Problems where you have "incomplete information" tend to be addressed well with "Expert Systems" or filtering mechanisms. Remember, "game theory" merely relates to "optimizing a result" (optimizing something at the expense of everything else), so even approaches like expert systems can be codified into actual user-interactive-games.
An "expert system" example of "incomplete information" would be: I need a new car. The universe starts with all "known" cars, or possibly a dynamically (perhaps randomly) generated set of "possible" cars (e.g., different features/models, different manufacturers, different capabilities, etc.) Then, the system can ask me questions, like:
QUESTION: What is most important?
- hauling capacity
- gas mileage
- I don't know
The important thing is the, "I don't know" -- it must be an option for every question, because the answers will result in "filtering" operations (e.g., remove possible cars from the available cars) or "ranking" operations (e.g., sorting some as "preferred" over others).
As it applies specifically to a game engine, you would establish a "universe of possibilities", like hallways you could walk down, tiles on a board, every possible orientation direction, every possible "weapon" that could be used, every possible "enemy individual" or "enemy groups" etc.
Then, based on the game dynamics, your job is ONLY to:
- Based on rules/context/user-input, REMOVE non-viable options.
- Based on rules/context/user-input, SORT/RANK most preferred options.
- The item at the "top of the list" is selected/employed RIGHT NOW in the game.
The reason this type of AI works so well relates to the "fuzzy math" domain (a good Google search on its own), where you can intelligently apply the incomplete information that you have, without considering (or tainting your system with) information you do not have, plus not "trusting" any atomic unit of information all-that-much (because the filtering-and-sorting tends to "average out" errors over time).
If you put a "time coefficient" on your filtering-and-sorting, (answers to old questions are increasingly considered "suspect", and old items that were "filtered out" or "sorted-to-the-bottom" are with increasing probability back-into-play), then you can get a really interesting, and dynamic, and infinitely running game.
And, that "dyanmic" and "infinitely running" game is before you add the stochastic component, which some games have. Games like Minefield and Battleship and Stratego mostly don't change during the running of the game, so your "localized-and-time-decay answers" may be sufficient for a (very) long running game. However, if you randomly generate new enemies, or your enemies move around, or there is some other random component to the "board setup" (like ocean tides where some paths are only sometimes available), then that adds a whole new level of complexity.
Ocean tides obscuring paths may be on a pseudo-regular or pseudo-randomized schedule. However, the "expert system" or "filtering" concept would suggest that you have a (possibly infinite) set of "events" (where the "ocean tide" is an "event"), and you similarly apply filtering-and-ordering to select the RIGHT NOW event (after you used filtering-and-ordering to decide that an "event" should occur at all, as opposed to all the other non-event options).