Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Is there a function in R that produces the reduced row echelon form of a matrix?. This reference says there isn't. Do you agree?

share|improve this question
up vote 5 down vote accepted

The pracma package also contains an implementation. See pracma:rref.

share|improve this answer

I don't have enough rep to comment, but the function given above in the accepted answer is buggy - it doesn't handle matrices where the RREF solution has zeroes on its main diagonal. Try e.g.

m<-matrix(c(1,0,1,0,0,2),byrow=TRUE,nrow=2) rref(m)

and note that the output is not in RREF.

I think I have it working, but you may want to check outputs for yourself:

rref <- function(A, tol=sqrt(.Machine$double.eps),verbose=FALSE,
                 fractions=FALSE){
  ## A: coefficient matrix
  ## tol: tolerance for checking for 0 pivot
  ## verbose: if TRUE, print intermediate steps
  ## fractions: try to express nonintegers as rational numbers
  ## Written by John Fox
  # Modified by Geoffrey Brent 2014-12-17 to fix a bug
  if (fractions) {
    mass <- require(MASS)
    if (!mass) stop("fractions=TRUE needs MASS package")
  }
  if ((!is.matrix(A)) || (!is.numeric(A)))
    stop("argument must be a numeric matrix")
  n <- nrow(A)
  m <- ncol(A)
  x.position<-1
  y.position<-1
  # change loop:
  while((x.position<=m) & (y.position<=n)){
    col <- A[,x.position]
    col[1:n < y.position] <- 0
    # find maximum pivot in current column at or below current row
    which <- which.max(abs(col))
    pivot <- col[which]
    if (abs(pivot) <= tol) x.position<-x.position+1     # check for 0 pivot
    else{
      if (which > y.position) { A[c(y.position,which),]<-A[c(which,y.position),] } # exchange rows
      A[y.position,]<-A[y.position,]/pivot # pivot
      row <-A[y.position,]
      A <- A - outer(A[,x.position],row) # sweep
      A[y.position,]<-row # restore current row
      if (verbose)
        if (fractions) print(fractions(A))
        else print(round(A,round(abs(log(tol,10)))))
      x.position<-x.position+1
      y.position<-y.position+1
    }
  }
  for (i in 1:n)
    if (max(abs(A[i,1:m])) <= tol)
      A[c(i,n),] <- A[c(n,i),] # 0 rows to bottom
  if (fractions) fractions (A)
  else round(A, round(abs(log(tol,10))))
}
share|improve this answer
    
This does not provide an answer to the question. To critique or request clarification from an author, leave a comment below their post - you can always comment on your own posts, and once you have sufficient reputation you will be able to comment on any post. – lpapp Dec 17 '14 at 3:52
    
Sorry, I'm new here and may have missed something, but: the "accepted answer" provided by soldier.moth above is buggy (as I discovered the hard way when I tried to use it myself!) so I thought it was important to flag that. I don't have enough rep to comment on soldier.moth's answer directly, so I created a new answer - what should I have done here? – Geoffrey Brent Dec 17 '14 at 22:11
    
Gain enough reputation for commenting first? – lpapp Dec 17 '14 at 22:11
1  
shrug I really didn't think anybody would be bothered by me pointing out a non-obvious bug that had gone four years without correction, and given that the buggy "solution" posted above was accepted as an answer, I'm perplexed as to why a fixed version of the same code is considered less so. – Geoffrey Brent Dec 18 '14 at 5:15
1  
@GeoffreyBrent, Welcome to Stackoverflow. Where rules supersede common sense. – Kevin Feb 4 '15 at 3:15

Doesn't look like there is one built in but I found this rref function on this page.

 rref <- function(A, tol=sqrt(.Machine$double.eps),verbose=FALSE,
                 fractions=FALSE){
  ## A: coefficient matrix
  ## tol: tolerance for checking for 0 pivot
  ## verbose: if TRUE, print intermediate steps
  ## fractions: try to express nonintegers as rational numbers
  ## Written by John Fox
  if (fractions) {
    mass <- require(MASS)
    if (!mass) stop("fractions=TRUE needs MASS package")
  }
  if ((!is.matrix(A)) || (!is.numeric(A)))
    stop("argument must be a numeric matrix")
  n <- nrow(A)
  m <- ncol(A)
  for (i in 1:min(c(m, n))){
    col <- A[,i]
    col[1:n < i] <- 0
    # find maximum pivot in current column at or below current row
    which <- which.max(abs(col))
    pivot <- A[which, i]
    if (abs(pivot) <= tol) next     # check for 0 pivot
    if (which > i) A[c(i, which),] <- A[c(which, i),]  # exchange rows
    A[i,] <- A[i,]/pivot            # pivot
    row <- A[i,]
    A <- A - outer(A[,i], row)      # sweep
    A[i,] <- row                    # restore current row
    if (verbose)
      if (fractions) print(fractions(A))
      else print(round(A,round(abs(log(tol,10)))))
  }
  for (i in 1:n)
    if (max(abs(A[i,1:m])) <= tol)
      A[c(i,n),] <- A[c(n,i),] # 0 rows to bottom
  if (fractions) fractions (A)
  else round(A, round(abs(log(tol,10))))
}
share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.