Article · Wikipedia archive · Last revised Jun 5, 2026

Rational representation

In mathematics, in the representation theory of algebraic groups, a linear representation of an algebraic group is said to be rational if, viewed as a map from the group to the general linear group, it is a rational map of algebraic varieties.

Last revised
Jun 5, 2026
Read time
≈ 1 min
Length
130 w
Citations
Source
Wikipedia ↗

In mathematics, in the representation theory of algebraic groups, a linear representation of an algebraic group is said to be rational if, viewed as a map from the group to the general linear group, it is a rational map of algebraic varieties.

Finite direct sums and products of rational representations are rational.

A rational G {\displaystyle G} module is a module that can be expressed as a sum (not necessarily direct) of rational representations.

See also

See also

  • Schur functor, used in the classification of irreducible rational representations of the general linear group
References

References