rankMM: Simple Matrix Rank

View source: R/classPC.R

rankMMR Documentation

Simple Matrix Rank

Description

Compute the rank of a matrix A in simple way, based on the SVD, svd(), and “the same as Matlab”.

Usage

rankMM(A, tol = NULL, sv = svd(A, 0, 0)$d)

Arguments

A

a numerical matrix, maybe non-square. When sv is specified, only dim(A) is made use of.

tol

numerical tolerance (compared to singular values). By default, when NULL, the tolerance is determined from the maximal value of sv and the computer epsilon.

sv

vector of non-increasing singular values of A, (to be passed if already known).

Value

an integer from the set 0:min(dim(A)).

Author(s)

Martin Maechler, Date: 7 Apr 2007

See Also

There are more sophisticated proposals for computing the rank of a matrix; for a couple of those, see rankMatrix in the Matrix package.

Examples

rankMM # - note the simple function definition

hilbert <- function(n) { i <- seq_len(n); 1/outer(i - 1L, i, "+") }
hilbert(4)
H12 <- hilbert(12)
rankMM(H12)        # 11 - numerically more realistic
rankMM(H12, tol=0) # -> 12
## explanation :
round(log10(svd(H12, 0,0)$d), 1)

robustbase documentation built on Sept. 27, 2024, 5:09 p.m.