The question on games and mathematics that appeared recently on mathoverflow
(http://mathoverflow.net/questions/13638/which-popular-games-are-the-most-mathematical)
reminded me of a problem I encountered some time ago : starting with the insane
dream of completely solving the game of bridge with a nice mathematical theory,
I ended up considering extremely simplified versions of bridge. One of them was 
as follows : there are only 2 players instead of 4, and instead of the usual
deck there are only 2n cards numbered from 1 to 2n. Each player holds half 
of the deck, so this is a "complete information" game : each player knows exactly
what is in his opponent's hand. There are no bids, just a sequence of n moves
where each player drops a card ; as in bridge the strongest card wins the trick
and the winner of the game is the player with the largest number of tricks
in the end (take n odd to avoid draws). Also, the winner of the preceding
trick is the first to play (for the very first move the first player is determined
by some rule, random or other ; this is immaterial to the subsequent discussion).

   This looks like a very basic kind of game, especially amenable to 
mathematization : for example the set of all initial positions is nicely indexed
by the subsets $I$ of $\lbrace 1,2, \ldots , 2n\rbrace$ whose cardinality is $n$
(say $I$ is the set of cards held by the first player). I was
however unable to answer the following questions :

   - Is there an algorithm which, given the initial position, finds out which player
will win if each one plays optimally ? What is the best strategy ?

  - Has this game already been studied by combinatorialists ?