Theoretical Economics 1 (2006), 275–309

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### Topologies on types

*Eddie Dekel, Drew Fudenberg, Stephen Morris*

#### Abstract

We define and analyze a "strategic topology'' on types in the
Harsanyi-Mertens-Zamir universal type space, where two types are close if their strategic behavior is similar in all strategic situations. For a fixed game and action define the distance between a pair of types as the difference between the smallest epsilon for which the action is epsilon interim correlated rationalizable. We define a strategic topology in which a sequence of types converges if and only if this distance tends to zero for any action and game. Thus a sequence of types converges in the strategic topology if that smallest epsilon
does not jump either up or down in the limit. As applied to sequences, the upper-semicontinuity property is equivalent to convergence in the product topology, but the lower-semicontinuity property is a strictly stronger requirement, as shown by the electronic mail game. In the
strategic topology, the set of "finite types'' (types describable by finite type spaces) is dense but the set of finite common-prior types is not.

Keywords: Rationalizability, incomplete information, common knowledge, universal type space, strategic topology

JEL classification: C70, C72

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