# How to generate symmetric random matrix?

I want to generate a random matrix which should be symmetric.

I have tried this:

``````matrix(sample(0:1, 25, TRUE), 5, 5)
``````

but it is not necessarily symmetric.

How can I do that?

• So generate half a random matrix and copy it over to the other half. Commented Nov 14, 2014 at 19:17
• Something like `m[lower.tri(m)] <- t(m)[lower.tri(m)]` is rather short.
– qzr
Commented Nov 14, 2014 at 19:36

Another quite interesting opportunity is based on the following mathematical fact: if A is some matrix, then A multiplied by its transpose is always symmetric.

``````> A <- matrix(runif(25), 5, 5)
> A %*% t(A)
[,1]      [,2]      [,3]      [,4]      [,5]
[1,] 1.727769 1.0337816 1.2195505 1.4661507 1.1041355
[2,] 1.033782 1.0037048 0.7368944 0.9073632 0.7643080
[3,] 1.219551 0.7368944 1.8383986 1.3309980 0.9867812
[4,] 1.466151 0.9073632 1.3309980 1.3845322 1.0034140
[5,] 1.104135 0.7643080 0.9867812 1.0034140 0.9376534
``````
• It will not only be symmetric, but also positive definite. Is that something you want? Commented Feb 15, 2019 at 14:34
• @sheß The original post doesn't mention any requirement about being "uniformly distributed". Commented Aug 9, 2019 at 12:17
• that is correct. just wanted to make sure that anyone using this solution is aware that whatever distribution you chose in line 1 of your code does not correspond to the distribution you end up with. that's not per se bad, but it's certainly good to know
– sheß
Commented Aug 9, 2019 at 12:49

Try this from the `Matrix` package

``````library(Matrix)
x<-Matrix(rnorm(9),3)
x
3 x 3 Matrix of class "dgeMatrix"
[,1]       [,2]       [,3]
[1,] -0.9873338  0.8965887 -0.6041742
[2,] -0.3729662 -0.5882091 -0.2383262
[3,]  2.1263985 -0.3550972  0.1067264

X<-forceSymmetric(x)
X
3 x 3 Matrix of class "dsyMatrix"
[,1]       [,2]       [,3]
[1,] -0.9873338  0.8965887 -0.6041742
[2,]  0.8965887 -0.5882091 -0.2383262
[3,] -0.6041742 -0.2383262  0.1067264
``````

If you don't want to use a package:

``````n=3
x <- matrix(rnorm(n*n), n)
ind <- lower.tri(x)
x[ind] <- t(x)[ind]
x
``````

I like this one:

``````n <- 3
aux <- matrix(NA, nrow = n, ncol = n)

for(i in c(1:n)){
for(j in c(i:n)){
aux[i,j] <- sample(c(1:n), 1)
aux[j,i] <- aux[i,j]
}
}
``````