Clear Filters
Clear Filters

Set "not equal to" constraint for a linear system of equations solver:

3 views (last 30 days)
Ash Ash
Ash Ash on 9 Jul 2018
Commented: Walter Roberson on 17 Jul 2018
Hi, I'm looking to set a constraint for the solution to my linear system of equations
Cx=D
such that
x~=0
or
|x|>eps
I'm currently looking at lsqlin() but it seems that I am not able to do this. Would you please let me know how can I do this with lsqlin() or another function, if it is possible?
Thank you.
  3 Comments
Show 1 older comment
Walter Roberson
Walter Roberson on 17 Jul 2018
What is your situation such that it would not be permitted for any component to be 0, but it would be acceptable for the component to be 4.94065645841247e-324 ?

Sign in to comment.

Sign in to answer this question.

Accepted Answer

Walter Roberson
Walter Roberson on 10 Jul 2018
There is no direct way to do that.
You need to run your solver multiple 2^N times where N is the length of your x vector. Each position in the vector needs to be considered with a lower bound of -inf and an upper bound of -eps(realmin), and then again with a lower bound of +eps(realmin) and an upper bound of +inf . Then out of all of those 2^N solutions, you have to somehow figure out which one is "best".

More Answers (1)

Matt J
Matt J on 14 Jul 2018
Edited: Matt J on 14 Jul 2018
You may as well just find the solution x without this constraint and then add random noise.
x=x + eps.*(x==0).*rand(size(x));
You are not going to get a better solution by attempting rigorous numerical optimization, subject to |x(i)|>=eps.
Remember that these solvers are iterative approximators - you would have to iterate for ages to get within eps of the actual solution you are looking for, even assuming that floating point arithmetic errors would allow such precise convergence at all. And since you can't get within eps of the ideal solution, you may as well accept any solution that is eps or more away from the ideal solution, e.g., the solution without the |x(i)|>=eps constraint or some random perturbation of it.

Categories

Find more on Linear Least Squares in Help Center and File Exchange

Tags

Products

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!