This paper offers a resolution to an extensively studied question in theoretical economics: which measure spaces are suitable for modeling many economic agents? We propose the condition of "nowhere equivalence" to characterize those measure spaces that can be effectively used to model the space of many agents. In particular, this condition is shown to be more general than various approaches that have been proposed to handle the shortcoming of the Lebesgue unit interval as an agent space. We illustrate the minimality of the nowhere equivalence condition by showing its necessity in deriving the determinateness property, the existence of equilibria, and the closed graph property for equilibrium correspondences in general equilibrium theory and game theory.
We introduce the "relative diffuseness" assumption to characterize the
differences between payoff-relevant and strategy-relevant diffuseness of
information. Based on this assumption, the existence of pure strategy
equilibria in games with incomplete information and general action spaces can
be obtained. Moreover, we introduce a new notion of "undistinguishable
purification" which strengthens the standard purification concept, and its
existence follows from the relative diffuseness assumption.Comment: 17 page
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