eigenvalues. The proper eigenvalues are estimated after extraction of the axes and they are the ratio of biased weighted variances of site and species scores even in detrended and rescaled solutions. The `decorana values' are provided only for the compatibility with legacy software, and they should not be used.

References

Hill, M.O. and Gauch, H.G. (1980). Detrended correspondence analysis: an improved ordination technique. Vegetatio 42, 47--58.

Oksanen, J. and Minchin, P.R. (1997). Instability of ordination results under changes in input data order: explanations and remedies. Journal of Vegetation Science 8, 447--454.

See Also

For unconstrained ordination, non-metric multidimensional scaling in monoMDS may be more robust (see also metaMDS). Constrained (or ‘canonical’) correspondence analysis can be made with cca. Orthogonal correspondence analysis can be made with corresp, or with decorana or cca, but the scaling of results vary (and the one in decorana corresponds to scaling = "sites" and hill = TRUE in cca.). See predict.decorana for adding new points to an ordination.

Examples

Run this code
data(varespec)
vare.dca <- decorana(varespec)
vare.dca
summary(vare.dca)
plot(vare.dca)

### the detrending rationale:
gaussresp <- function(x,u) exp(-(x-u)^2/2)
x <- seq(0,6,length=15) ## The gradient
u <- seq(-2,8,len=23)   ## The optima
pack <- outer(x,u,gaussresp)
matplot(x, pack, type="l", main="Species packing")
opar <- par(mfrow=c(2,2))
plot(scores(prcomp(pack)), asp=1, type="b", main="PCA")
plot(scores(decorana(pack, ira=1)), asp=1, type="b", main="CA")
plot(scores(decorana(pack)), asp=1, type="b", main="DCA")
plot(scores(cca(pack ~ x), dis="sites"), asp=1, type="b", main="CCA")

### Let's add some noise:
noisy <- (0.5 + runif(length(pack)))*pack
par(mfrow=c(2,1))
matplot(x, pack, type="l", main="Ideal model")
matplot(x, noisy, type="l", main="Noisy model")
par(mfrow=c(2,2))
plot(scores(prcomp(noisy)), type="b", main="PCA", asp=1)
plot(scores(decorana(noisy, ira=1)), type="b", main="CA", asp=1)
plot(scores(decorana(noisy)), type="b", main="DCA", asp=1)
plot(scores(cca(noisy ~ x), dis="sites"), asp=1, type="b", main="CCA")
par(opar)

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