I have been working on a multi-objective optimization problem which uses a genetic algorithm to display the best solution for over a year now.
The problem involves assigning people to different teams according to a number of criteria. I have already completed the initialisation stage and the fitness function coding is completed as well. However, I am having trouble saving the generated (2d array) solutions as objects and keep them in memory temporarily so that they can be used in later stages of GA: Selection, Crossover and Mutation.
I am using the roulette-wheel selection and slightly different crossover and mutation algorithms. I don't have a problem with these. It's just that I have not been able to find a way to save 1 generated solution (in this case complete team allocation) in memory temporarily and then generate another solution and keep that in memory and then another and so on.
I have tried quite a lot of different things that i could think of, from which two that I can remember are: (i) changed the 2d array type from int to Object but this gave an error as the 2d array that creates teams uses another int array to locate person id index position in the list; (ii) using static class field variable which is to be incremented each time after the initial population generation class is run.
I have researched this for months now and tried everything I could think of. If someone could direct me or even give me a hint as to how I could save a 2d array so that I can use it for later stages of GA would be of great help.
Thanks
edited: This is the initial population class that has the 2d array bit which creates the teams: each row represents team number and columns are the member ids (i have excluded some code which referred to other classes and instead put that in words):
int
toObject
isn't a good idea, you'd want to at least bump up toInteger
if you could see an advantage using the wrapper class.noTeams
is populated with an integer value? If it is, the reason your arrays won't work is because you allocate no space in the first dimension.