Induced character

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In mathematics, an induced character is the character of the representation V of a finite group G induced from a representation W of a subgroup HG. More generally, there is also a notion of induction \operatorname {Ind}(f) of a class function f on H given by the formula

\operatorname {Ind}(f)(s)={\frac  {1}{|H|}}\sum _{{t\in G,\ t^{{-1}}st\in H}}f(t^{{-1}}st).

If f is a character of the representation W of H, then this formula for \operatorname {Ind}(f) calculates the character of the induced representation V of G.[1]

The basic result on induced characters is Brauer's theorem on induced characters. It states that every irreducible character on G is a linear combination with integer coefficients of characters induced from elementary subgroups.

References

  1. Serre, Jean-Pierre (1977), Linear Representations of Finite Groups, New York: Springer-Verlag, 7.2, Proposition 20, ISBN 0-387-90190-6, MR 0450380 . Translated from the second French edition by Leonard L. Scott.
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