We study noncooperative games, in which each agent's objective is composed of a sequence of ordered-and potentially conflicting-preferences. Problems of this type naturally model a wide variety of scenarios: for example, drivers at a busy intersection must balance the desire to make forward progress with the risk of collision. Mathematically, these problems possess a nested structure, and to behave properly agents must prioritize their most important preference, and only consider less important preferences to the extent that they do not compromise performance on more important ones. We consider multi-agent, noncooperative variants of these problems, and seek generalized Nash equilibria in which each agent's decision reflects both its hierarchy of preferences and other agents' actions. We make two key contributions. First, we develop a recursive approach for deriving the first-order optimality conditions of each agent's nested problem. Second, we propose a sequence of increasingly tight relaxations, each of which can be transcribed as a mixed complementarity problem and solved via existing methods. Experimental results demonstrate that our approach reliably converges to equilibrium solutions that strictly reflect agents' individual ordered preferences.

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