A Characterization of Sequential Equilibrium through -Perfect γ-Sequential Equilibrium with Local Sequential Rationality and Its Computation
Abstract
Sequential equilibrium requires a consistent assessment and sequential rationality, where the consistent assessment emerges from a convergent sequence of totally mixed behavioral strategies and associated beliefs. However, the original definition lacks explicit guidance on constructing such convergent sequences. To overcome this difficulty, this paper presents a characterization of sequential equilibrium by introducing -perfect γ-sequential equilibrium with local sequential rationality. For any γ>0, we establish a perfect γ-sequential equilibrium as a limit point of a sequence of k-perfect γ-sequential equilibrium with k 0. A sequential equilibrium is then derived from a limit point of a sequence of perfect γq-sequential equilibrium with γq 0. This characterization systematizes the construction of convergent sequences and enables the analytical determination of sequential equilibria and the development of a polynomial system serving as a necessary and sufficient condition for -perfect γ-sequential equilibrium. Exploiting the characterization, we develop a differentiable path-following method to compute a sequential equilibrium.
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