## An introduction to the theory of groups |

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### Contents

THE ISOMORPHISM THEOREMS | 11 |

PERMUTATION GROUPS | 32 |

Some Representation Theorems | 45 |

Copyright | |

13 other sections not shown

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affine Assume automorphism basis commute composition series conjugacy classes conjugate Corollary cosets covering complex cyclic groups defined Definition Let denoted diagram direct product direct sum disjoint divisor equation equivalence exact sequence example Exercise exists factor groups factor set finite group finitely presented group fixes follows free abelian group free group function functor G acts G contains G-set group G group of order hence Hint HNN extension homomorphism imbedded implies induction infinite integer kernel Lemma Let G Let H linear matrix multiplicative group nilpotent nonsingular normal series normal subgroup notation number of elements one-one correspondence p-group p-primary permutation polynomial positive words prime Proof Let Prove that G quotient reader recursive relations semidirect product semigroup shows simple group solvable group stable letter Steiner system subgroup H subgroup of G subgroup of order subset subword Sylow p-subgroup torsion-free transitive G-set transvection unique vector space