Correspondence (mathematics)

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In mathematics and mathematical economics, correspondence is a term with several related but not identical meanings.

  • In economics, a correspondence between two sets A and B is a map f:AP(B) from the elements of the set A to the power set of B. This is similar to a correspondence as defined in general mathematics (i.e., a relation,) except that the range is over sets instead of elements. However, there is usually the additional property that for all a in A, f(a) is not empty. In other words, each element in A maps to a non-empty subset of B; or in terms of a relation R as subset of A×B, R projects to A surjectively. A correspondence with this additional property is thought of as the generalization of a function, rather than as a special case of a relation, and is referred to in other contexts as a multivalued function.
An example of a correspondence in this sense is the best response correspondence in game theory, which gives the optimal action for a player as a function of the strategies of all other players. If there is always a unique best action given what the other players are doing, then this is a function. If for some opponent's strategy, there is a set of best responses that are equally good, then this is a correspondence.
  • One-to-one correspondence is an alternate name for a bijection.
  • In von Neumann algebra theory, a correspondence is a synonym for a von Neumann algebra bimodule.
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