src/library/base/man/isSymmetric.Rd - R - Git at Google

 % File src/library/base/man/isSymmetric.Rd
 % Part of the R package, https://www.R-project.org
 % Copyright 1995-2018 R Core Team
 % Distributed under GPL 2 or later

 \name{isSymmetric}
 \alias{isSymmetric}
 \alias{isSymmetric.matrix}
 \title{Test if a Matrix or other Object is Symmetric (Hermitian)}
 \description{
   Generic function to test if \code{object} is symmetric or not.
   Currently only a matrix method is implemented, where a
   \code{\link{complex}} matrix \code{Z} must be \dQuote{Hermitian} for
   \code{isSymmetric(Z)} to be true.
 }
 \usage{
 isSymmetric(object, \dots)
 \method{isSymmetric}{matrix}(object, tol = 100 * .Machine$double.eps,
             tol1 = 8 * tol, \dots)
 }
 \arguments{
   \item{object}{any \R object; a \code{\link{matrix}} for the matrix method.}
   \item{tol}{numeric scalar >= 0.  Smaller differences are not
     considered, see \code{\link{all.equal.numeric}}.}
   \item{tol1}{numeric scalar >= 0.  \code{isSymmetric.matrix()}
     \sQuote{pre-tests} the first and last few rows for fast detection of
     \sQuote{obviously} asymmetric cases with this tolerance.  Setting it
     to length zero will skip the pre-tests.}
   \item{\dots}{further arguments passed to methods; the matrix method
     passes these to \code{\link{all.equal}}.  If the row and column
     names of \code{object} are allowed to differ for the symmetry check
     do use \code{check.attributes = FALSE}!}
 }
 \value{
   logical indicating if \code{object} is symmetric or not.
 }
 \details{
   The \code{\link{matrix}} method is used inside \code{\link{eigen}} by
   default to test symmetry of matrices \emph{up to rounding error}, using
   \code{\link{all.equal}}.  It might not be appropriate in all
   situations.

   Note that a matrix \code{m} is only symmetric if its \code{rownames} and
   \code{colnames} are identical.  Consider using \code{\link{unname}(m)}.
 }
 \seealso{\code{\link{eigen}} which calls \code{isSymmetric} when its
   \code{symmetric} argument is missing.
 }
 \examples{
 isSymmetric(D3 <- diag(3)) # -> TRUE

 D3[2, 1] <- 1e-100
 D3
 isSymmetric(D3) # TRUE
 isSymmetric(D3, tol = 0) # FALSE for zero-tolerance

 ## Complex Matrices - Hermitian or not
 Z <- sqrt(matrix(-1:2 + 0i, 2)); Z <- t(Conj(Z)) \%*\% Z
 Z
 isSymmetric(Z)      # TRUE
 isSymmetric(Z + 1)  # TRUE
 isSymmetric(Z + 1i) # FALSE -- a Hermitian matrix has a *real* diagonal

 colnames(D3) <- c("X", "Y", "Z")
 isSymmetric(D3)                         # FALSE (as row and column names differ)
 isSymmetric(D3, check.attributes=FALSE) # TRUE  (as names are not checked)
 }
 \keyword{array}
 \keyword{utilities}
	% File src/library/base/man/isSymmetric.Rd
	% Part of the R package, https://www.R-project.org
	% Copyright 1995-2018 R Core Team
	% Distributed under GPL 2 or later

	\name{isSymmetric}
	\alias{isSymmetric}
	\alias{isSymmetric.matrix}
	\title{Test if a Matrix or other Object is Symmetric (Hermitian)}
	\description{
	Generic function to test if \code{object} is symmetric or not.
	Currently only a matrix method is implemented, where a
	\code{\link{complex}} matrix \code{Z} must be \dQuote{Hermitian} for
	\code{isSymmetric(Z)} to be true.
	}
	\usage{
	isSymmetric(object, \dots)
	\method{isSymmetric}{matrix}(object, tol = 100 * .Machine$double.eps,
	tol1 = 8 * tol, \dots)
	}
	\arguments{
	\item{object}{any \R object; a \code{\link{matrix}} for the matrix method.}
	\item{tol}{numeric scalar >= 0. Smaller differences are not
	considered, see \code{\link{all.equal.numeric}}.}
	\item{tol1}{numeric scalar >= 0. \code{isSymmetric.matrix()}
	\sQuote{pre-tests} the first and last few rows for fast detection of
	\sQuote{obviously} asymmetric cases with this tolerance. Setting it
	to length zero will skip the pre-tests.}
	\item{\dots}{further arguments passed to methods; the matrix method
	passes these to \code{\link{all.equal}}. If the row and column
	names of \code{object} are allowed to differ for the symmetry check
	do use \code{check.attributes = FALSE}!}
	}
	\value{
	logical indicating if \code{object} is symmetric or not.
	}
	\details{
	The \code{\link{matrix}} method is used inside \code{\link{eigen}} by
	default to test symmetry of matrices \emph{up to rounding error}, using
	\code{\link{all.equal}}. It might not be appropriate in all
	situations.

	Note that a matrix \code{m} is only symmetric if its \code{rownames} and
	\code{colnames} are identical. Consider using \code{\link{unname}(m)}.
	}
	\seealso{\code{\link{eigen}} which calls \code{isSymmetric} when its
	\code{symmetric} argument is missing.
	}
	\examples{
	isSymmetric(D3 <- diag(3)) # -> TRUE

	D3[2, 1] <- 1e-100
	D3
	isSymmetric(D3) # TRUE
	isSymmetric(D3, tol = 0) # FALSE for zero-tolerance

	## Complex Matrices - Hermitian or not
	Z <- sqrt(matrix(-1:2 + 0i, 2)); Z <- t(Conj(Z)) \%*\% Z
	Z
	isSymmetric(Z) # TRUE
	isSymmetric(Z + 1) # TRUE
	isSymmetric(Z + 1i) # FALSE -- a Hermitian matrix has a real diagonal

	colnames(D3) <- c("X", "Y", "Z")
	isSymmetric(D3) # FALSE (as row and column names differ)
	isSymmetric(D3, check.attributes=FALSE) # TRUE (as names are not checked)
	}
	\keyword{array}
	\keyword{utilities}