## Representations of groups: with special consideration for the needs of modern physics |

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### Contents

Contents | 1 |

Analysis of Kronecker products in the symmetric and full linear | 5 |

Algebras | 8 |

Copyright | |

54 other sections not shown

### Common terms and phrases

according to theorem algebra arbitrary basis belong bisymmetric transformations block calculate called characters classes of conjugate coefficients column commute completely reducible complex numbers components consider consists contains continuous representations coordinates corresponding coset decomposes decomposition degree denote diagonal form dimension direct sum eigenvalues equation equivalence mapping exists finite group follows formula frame full linear group full matrix rings given group elements group G group ring hence hermitian highest weight idempotent indecomposable infinitesimal ring integral representations invariant subspace irreducible representations isomorphic Kronecker product left ideals linear subspace linear transformation linearly independent Lorentz group matrix elements matrix rings normal subgroup obtained occur orthogonal group permutation polynomial Proof prove rational regular representation representation of G representation space right ideal ring elements rotation group Schur's lemma standard tableaux summands symmetric group tensor space theorem 3.2 two-sided ideal unimodular group vector space write zero