# Corresponding matrix construction

I am working on linkage disequilibrium and the software output is like follows: Figure current

what I actually want is the corresponding half of the matrix as well as 1 on the diagonals like this: Figure anticipated

I was wondering if this can be easily done in R or python? Thanks for helping.

• In which type you get matrix? You want get only algorythm in Python or R to do this with simple 2 dimention list or code must interruct with whis table then get data convert into list and do algorythm? Commented Jul 20, 2017 at 6:14

``````> library(sem)
> mat <- matrix(1:64, 8, 8)
> mat[lower.tri(mat)] <- 0
>
> diag(mat) <- 1
> mat
[,1] [,2] [,3] [,4] [,5] [,6] [,7] [,8]
[1,]    1    9   17   25   33   41   49   57
[2,]    0    1   18   26   34   42   50   58
[3,]    0    0    1   27   35   43   51   59
[4,]    0    0    0    1   36   44   52   60
[5,]    0    0    0    0    1   45   53   61
[6,]    0    0    0    0    0    1   54   62
[7,]    0    0    0    0    0    0    1   63
[8,]    0    0    0    0    0    0    0    1
> mat[lower.tri(mat)] <- t(mat)[lower.tri(mat)]
> mat
[,1] [,2] [,3] [,4] [,5] [,6] [,7] [,8]
[1,]    1    9   17   25   33   41   49   57
[2,]    9    1   18   26   34   42   50   58
[3,]   17   18    1   27   35   43   51   59
[4,]   25   26   27    1   36   44   52   60
[5,]   33   34   35   36    1   45   53   61
[6,]   41   42   43   44   45    1   54   62
[7,]   49   50   51   52   53   54    1   63
[8,]   57   58   59   60   61   62   63    1
``````
• @David, you commented and accepted the other post, not mine! Commented Jul 20, 2017 at 7:31
• @David or you confused with the names ! ? Commented Jul 20, 2017 at 7:33

You can do it with python and numpy easily:

``````import numpy as np

# Create the empty matrix
d = np.zeros((8,8))

# Create the upper triangular matrix
d[0,2:]=1
d[1,2]=0.839
d[1,3]=1
d[1,4:6]=0.736
d[1,6:]=0.864
d[2,3:]=1
d[3,4:]=1
d[4,5:]=1
d[5,6:]=1
d[4:6,7]=0.933
d[6,7]=0.88
print(d)

# Create the full matrix with transpose and identity matrix
dFUll = d + d.T + np.eye(8)
print(dFull)
``````