# Weights for violations in a fitness function

I'm working on my Final year project where I'm developing a Genetic Algorithm for timetable optimization. It's going fairly well at the minute as I am producing random chromosome's representing my classes timetable. I have my function fitness function designed as well as potential constraint, at the minute I am stuck on the actual weighting of my constraints.

I'm using the following function as my fitness function:

1/1 + (Ci*Wci)

As in Ci being the amount of violations for constraint i and Wci being the weighting for constraint i.

Obviously I need to weight the hard constraints higher than the soft constraint.

I was wondering has any1 used this technique before and is there a range recommended to for these weight values?

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If you just add the penalty to an individual's current fitness value there's a catch in that the algorithm might optimize the solution without minimizing the penalties. If the algorithm can reduce the fitness value to a higher degree than the penalty the solution becomes better. In using penalties you should direct the search towards the feasible region in addition to optimizing the quality.

I would suggest to assume a constant, but very bad fitness value for all infeasible solutions to which you add the amount of constraint violation. E.g. the individual with the worst objective in your current population could be a sufficient base value. This has the advantage that you bring together all of the solutions in one order: Infeasible solutions would be compared against each other only in how much they violate the constraints, all feasible solutions would be compared against how well they are and in the global scale there would be feasibility vs infeasibility.

If you don't do this, then you're mixing infeasible and feasible solutions throughout the range of your qualities.

Edit: I also think there's something wrong with your fitness function. You're probably missing parentheses.

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It depends on your problem and the details of the way your algorithm works. Optimal and near-optimal solutions are usually located near constraint boundaries, and it can sometimes be effective to approach them from the infeasible side. Your approach will essentially prevent any infeasible solutions from making it into the population (provide feasible solutions can be found). This might be good, as you say, but it also might be harmful. –  deong Nov 21 '12 at 15:39
@deong Thanks for your advice. I hope I explained myself well enough, as you can see my solution would rate the prefect solution at 1, therefore i'm trying to optimize the score toas close to 1 as possible. I'm a bit lost with this infeasible side of things, surely I am trying to get rid of any infeasible solutions straight away? –  Melo1991 Nov 21 '12 at 15:50