39

I have a matrix in R that is supposed to be symmetric, however, due to machine precision the matrix is never symmetric (the values differ by around 10^-16). Since I know the matrix is symmetric I have been doing this so far to get around the problem:

s.diag = diag(s)
s[lower.tri(s,diag=T)] = 0
s = s + t(s) + diag(s.diag,S)

Is there a better one line command for this?

7 Answers 7

81
s<-matrix(1:25,5)
s[lower.tri(s)] = t(s)[lower.tri(s)]
1
  • 1
    very good! This will also work when when the matrix contains no numbers, but symbols. consider something like s<-matrix(LETTERS[1:25],5)
    – kerzol
    Apr 2, 2015 at 22:51
20

You can force the matrix to be symmetric using forceSymmetric function in Matrix package in R:

library(Matrix)
x<-Matrix(rnorm(9), 3)
> x
3 x 3 Matrix of class "dgeMatrix"
           [,1]       [,2]       [,3]
[1,] -1.3484514 -0.4460452 -0.2828216
[2,]  0.7076883 -1.0411563  0.4324291
[3,] -0.4108909 -0.3292247 -0.3076071

A <- forceSymmetric(x)
> A
3 x 3 Matrix of class "dsyMatrix"
           [,1]       [,2]       [,3]
[1,] -1.3484514 -0.4460452 -0.2828216
[2,] -0.4460452 -1.0411563  0.4324291
[3,] -0.2828216  0.4324291 -0.3076071
10

Is the workaround really necessary if the values only differ by that much?

Someone pointed out that my previous answer was wrong. I like some of the other ones better, but since I can't delete this one (accepted by a user who left), here's yet another solution using the micEcon package:

symMatrix(s[upper.tri(s, TRUE)], nrow=nrow(s), byrow=TRUE)
1
  • This doesnt work. ` > s=matrix(c(1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16), nrow=4) > s[row(s) > col(s)] <- s[row(s) < col(s)] > s [,1] [,2] [,3] [,4] [1,] 1 5 9 13 [2,] 5 6 10 14 [3,] 9 13 11 15 [4,] 10 14 15 16 `
    – KH Kim
    Feb 25, 2014 at 5:28
8
 s<-matrix(1:25,5)
 pmean <- function(x,y) (x+y)/2
 s[] <- pmean(s, matrix(s, nrow(s), byrow=TRUE))
 s
#-------
     [,1] [,2] [,3] [,4] [,5]
[1,]    1    4    7   10   13
[2,]    4    7   10   13   16
[3,]    7   10   13   16   19
[4,]   10   13   16   19   22
[5,]   13   16   19   22   25
1
  • 4
    or just s <- 0.5 * (s + t(s)). I like your approach better since taking the mean is assuming each triangular side is equally correct (or wrong). While other solutions are arbitrarily picking one.
    – flodel
    Aug 10, 2013 at 19:42
3

I was curious to compare all the methods, so ran a quick microbenchmark. Clearly, the simplest 0.5 * (S + t(S)) is the fastest.

The specific function Matrix::forceSymmetric() is sometimes slightly faster, but it returns an object of a different class (dsyMatrix instead of matrix), and converting back to matrix takes a lot of time (although one might argue that it is a good idea to keep the output as dsyMatrix for further gains in computation).

S <-matrix(1:50^2,50)
pick_lower <- function(M) M[lower.tri(M)] = t(M)[lower.tri(M)]

microbenchmark::microbenchmark(micEcon=miscTools::symMatrix(S[upper.tri(S, TRUE)], nrow=nrow(S), byrow=TRUE),
                               Matri_raw =Matrix::forceSymmetric(S),
                               Matri_conv =as.matrix(Matrix::forceSymmetric(S)),
                               pick_lower = pick_lower(S),
                               base =0.5 * (S + t(S)),
                               times=100) 
#> Unit: microseconds
#>        expr    min      lq       mean   median       uq        max neval cld
#>     micEcon 62.133 74.7515  136.49538 104.2430 115.6950   3581.001   100   a
#>   Matri_raw 14.766 17.9130   24.15157  24.5060  26.6050     63.939   100   a
#>  Matri_conv 46.767 59.8165 5621.96140  66.3785  73.5380 555393.346   100   a
#>  pick_lower 27.907 30.7930  235.65058  48.9760  53.0425  12484.779   100   a
#>        base 10.771 12.4535   16.97627  17.1190  18.3175     47.623   100   a

Created on 2021-02-08 by the reprex package (v1.0.0)

0

as.dist() will overwrite the upper triangle of a matrix with the lower one and replace the diagonal with zeros. This method only works on numeric matrices.

mat <- matrix(1:25, 5)

unname(`diag<-`(as.matrix(as.dist(mat)), diag(mat)))

#      [,1] [,2] [,3] [,4] [,5]
# [1,]    1    2    3    4    5
# [2,]    2    7    8    9   10
# [3,]    3    8   13   14   15
# [4,]    4    9   14   19   20
# [5,]    5   10   15   20   25
-2

Inspired by user3318600

    s<-matrix(1:25,5)
    s[lower.tri(s)]<-s[upper.tri(s)]
1
  • To the best of my knowledge this does not actually work (look at the results, or try isSymmetric(). You need to transpose something to get the replacement elements in the right order ...
    – Ben Bolker
    Feb 8, 2021 at 23:00

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