Assume G $G$ is a finite group and H $H$ a subgroup. Is it true that the number of irreducible representations of G $G$ is always bigger larger than (or equal ) to) the number of irreducible representations of H, with H a subgroup of G?$H$?
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Is the number of irreducible representations of G always bigger (or equal) to the number of irreducible representations of H, with H a subgroup of G?Assume G is a finite group and H a subgroup. Is it true that the number of irreducible representations of G always bigger (or equal) to the number of irreducible representations of H, with H a subgroup of G?
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