Some properties for morphism of representations
Abstract
Let : G GL(V) and :G GL (W) be representations of finite group G. A linear map T: V W is called a morphism from to if it satisfys Tg= g T for each g∈ G and let HomG ( ,) denote the set of all morphisms. In this paper, we make full stufy of the subspace HomG(, ). As byproducts, we include the proof of the first orthogonality relation and Schur's orthogonality relation.
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