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- Creating a symmetric matrix in R 4 answers
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?
This question already has an answer here:
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?
This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.
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
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