# C# LP/Lagrange with Bounded Variables

Summary: How would I go about solving this problem?

Hi there,

I'm working on a mixture-style maximization problem where my variables are going to be bounded by minima and maxima. A representative example of my problem might be:

``````maximize: (2x-3y+4z)/(x^2+y^2+z^2+3x+4y+5z+10)
subj. to: x+y+z=1
1 < x < 2
-2 < y < 3
5 < z < 8
where numerical coefficients and the minima/maxima are given.
``````

My final project is involving a more complicated problem similar to the one above. The structure of the problems won't change- only the coefficients and inputs will change. So with the example above, I would be looking for a set of functions that might allow a C# program to quickly determine `x`, then `y`, then `z` like:

``````x = f(given inputs)
y = f(given inputs,x)
z = f(given inputs,x,y)
``````

Would love to hear your thoughts on this one!

Thanks!

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Is the denominator in your objective function always positive for all feasible solutions (x,y,z)? I ask, because there is a special purpose algorithm in that case. I doubt whether this is the case in your example, but it often is the case when optimizing a ratio.. –  willem May 27 '11 at 8:49

The standard optimization approach for your type of problem, non-linear minimization, is the Levenberg-Marquardt algorithm:

but unfortunately it does not directly support the linear constraints you have added. Many different approaches have been tried to add linear constraints to Levenberg-Marquardt with varying success.

Another algorithm I can recommend in this situation is the Simplex algorithm:

Like the Levenberg-Marquardt, it also works with non-linear equations but handles linear constraints which act like discontinuities. This could work well for your case above.

In either case, this is not so much a programming problem as an algorithm selection problem. The literature is rife with algorithms and you can find C# implementations of either of the above with a little searching.

You can also combine algorithms. For example, you can do a preliminary search with Simplex with the constraints and the refine it with Levenberg-Marquardt without the constraints.

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