العربية
中国
Français
Deutsch
Ελληνική
हिन्दी
Italiano
日本語
Português
Русский
EspañolCORRESPONDENCE (MATHEMATICS)
In mathematics and mathematical economics, 'correspondence' is a term with several related but not identical meanings.
★ In general mathematics, 'correspondence' is an alternate term for a relation between two sets. Hence a correspondence of sets ''X'' and ''Y'' is any subset of the Cartesian product ''X''×''Y'' of the sets.
★ In economics, a 'correspondence' between two sets ''A'' and ''B'' is a map f:''A''→''P''(''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.
★ In algebraic geometry a 'correspondence' between algebraic varieties ''V'' and ''W'' is in the same fashion a subset ''R'' of ''V''×''W'', which is in addition required to be closed in the Zariski topology. It therefore means any relation that is defined by algebraic equations. There are some important examples, even when ''V'' and ''W'' are algebraic curves: for example the Hecke operators of modular form theory may be considered as correspondences of modular curves.
★ '''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.
★ In general mathematics, 'correspondence' is an alternate term for a relation between two sets. Hence a correspondence of sets ''X'' and ''Y'' is any subset of the Cartesian product ''X''×''Y'' of the sets.
★ In economics, a 'correspondence' between two sets ''A'' and ''B'' is a map f:''A''→''P''(''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.
★ In algebraic geometry a 'correspondence' between algebraic varieties ''V'' and ''W'' is in the same fashion a subset ''R'' of ''V''×''W'', which is in addition required to be closed in the Zariski topology. It therefore means any relation that is defined by algebraic equations. There are some important examples, even when ''V'' and ''W'' are algebraic curves: for example the Hecke operators of modular form theory may be considered as correspondences of modular curves.
★ '''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.
This article provided by Wikipedia. To edit the contents of this article, click here for original source.
psst.. try this: add to faves
