In this paper we consider games with preference relations. The main optimality concept for such games is concept of equilibrium. We introduce a notion of homomorphism for games with preference relations and study a problem concerning connections between equilibrium points of games which are in a homomorphic relation. The main result is finding covariantly and contravariantly complete families of homomorphisms.
For n person games with preference relations some types of optimality solutions are introduced. Elementary properties of their solutions are considered. One sufficient condition for nonempty Ca-core is found.
The concept of the inclusion map of game with preference relations into a game with payoff functions is introduced. Necessary and sufficient conditions of the embeddability of game in factor-game are indicated. A necessary condition and also sufficient conditions for the existence of the inclusion of game with preference relations into a game with payoff functions are found.