Resistant Estimation of Multivariate Location and Scatter
Compute a multivariate location and scale estimate with a high
breakdown point – this can be thought of as estimating the mean and
covariance of the good
part of the data. cov.mve
and
cov.mcd
are compatibility wrappers.
cov.rob(x, cor = FALSE, quantile.used = floor((n + p + 1)/2), method = c("mve", "mcd", "classical"), nsamp = "best", seed) cov.mve(...) cov.mcd(...)
x |
a matrix or data frame. |
cor |
should the returned result include a correlation matrix? |
quantile.used |
the minimum number of the data points regarded as |
method |
the method to be used – minimum volume ellipsoid, minimum
covariance determinant or classical product-moment. Using
|
nsamp |
the number of samples or |
seed |
the seed to be used for random sampling: see |
... |
arguments to |
For method "mve"
, an approximate search is made of a subset of
size quantile.used
with an enclosing ellipsoid of smallest volume; in
method "mcd"
it is the volume of the Gaussian confidence
ellipsoid, equivalently the determinant of the classical covariance
matrix, that is minimized. The mean of the subset provides a first
estimate of the location, and the rescaled covariance matrix a first
estimate of scatter. The Mahalanobis distances of all the points from
the location estimate for this covariance matrix are calculated, and
those points within the 97.5% point under Gaussian assumptions are
declared to be good
. The final estimates are the mean and rescaled
covariance of the good
points.
The rescaling is by the appropriate percentile under Gaussian data; in addition the first covariance matrix has an ad hoc finite-sample correction given by Marazzi.
For method "mve"
the search is made over ellipsoids determined
by the covariance matrix of p
of the data points. For method
"mcd"
an additional improvement step suggested by Rousseeuw and
van Driessen (1999) is used, in which once a subset of size
quantile.used
is selected, an ellipsoid based on its covariance
is tested (as this will have no larger a determinant, and may be smaller).
There is a hard limit on the allowed number of samples, 2^31 - 1. However, practical limits are likely to be much lower
and one might check the number of samples used for exhaustive
enumeration, combn(NROW(x), NCOL(x) + 1)
, before attempting it.
A list with components
center |
the final estimate of location. |
cov |
the final estimate of scatter. |
cor |
(only is |
sing |
message giving number of singular samples out of total |
crit |
the value of the criterion on log scale. For MCD this is the determinant, and for MVE it is proportional to the volume. |
best |
the subset used. For MVE the best sample, for MCD the best
set of size |
n.obs |
total number of observations. |
P. J. Rousseeuw and A. M. Leroy (1987) Robust Regression and Outlier Detection. Wiley.
A. Marazzi (1993) Algorithms, Routines and S Functions for Robust Statistics. Wadsworth and Brooks/Cole.
P. J. Rousseeuw and B. C. van Zomeren (1990) Unmasking multivariate outliers and leverage points, Journal of the American Statistical Association, 85, 633–639.
P. J. Rousseeuw and K. van Driessen (1999) A fast algorithm for the minimum covariance determinant estimator. Technometrics 41, 212–223.
P. Rousseeuw and M. Hubert (1997) Recent developments in PROGRESS. In L1-Statistical Procedures and Related Topics ed Y. Dodge, IMS Lecture Notes volume 31, pp. 201–214.
set.seed(123) cov.rob(stackloss) cov.rob(stack.x, method = "mcd", nsamp = "exact")
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