Real representation

In mathematics and theoretical physics, a real representation is a group representation that is equivalent to its complex conjugate and that also allows the matrices representing the group elements to be real — unlike a pseudoreal representation (symplectic representation).

In other words, there exists an antilinear map $j:V\to V$ that commutes with the elements of the group, and that satisfies $j 2 = + 1$ .

A group representation that is neither real nor pseudoreal is called a complex representation. A criterion (for compact groups G) for reality of representations in terms of character theory is based on the Schur indicator. It involves the integral over G of

χ(g²)

which may take the values 1, 0 or −1, for Haar measure μ with μ(G) = 1.

Examples of real representations are the spinors in 7 + 8k, 8 + 8k, and 9 + 8k dimensions for k = 1, 2, 3 ... . This periodicity modulo 8 is known in mathematics not only in the theory of Clifford algebras, but also in algebraic topology, in KO-theory. see Representations of Clifford algebras

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Real representation

See also: Real representation, Algebraic topology, Character theory, Clifford algebra, Complex representation, Group (mathematics), Group representation, Haar measure, Mathematics