Hi,
I have a matrix : $W=I+U^TV$
I need it to be orthogonal ie $W^TW=I$
which gives me : $V^TU+U^TV+V^TUU^TV=0$
From that point, i don't know where to go. Have anyone got some ideas about that issue ?
Cheers
Guillaume
This should be a comment. I think this question is not apt here. You should consider posting questions like these at math.stackexchange.
Given $U$ and if it is full rank, we can choose $$V = -2 \left(UU^T \right)^{-1}U$$ and the matrix $$W = I - 2 U^T \left(UU^T \right)^{-1}U$$ is an orthonormal matrix. A special case of this is provided by Jeff.
Do you want a general solution or simply a good family of examples? If you want examples, let $V=-U=\sqrt{2} S^T$ where $S$ is an isometry from $\mathbb{R}^N$ into $\mathbb{R}^D$.
