Map (mathematics)

In many branches of mathematics, the term map is used to mean a function,[7][2][8] sometimes with a specific property of particular importance to that branch. For instance, a "map" is a continuous function in topology, a linear transformation in linear algebra, etc.

Some authors, such as Serge Lang,[9] use "function" only to refer to maps in which the codomain is a set of numbers (i.e. a subset of R or C), and reserve the term "mapping" for more general functions.

Maps of certain kinds are the subjects of many important theories. These include homomorphisms in abstract algebra, isometries in geometry, operators in analysis and representations in group theory.[3] For more, see Lie group, mapping class group and permutation group.

In the theory of dynamical systems, a map denotes an evolution function used to create discrete dynamical systems. See Poincaré map for more.

A partial map is a partial function, and a total map is a total function. Related terms such as domain, codomain, injective, continuous, etc. can be applied equally to maps and functions, with the same meaning. All these usages can be applied to "maps" as general functions or as functions with special properties.

In category theory, "map" is often used as a synonym for "morphism" or "arrow", and thus is more general than "function".[10] For example, a morphism ${\displaystyle f:\,X\to Y}$ in a concrete category (i.e. a morphism which can be viewed as functions) carries with it the information of its domain (the source ${\displaystyle X}$ of the morphism) and its codomain (the target ${\displaystyle Y}$). In the widely used definition of a function ${\displaystyle f:X\to Y}$, ${\displaystyle f}$ is a subset of ${\displaystyle X\times Y}$ consisting of all the pairs ${\displaystyle (x,f(x))}$ for ${\displaystyle x\in X}$. In this sense, the function doesn't capture the information of which set ${\displaystyle Y}$ is used as the codomain; only the range ${\displaystyle f(X)}$ is determined by the function.