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I know A'A will give a symmetric positive definite matrix. But how can I generate random matrix in R that is symmetric, but not necessary to be positive definite?

marked as duplicate by 989, Maurits Evers, Community Jan 17 '18 at 21:28

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  • @MrFlick I know how to write a for loop, but want a vectorized implementation in R – hxd1011 Jan 17 '18 at 20:50
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The details will of course depend on what distribution you'll want the matrix elements to have, but once you settle on that, you can adapt something like the following:

m <- matrix(sample(1:20, 36, replace=TRUE), nrow=6)
m[lower.tri(m)] <- t(m)[lower.tri(m)]
m
#      [,1] [,2] [,3] [,4] [,5] [,6]
# [1,]   19   20   15    6    5   14
# [2,]   20   20   20    3   18   17
# [3,]   15   20    6    5   11    3
# [4,]    6    3    5    6    9   20
# [5,]    5   18   11    9   10    2
# [6,]   14   17    3   20    2    7

For ease of use, you can then wrap up code like that in a function, like so:

f <- function(n) {
    m <- matrix(sample(1:20, n^2, replace=TRUE), nrow=n)
    m[lower.tri(m)] <- t(m)[lower.tri(m)]
    m
}

## Try it out
f(2)
#      [,1] [,2]
# [1,]    9   13
# [2,]   13   15
f(3)
#      [,1] [,2] [,3]
# [1,]    1    8    3
# [2,]    8   13    5
# [3,]    3    5   14
  • I tried A[lower.tri(A)]=A[upper.tri(A)], it is not working... – hxd1011 Jan 17 '18 at 20:51
  • Try A[lower.tri(A)]=t(A)[upper.tri(A)] instead of A[lower.tri(A)]=A[upper.tri(A)]. (i.e. replace A with t(A) on the right hand side. – Josh O'Brien Jan 17 '18 at 20:56
  • @hxd1011 You bet. Cheers. – Josh O'Brien Jan 17 '18 at 21:11

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