## Basic Notions of AlgebraFrom the reviews: "... This is one of the few mathematical books, the reviewer has read from cover to cover ...The main merit is that nearly on every page you will find some unexpected insights... " Zentralblatt f??r Mathematik "... There are few proofs in full, but there is an exhilarating combination of sureness of foot and lightness of touch in the exposition... which transports the reader effortlessly across the whole spectrum of algebra...Shafarevich's book - which reads as comfortably as an extended essay - breathes life into the skeleton and will be of interest to many classes of readers; certainly beginning postgraduate students would gain a most valuable perspective from it but... both the adventurous undergraduate and the established professional mathematician will find a lot to enjoy..." Math. Gazette |

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#### Review: Basic Notions Of Algebra (Encyclopaedia of Mathematical Sciences #11)

User Review - Joecolelife - GoodreadsAn off-hand account of algebra by one of the best authorities of the subject. Recommended as a "serious" pass-time. Read full review

#### Review: Basic Notions Of Algebra (Encyclopaedia of Mathematical Sciences #11)

User Review - GoodreadsAn off-hand account of algebra by one of the best authorities of the subject. Recommended as a "serious" pass-time. Read full review

### Contents

Preface | 4 |

Semisimple Modules and Rings | 79 |

11 Division Algebras of Finite Rank | 90 |

Copyright | |

10 other sections not shown

### Common terms and phrases

Abelian groups algebraic groups algebras of finite analogue arbitrary automorphism axioms called coefficients cohomology commutative ring compact complex analytic complex numbers consider consists construction contained coordinate coordinatisation corresponding coset decomposition defined definition denoted differential operators dimension direct sum division algebra elements equation exact sequence Example exists extension L/K finite extension finite fields finite groups finite number finite rank finite type finite-dimensional follows functor g e G Galois geometry given GL(n group G Hence homomorphism identity integral invariant inverse irreducible representations isomorphic kernel lattice Lie algebra Lie groups linear transformations manifold matrix morphisms multiplication n-dimensional Noetherian normal subgroup notion number field obtained Obviously permutations plane properties proved quaternions quotient rational functions real number relations satisfying semisimple sheaf simple SL(n solvable submodule subspace symmetry group taking tensor Theorem theory topological space unique valuation vector fields vector space