% File src/library/stats/man/influence.measures.Rd % Part of the R package, https://www.R-project.org % Copyright 1995-2022 R Core Team % Distributed under GPL 2 or later \name{influence.measures} \title{Regression Deletion Diagnostics} \concept{studentized residuals} \concept{standardized residuals} \concept{Cook's distances} \concept{Covariance ratios} \concept{\I{DFBETAs}} \concept{\I{DFFITs}} \concept{\I{PRESS}} \alias{influence.measures} %\alias{print.infl} %\alias{summary.infl} <- To document: has 'digits' & return()s \alias{hat} \alias{hatvalues} \alias{hatvalues.lm} \alias{rstandard} \alias{rstandard.lm} \alias{rstandard.glm} \alias{rstudent} \alias{rstudent.lm} \alias{rstudent.glm} \alias{dfbeta} \alias{dfbeta.lm} \alias{dfbetas} \alias{dfbetas.lm} \alias{dffits} \alias{covratio} \alias{cooks.distance} \alias{cooks.distance.lm} \alias{cooks.distance.glm} \usage{ influence.measures(model, infl = influence(model)) rstandard(model, \dots) \method{rstandard}{lm}(model, infl = lm.influence(model, do.coef = FALSE), sd = sqrt(deviance(model)/df.residual(model)), type = c("sd.1", "predictive"), \dots) \method{rstandard}{glm}(model, infl = influence(model, do.coef = FALSE), type = c("deviance", "pearson"), \dots) rstudent(model, \dots) \method{rstudent}{lm}(model, infl = lm.influence(model, do.coef = FALSE), res = infl$wt.res, \dots) \method{rstudent}{glm}(model, infl = influence(model, do.coef = FALSE), \dots) dffits(model, infl = , res = ) dfbeta(model, \dots) \method{dfbeta}{lm}(model, infl = lm.influence(model, do.coef = TRUE), \dots) dfbetas(model, \dots) \method{dfbetas}{lm}(model, infl = lm.influence(model, do.coef = TRUE), \dots) covratio(model, infl = lm.influence(model, do.coef = FALSE), res = weighted.residuals(model)) cooks.distance(model, \dots) \method{cooks.distance}{lm}(model, infl = lm.influence(model, do.coef = FALSE), res = weighted.residuals(model), sd = sqrt(deviance(model)/df.residual(model)), hat = infl$hat, \dots) \method{cooks.distance}{glm}(model, infl = influence(model, do.coef = FALSE), res = infl$pear.res, dispersion = summary(model)$dispersion, hat = infl$hat, \dots) hatvalues(model, \dots) \method{hatvalues}{lm}(model, infl = lm.influence(model, do.coef = FALSE), \dots) hat(x, intercept = TRUE) } \arguments{ \item{model}{an \R object, typically returned by \code{\link{lm}} or \code{\link{glm}}.} \item{infl}{influence structure as returned by \code{\link{lm.influence}} or \code{\link{influence}} (the latter only for the \code{glm} method of \code{rstudent} and \code{cooks.distance}).} \item{res}{(possibly weighted) residuals, with proper default.} \item{sd}{standard deviation to use, see default.} \item{dispersion}{dispersion (for \code{\link{glm}} objects) to use, see default.} \item{hat}{hat values \eqn{H_{ii}}{H[i,i]}, see default.} \item{type}{type of residuals for \code{rstandard}, with different options and meanings for \code{lm} and \code{glm}. Can be abbreviated.} \item{x}{the \eqn{X} or design matrix.} \item{intercept}{should an intercept column be prepended to \code{x}?} \item{\dots}{further arguments passed to or from other methods.} } \description{ This suite of functions can be used to compute some of the regression (leave-one-out deletion) diagnostics for linear and generalized linear models discussed in \bibcite{Belsley, Kuh and Welsch (1980)}, \bibcite{Cook and Weisberg (1982)}, etc. } \details{ The primary high-level function is \code{influence.measures} which produces a class \code{"infl"} object tabular display showing the \I{DFBETA}s for each model variable, \I{DFFIT}s, covariance ratios, Cook's distances and the diagonal elements of the hat matrix. Cases which are influential with respect to any of these measures are marked with an asterisk. The functions \code{dfbetas}, \code{dffits}, \code{covratio} and \code{cooks.distance} provide direct access to the corresponding diagnostic quantities. Functions \code{rstandard} and \code{rstudent} give the standardized and Studentized residuals respectively. (These re-normalize the residuals to have unit variance, using an overall and leave-one-out measure of the error variance respectively.) Note that for \emph{multivariate} \code{lm()} models (of class \code{"mlm"}), these functions return 3d arrays instead of matrices, or matrices instead of vectors. Values for generalized linear models are approximations, as described in Williams (1987) (except that Cook's distances are scaled as \eqn{F} rather than as chi-square values). The approximations can be poor when some cases have large influence. The optional \code{infl}, \code{res} and \code{sd} arguments are there to encourage the use of these direct access functions, in situations where, e.g., the underlying basic influence measures (from \code{\link{lm.influence}} or the generic \code{\link{influence}}) are already available. Note that cases with \code{weights == 0} are \emph{dropped} from all these functions, but that if a linear model has been fitted with \code{na.action = na.exclude}, suitable values are filled in for the cases excluded during fitting. For linear models, \code{rstandard(*, type = "predictive")} provides leave-one-out cross validation residuals, and the \dQuote{PRESS} statistic (\I{\bold{PRE}dictive \bold{S}um of \bold{S}quares}, the same as the CV score) of model \code{model} is \preformatted{ PRESS <- sum(rstandard(model, type="pred")^2)} The function \code{hat()} exists mainly for S (version 2) compatibility; we recommend using \code{hatvalues()} instead. } \note{ For \code{hatvalues}, \code{dfbeta}, and \code{dfbetas}, the method for linear models also works for generalized linear models. } \author{ Several R core team members and John Fox, originally in his \file{car} package. } \references{ Belsley, D. A., Kuh, E. and Welsch, R. E. (1980). \emph{Regression Diagnostics}. New York: Wiley. Cook, R. D. and Weisberg, S. (1982). \emph{Residuals and Influence in Regression}. London: Chapman and Hall. Williams, D. A. (1987). Generalized linear model diagnostics using the deviance and single case deletions. \emph{Applied Statistics}, \bold{36}, 181--191. \doi{10.2307/2347550}. Fox, J. (1997). \emph{Applied Regression, Linear Models, and Related Methods}. Sage. Fox, J. (2002) \emph{An R and S-Plus Companion to Applied Regression}. Sage Publ. Fox, J. and Weisberg, S. (2011). \emph{An R Companion to Applied Regression}, second edition. Sage Publ; \url{https://socialsciences.mcmaster.ca/jfox/Books/Companion/}. } \seealso{ \code{\link{influence}} (containing \code{\link{lm.influence}}). \sQuote{\link{plotmath}} for the use of \code{hat} in plot annotation. } \examples{ require(graphics) ## Analysis of the life-cycle savings data ## given in Belsley, Kuh and Welsch. lm.SR <- lm(sr ~ pop15 + pop75 + dpi + ddpi, data = LifeCycleSavings) inflm.SR <- influence.measures(lm.SR) which(apply(inflm.SR$is.inf, 1, any)) # which observations 'are' influential summary(inflm.SR) # only these \donttest{inflm.SR # all} plot(rstudent(lm.SR) ~ hatvalues(lm.SR)) # recommended by some plot(lm.SR, which = 5) # an enhanced version of that via plot() ## The 'infl' argument is not needed, but avoids recomputation: rs <- rstandard(lm.SR) iflSR <- influence(lm.SR) all.equal(rs, rstandard(lm.SR, infl = iflSR), tolerance = 1e-10) ## to "see" the larger values: 1000 * round(dfbetas(lm.SR, infl = iflSR), 3) cat("PRESS :"); (PRESS <- sum( rstandard(lm.SR, type = "predictive")^2 )) stopifnot(all.equal(PRESS, sum( (residuals(lm.SR) / (1 - iflSR$hat))^2))) ## Show that "PRE-residuals" == L.O.O. Crossvalidation (CV) errors: X <- model.matrix(lm.SR) y <- model.response(model.frame(lm.SR)) ## Leave-one-out CV least-squares prediction errors (relatively fast) rCV <- vapply(seq_len(nrow(X)), function(i) y[i] - X[i,] \%*\% .lm.fit(X[-i,], y[-i])$coefficients, numeric(1)) ## are the same as the *faster* rstandard(*, "pred") : stopifnot(all.equal(rCV, unname(rstandard(lm.SR, type = "predictive")))) ## Huber's data [Atkinson 1985] xh <- c(-4:0, 10) yh <- c(2.48, .73, -.04, -1.44, -1.32, 0) lmH <- lm(yh ~ xh) \donttest{summary(lmH)} im <- influence.measures(lmH) \donttest{ im } is.inf <- apply(im$is.inf, 1, any) plot(xh,yh, main = "Huber's data: L.S. line and influential obs.") abline(lmH); points(xh[is.inf], yh[is.inf], pch = 20, col = 2) ## Irwin's data [Williams 1987] xi <- 1:5 yi <- c(0,2,14,19,30) # number of mice responding to dose xi mi <- rep(40, 5) # number of mice exposed glmI <- glm(cbind(yi, mi -yi) ~ xi, family = binomial) \donttest{summary(glmI)} signif(cooks.distance(glmI), 3) # ~= Ci in Table 3, p.184 imI <- influence.measures(glmI) \donttest{ imI } stopifnot(all.equal(imI$infmat[,"cook.d"], cooks.distance(glmI))) } \keyword{regression}