When the elements of a group and their group operations are homomorphically mapped onto a concrete algebraic structure, we speak of a realization of the group. If this is done through linear mappings on a vector space \({\mathcal V}\) , it is called a representation of the group. However, one should distinguish between a group and its representations. The group properties are universal and independent of the representations.

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Representations of Groups

  • Andreas Wipf

摘要

When the elements of a group and their group operations are homomorphically mapped onto a concrete algebraic structure, we speak of a realization of the group. If this is done through linear mappings on a vector space \({\mathcal V}\) , it is called a representation of the group. However, one should distinguish between a group and its representations. The group properties are universal and independent of the representations.