Myopic equilibria, the spanning property, and subgame bundles

Abstract: For a set-valued function F on a compact subset W of a manifold, spanning is a topological property that implies that F (x) = ∅ for interior points x of W . A myopic equilibrium applies when for each action there is a payoff whose functional value is not necessarily affine in the strategy space. We show that if the payoffs satisfy the spanning property, then there exist a myopic equilibrium (though not necessarily a Nash equilibrium). Furthermore, given a parametrized collection of games and the spanning prope… Show more