# How to model this kind of artificial intelligence?

while playing to this game I wondered how an AI controlling either the detectives either the criminal could work.

For lazy people the aim of the game is simple:

• the board game is an undirected graphs that has 4 kinds of edges (that can also overlap for same pair or vertices), each kind is a type of transport that requires a specific kind of ticket
• detectives have a bunch of tickets to move around this graph, one move per turn (which means from a node to another node). The criminal can do the same set of moves (plus 3 exclusive paths) but with no limits on tickes
• the criminal is usually hidden to detectives but it has to show up himself in 5 specific turns (and then hide again)
• if detectives are able to catch him (one of them must occupy the same cell of the criminal) before 24 moves then they win, otherwise the criminal wins
• the criminal has to show which ticket he uses each turn but he also has 1 black ticket per detective (let's assume 5) that can be used to vanify this thing
• the criminal also has two 2x tickets that allow him to use two tickets (and so two movements) in the same turn

I can think effectively about an AI for the criminal that it would be just a minmax tree that tries to choose movements that maximize the number of moves needed by detectives to reach him (it seems to be a good metric) but I cannot think anything enough cool for detectives which should cooperate and try to guess where the criminal can be by looking at tickets it uses.

It's just for fun but do you now any cool ideas to work out something quite clever?

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Thank you for the link, I already gave a look to that implementation: as the comment states the problem of the fugitive AI is that it chooses the best move that's not the smarter one. It's just the best according to a distance metric, which doesn't take into account the tricks like likeness to backtrack on moves (maybe to sneak between detectives instead that just get far from them).. –  Jack Jul 17 '10 at 4:32

You've asked how to model this, not how to solve this efficiently:

It can be easily modeled as a partially observable markov decision process (wiki link). This works both for the detectives and the criminal. POMDPs are a very generic model.

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I love this game, and I think for the detectives you want to model the probability that the criminal is at each location. Every once in a while you know the exact position of the criminal, and then you can take into account the following moves he makes to determine which spots he could possibly be at.

Once you have this, I'm not quite sure how to optimize the detectives moves. You can move the detectives to reduce the set of possibilities, effectively corraling the criminal. But I'm sure there is also some higher level strategy needed surrounding the tickets and not running out of them.

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i love it too, it's really strategic although simple.. that's why i ended up mumbling about how to effectively develop an ai.. maybe genetic programming could model different biases of likeness for detectives to follow different approaches like close small spaces rather that try do other thing etc –  Jack Jul 17 '10 at 4:19

I'd imagine some kind of a monte carlo implementation would be an excellent candidate for this, ie. simulating thousands of combinations and choosing the one that ends with the best result most of the time. Since the criminal has to be visible for 5 turns, the branching factor should stay well under control, although MC has also been shown to be a very good technique in games of high branching factor, ie. Go.

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