# Changing representations: Upper triangular matrix and compact vector (Octave / Matlab)

Given a matrix A, that has zeros on its diagonal and its lower triangular part:

``````A = triu(rand(5,5), 1) % example

A =
0.00000   0.47474   0.55853   0.30159   0.97474
0.00000   0.00000   0.03315   0.74577   0.20878
0.00000   0.00000   0.00000   0.54966   0.76818
0.00000   0.00000   0.00000   0.00000   0.82598
0.00000   0.00000   0.00000   0.00000   0.00000
``````

I want to convert A into a compact vector v that skips all the zero elements:

``````v = [0.47474 0.55853 0.30159 0.97474 0.03315
0.74577 0.20878 0.54966 0.76818 0.82598]
``````

Later I want to convert from the vector back to the matrix.

Question: What is an elegant way to convert between these two representations?

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I would start with an upper triangular matrix of ones

``````B = triu(ones(5,5), 1)
``````

And Then v can be defined as:

``````v = A(B==1)
``````

Converting back from v to A

``````A = B
A(B==1) = v
``````
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Neat ! and another few characters –  High Performance Mark Nov 12 '12 at 14:40

Because Matlab stores arrays in column-major order I couldn't do this in one statement, well not yet, but here's a two statement solution:

``````B = A';

v = B(B~=0)'
``````

@dustincarr's answer renders further work by me redundant.

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