\name{rcond} \title{Estimate the Reciprocal Condition Number} \alias{rcond} % most methods are documented in Matrix-class.Rd \alias{rcond,ANY,missing-method} \alias{rcond,matrix,character-method}%<- no longer for R >= 2.7.0 \alias{rcond,Matrix,character-method} \alias{rcond,ldenseMatrix,character-method} \alias{rcond,ndenseMatrix,character-method} % \usage{ rcond(x, norm, \dots) } \description{ Estimate the reciprocal of the condition number of a matrix. This is a generic function with several methods, as seen by \code{\link{showMethods}(rcond)}. } \arguments{ \item{x}{an \R object that inherits from the \code{Matrix} class.} \item{norm}{ Character indicating the type of norm to be used in the estimate. The default is \code{"O"} for the 1-norm (\code{"O"} is equivalent to \code{"1"}). The other possible value is \code{"I"} for the infinity norm, see also \code{\link{norm}}. } \item{\dots}{further arguments passed to or from other methods.} } \value{ An estimate of the reciprocal condition number of \code{x}. } \section{BACKGROUND}{ The condition number of a regular (square) matrix is the product of the \code{\link{norm}} of the matrix and the norm of its inverse (or pseudo-inverse). More generally, the condition number is defined (also for non-square matrices \eqn{A}) as \deqn{\kappa(A) = \frac{\max_{\|v\| = 1} \|A v\|}{\min_{\|v\| = 1} \|A v\|}.}{% kappa(A) = (max_(||v|| = 1; || Av ||)) /(min_(||v|| = 1; || Av ||)).} Whenever \code{x} is \emph{not} a square matrix, in our method definitions, this is typically computed via \code{rcond(qr.R(qr(X)), ...)} where \code{X} is \code{x} or \code{t(x)}. The condition number takes on values between 1 and infinity, inclusive, and can be viewed as a factor by which errors in solving linear systems with this matrix as coefficient matrix could be magnified. \code{rcond()} computes the \emph{reciprocal} condition number \eqn{1/\kappa} with values in \eqn{[0,1]} and can be viewed as a scaled measure of how close a matrix is to being rank deficient (aka \dQuote{singular}). Condition numbers are usually estimated, since exact computation is costly in terms of floating-point operations. An (over) estimate of reciprocal condition number is given, since by doing so overflow is avoided. Matrices are well-conditioned if the reciprocal condition number is near 1 and ill-conditioned if it is near zero. } \seealso{ \code{\link{norm}}, \code{\link[base]{kappa}()} from package \pkg{base} computes an \emph{approximate} condition number of a \dQuote{traditional} matrix, even non-square ones, with respect to the \eqn{p=2} (Euclidean) \code{\link{norm}}. \code{\link[base]{solve}}. } \references{ Golub, G., and Van Loan, C. F. (1989). \emph{Matrix Computations,} 2nd edition, Johns Hopkins, Baltimore. %% For sparse matrices, Matlab's condest() uses normest(), which is %% based on this. See also Tim Davis(2006, p.96) %% We should use a version of this {and probably optim(.)}: %% % @article{ higham00block, % author = "Nicholas J. Higham and Fran{\c{c}}oise Tisseur", % title = "A Block Algorithm for Matrix $1$-Norm Estimation, % with an Application to $1$-Norm Pseudospectra", % journal = "SIAM Journal on Matrix Analysis and Applications", % volume = "21", % number = "4", % pages = "1185--1201", % year = "2000", % url = "citeseer.ist.psu.edu/article/higham00block.html" } } \examples{ x <- Matrix(rnorm(9), 3, 3) rcond(x) ## typically "the same" (with more computational effort): 1 / (norm(x) * norm(solve(x))) rcond(Hilbert(9)) # should be about 9.1e-13 ## For non-square matrices: rcond(x1 <- cbind(1,1:10))# 0.05278 rcond(x2 <- cbind(x1, 2:11))# practically 0, since x2 does not have full rank ## sparse (S1 <- Matrix(rbind(0:1,0, diag(3:-2)))) rcond(S1) m1 <- as(S1, "denseMatrix") all.equal(rcond(S1), rcond(m1)) ## wide and sparse rcond(Matrix(cbind(0, diag(2:-1)))) } \keyword{array} \keyword{algebra}