Correspondence (mathematics)

In mathematics, the concept of correspondence is a more precise specification of the concept of a multi-valued function or multifunction, which is more common in the older mathematical literature . While a function in the usual sense assigns a single element of the target set as a function value to each element of the definition set, several elements of the target set can be assigned to one element of the definition set in a multi-valued function. In the concept of correspondence, these multiple function values are combined to form a set (i.e. a subset of the target set). A correspondence from a set to a set is thus a function that assigns a subset of to each element of . ${\ displaystyle A}$ ${\ displaystyle B}$ ${\ displaystyle A}$ ${\ displaystyle B}$

definition

A correspondence from a set to a set is a mapping of into the power set of . ${\ displaystyle A}$ ${\ displaystyle B}$ ${\ displaystyle \ phi}$ ${\ displaystyle A}$ ${\ displaystyle B}$

notation

A correspondence from to is written as: ${\ displaystyle A}$ ${\ displaystyle B}$

${\ displaystyle \ phi \ colon A \ multimap B}$ or. ${\ displaystyle \ phi \ colon A \ to {\ mathfrak {P}} (B)}$

Correspondence as a relation

A correspondence from to can be identified with the relation , because the definition gives back the correspondence from the relation . For details see: ${\ displaystyle \ phi}$ ${\ displaystyle A}$ ${\ displaystyle B}$ ${\ displaystyle R = \ {(a, b) \ in A \ times B \ mid b \ in \ phi (a) \}}$ ${\ displaystyle R \ subseteq A \ times B}$ ${\ displaystyle \ phi (a): = \ kappa _ {R} (a) = \ {b \ in B \ mid (a, b) \ in R \}}$

Accordingly, relation and correspondence are equivalent terms, but in the case of correspondence, the focus is on the interpretation as mapping one set into the power set of a second.

In the case , the relation represents a transition relation and is the associated transition function. ${\ displaystyle B = A}$ ${\ displaystyle R}$ ${\ displaystyle \ Phi = \ kappa _ {R}}$

Properties of correspondence

If and are topological spaces , then interesting properties of correspondences between and can be defined. ${\ displaystyle A}$ ${\ displaystyle B}$ ${\ displaystyle \ phi}$ ${\ displaystyle A}$ ${\ displaystyle B}$

It is called closed (open) when the corresponding relation in the product space is closed ( open ). ${\ displaystyle \ phi}$

A fixed point of a correspondence from to is a point with . ${\ displaystyle \ phi}$ ${\ displaystyle A}$ ${\ displaystyle A}$ ${\ displaystyle a \ in A}$ ${\ displaystyle a \ in \ phi (a)}$

The following, non-constructive Existence Theorem from Shizuo Kakutani ensures the existence of fixed points.

Fixed point theorem of Kakutani

Formulation of the sentence for ${\ displaystyle \ mathbb {R} ^ {n}}$

Do not be empty, convex and compact , and be a closed correspondence from to such that for each one is convex and not empty. Then has a fixed point. ${\ displaystyle A \ subset {\ mathbb {R}} ^ {n}}$ ${\ displaystyle \ phi \ colon A \ multimap A}$ ${\ displaystyle A}$ ${\ displaystyle A}$ ${\ displaystyle \ phi (a)}$ ${\ displaystyle a}$ ${\ displaystyle \ phi}$

Applications

This fixed point theorem generalizes Brouwer's fixed point theorem , because a mapping can be understood as a correspondence with , and a fixed point of is a fixed point of . ${\ displaystyle f \ colon A \ rightarrow A}$ ${\ displaystyle \ phi}$ ${\ displaystyle \ phi (a) = \ {f (a) \}}$ ${\ displaystyle \ phi}$ ${\ displaystyle f}$

In mathematical economic theory this theorem leads to interesting existence theorems about equilibrium prices. In mathematical game theory , John Nash used this theorem to show the existence of equilibrium points in certain cooperative two-person games (see Nash equilibrium ).

Correspondences in Algebraic Geometry

In algebraic geometry one describes a correspondence between varieties and a sub- variety of the product . ${\ displaystyle X}$ ${\ displaystyle Y}$ ${\ displaystyle X \ times Y}$

For a body to define the category of correspondences as the category , the objects of which the smooth, projective varieties over and whose morphisms means of Chow groups through are given ${\ displaystyle K}$ ${\ displaystyle Corr_ {K}}$ ${\ displaystyle K}$

{\ displaystyle Mor (X, Y): = \ bigoplus _ {i, j} \ left \ {{\ begin {array} {cc} CH ^ {\ mathrm {dim} (X_ {i})} (X_ { i} \ times Y_ {j}) & \ mathrm {dim} (X_ {i}) = \ mathrm {dim} (Y_ {j}) \\ 0 & otherwise \ end {array}} \ right \}}

where denotes the decomposition of the varieties into irreducible components . The composition of two morphisms is defined by ${\ displaystyle X = \ bigcup _ {i} X_ {i}, Y = \ bigcup _ {j} Y_ {j}}$ ${\ displaystyle f \ in Mor (X, Y), g \ in Mor (Y, Z)}$

{\ displaystyle g \ circ f: = (pr_ {13}) _ {*} (((pr_ {12}) ^ {*} (f) \ cdot (pr_ {23}) ^ {*} (g)) \ in CH ^ {\ mathrm {dim} (X)} (X \ times Z),}

where the projection of denotes the product of the -th and -th factor. The identity is the diagonal . ${\ displaystyle pr_ {ij}}$ ${\ displaystyle X \ times Y \ times Z}$ ${\ displaystyle i}$ ${\ displaystyle j}$ ${\ displaystyle id_ {X}}$ ${\ displaystyle \ Delta _ {X} \ in CH ^ {\ mathrm {dim} (X)} (X \ times X)}$

literature

Heinz König, Michael Neumann: Mathematical Economic Theory . Publisher Anton Hain Meisenheim GmbH (1986)
Burkhard Rauhut, Norbert Schmitz, Ernst-Wilhelm Zachow: An introduction to the mathematical theory of strategic games . Teubner Study Books (1979)
Harro Heuser : Textbook of Analysis - Part 2 . 5th edition, Teubner 1990, ISBN 3-519-42222-0 , p. 609

Web links

Correspondence , Encyclopedia of Mathematics, Springer