I've been digging around to see if something similar has been done previously, but have not seen anything with the mirrored conditions. To make swallowing the problem a little easier to understand, I'm going to apply it in the context of filling a baseball team roster.
The given roster structure is organized as such: C, 1B, 2B, 3B, SS, 2B/SS (either or), 1B/3B, OF, OF, OF, OF, UT (can be any position)
Every player has at least one of the non-backup positions (positions that allow more than one position) where they're eligible and in many cases more than one (i.e. a player that can play 1B and OF, etc.). Say that you are manager of a team, which already has some players on it and you want to see if you have room for a particular player at any of your slots or if you can move one or more players around to open up a slot where he is eligible.
My initial attempts were to use a conditional permutation and collect in a list all the possible unique "lineups" for each player, updating the open slots before moving to the next player. This also required (since the order that the player was moved would affect what positions were available for the next player) that the list being looped through was reordered and then looped through again. I still think that this is the way to go, but there are a number of pitfalls that have snagged the function.
The data to start the loop that you assume is given is: 1. List of positions the player being evaluated can player (the one being checked if he can fit) 2. List of players currently on the roster and the positions each of those is eligible at (I'm currently storing a list of lists and using the list index as the unique identifier of the player) 3. A list of the positions open as the roster currently is
It's proven a bigger headache than I originally anticipated. It was even suggested to me by a colleague that the situation I have (which involves, on a much larger scale, conditional assignments for each object) was NP-complete. I am certain that it is not, since once a player has been repositioned in a particular lineup being tested, the entire roster should not need to be iterated over again once another player has moved. That's the long and short of it and I finally decided to open it up to the forums.
Thanks for any help anyone can provide. Due to restrictions, I can't post portions of code (some of it is legacy). It is, however, being translated in .NET (C# at the moment). If there's additional information necessary, I'll try and rewrite some of the short pieces of the function for post.
EDITED 07/24/2010 Thank you very much for the responses. I actually did look into using a genetic algorithm, but ultimately abandoned it because of the amount of work that would go into the determination of ordinal results was superfluous. The ultimate aim of the test is to determine if there is, in fact, a scenario that returns a positive. There's no need to determine the relative benefit of each working solution.
I appreciate the feedback on the likely lack of familiarity with the context I presented the problem. The actual model is in the distribution of build commands across multiple platform-specific build servers. It's accessible, but I'd rather not get into why certain build tasks can only be executed on certain systems and why certain systems can only execute certain types of build commands.
It appears that you have gotten the gist of what I was presenting, but here's a different model that's a little less specific. There are a set of discrete positions in an ordered array of lists as such (I'll refer to these as "positions"):
((2), (2), (3), (4), (5), (6), (4, 6), (3, 5), (7), (7), (7), (7), (7), (2, 3, 4, 5, 6, 7))
Additionally, there is a an unordered array of lists (I'll refer to as "employees") that can only occupy one of the slots if its array has a member in common with the ordered list to which it would be assigned. After the initial assignments have been made, if an additional employee comes along, I need to determine if he can fill one of the open positions, and if not, if the current employees can be rearranged to allow one of the positions the employee CAN fill to be made available.
Brute force is something I'd like to avoid, because with this being on the order of 40 - 50 objects (and soon to be increasing), individual determinations will be very expensive to calculate at runtime.