I have the following optimization problem and I don't know how to approach it, I'm not even sure if I'd be able to get a closed form solution:
$\min_b \|d-b\| \\ \text{s.t.} Ab < y $ I'm trying to find the vector $b$ that is closest to the vector $d$ (known) in terms of Euclidean distance. Both $d$ and $b$ are $N$-dimensional vectors.
$A$ is an $M\times N$ matrix and is known, $y$ is an $M$-dimensional vector and is also known.
Any guidance on which optimization method I should use would be of great help.
Finding closest vector subject to a constraint
2
$\begingroup$
linear-algebra
optimization
-
1Presumably you want $\le$ rather than <, otherwise there is no optimal solution. – 2012-08-16