000			06360cam a2200805Ia 4500
001			ocn784952441
003			OCoLC
005			20171224113920.0
006			m o d
007			cr cnu---unuuu
008			120409s2012 njua ob 001 0 eng d
010			_a 2011039044
040			_aN$T _beng _epn _cN$T _dCUS _dYDXCP _dDG1 _dCDX _dCOO _dE7B _dOCLCQ _dDEBSZ _dOCLCQ _dIUL _dOCLCF _dOCLCQ _dEBLCP _dCN3GA _dOCLCQ _dAZK
019			_a784883586 _a794619794 _a961599377 _a962604337
020			_a9781118218457 _q(electronic bk.)
020			_a1118218450 _q(electronic bk.)
020			_a9781118218426 _q(electronic bk.)
020			_a1118218426 _q(electronic bk.)
020			_z9781118072059 _q(cloth)
020			_z1118072057 _q(cloth)
024	8		_a9786613618191
029	1		_aAU@ _b000049117486
029	1		_aDEBBG _bBV040883843
029	1		_aDEBSZ _b372710913
029	1		_aDEBSZ _b397177402
029	1		_aDKDLA _b820120-katalog:000599612
029	1		_aNZ1 _b14690905
029	1		_aNZ1 _b15350976
035			_a(OCoLC)784952441 _z(OCoLC)784883586 _z(OCoLC)794619794 _z(OCoLC)961599377 _z(OCoLC)962604337
037			_a361819 _bMIL
050		4	_aQA214 _b.C69 2012eb
072		7	_aMAT _x002040 _2bisacsh
082	0	4	_a512/.32 _223
049			_aMAIN
100	1		_aCox, David A.
245	1	0	_aGalois theory / _cDavid A. Cox.
250			_a2nd ed.
260			_aHoboken, NJ : _bJohn Wiley & Sons, _c©2012.
300			_a1 online resource (xxviii, 570 pages) : _billustrations.
336			_atext _btxt _2rdacontent
337			_acomputer _bc _2rdamedia
338			_aonline resource _bcr _2rdacarrier
347			_adata file _2rda
380			_aBibliography
490	1		_aPure and aplied mathematics
504			_aIncludes bibliographical references and index.
588	0		_aPrint version record.
505	0		_aGalois Theory; CONTENTS; Preface to the First Edition; Preface to the Second Edition; Notation; 1 Basic Notation; 2 Chapter-by-Chapter Notation; PART I POLYNOMIALS; 1 Cubic Equations; 1.1 Cardan's Formulas; Historical Notes; 1.2 Permutations of the Roots; A Permutations; B The Discriminant; C Symmetric Polynomials; Mathematical Notes; Historical Notes; 1.3 Cubic Equations over the Real Numbers; A The Number of Real Roots; B Trigonometric Solution of the Cubic; Historical Notes; References; 2 Symmetric Polynomials; 2.1 Polynomials of Several Variables; A The Polynomial Ring in n Variables.
505	8		_aB The Elementary Symmetric PolynomialsMathematical Notes; 2.2 Symmetric Polynomials; A The Fundamental Theorem; B The Roots of a Polynomial; C Uniqueness; Mathematical Notes; Historical Notes; 2.3 Computing with Symmetric Polynomials (Optional); A Using Mathematica; B Using Maple; 2.4 The Discriminant; Mathematical Notes; Historical Notes; References; 3 Roots of Polynomials; 3.1 The Existence of Roots; Mathematical Notes; Historical Notes; 3.2 The Fundamental Theorem of Algebra; Mathematical Notes; Historical Notes; References; PART II FIELDS; 4 Extension Fields.
505	8		_a4.1 Elements of Extension FieldsA Minimal Polynomials; B Adjoining Elements; Mathematical Notes; Historical Notes; 4.2 Irreducible Polynomials; A Using Maple and Mathematica; B Algorithms for Factoring; C The Schönemann-Eisenstein Criterion; D Prime Radicals; Historical Notes; 4.3 The Degree of an Extension; A Finite Extensions; B The Tower Theorem; Mathematical Notes; Historical Notes; 4.4 Algebraic Extensions; Mathematical Notes; References; 5 Normal and Separable Extensions; 5.1 Splitting Fields; A Definition and Examples; B Uniqueness; 5.2 Normal Extensions; Historical Notes.
505	8		_a5.3 Separable ExtensionsA Fields of Characteristic 0; B Fields of Characteristic p; C Computations; Mathematical Notes; 5.4 Theorem of the Primitive Element; Mathematical Notes; Historical Notes; References; 6 The Galois Group; 6.1 Definition of the Galois Group; Historical Notes; 6.2 Galois Groups of Splitting Fields; 6.3 Permutations of the Roots; Mathematical Notes; Historical Notes; 6.4 Examples of Galois Groups; A The pth Roots of 2; B The Universal Extension; C A Polynomial of Degree 5; Mathematical Notes; Historical Notes; 6.5 Abelian Equations (Optional); Historical Notes; References.
505	8		_a7 The Galois Correspondence7.1 Galois Extensions; A Splitting Fields of Separable Polynomials; B Finite Separable Extensions; C Galois Closures; Historical Notes; 7.2 Normal Subgroups and Normal Extensions; A Conjugate Fields; B Normal Subgroups; Mathematical Notes; Historical Notes; 7.3 The Fundamental Theorem of Galois Theory; 7.4 First Applications; A The Discriminant; B The Universal Extension; C The Inverse Galois Problem; Historical Notes; 7.5 Automorphisms and Geometry (Optional); A Groups of Automorphisms; B Function Fields in One Variable; C Linear Fractional Transformations.
520			_aPraise for the First Edition". . .will certainly fascinate anyone interested in abstract algebra: a remarkable book!" & mdash;Monatshefte fur MathematikGalois theory is one of the most established topics in mathematics, with historical roots that led to the development of many central concepts in modern algebra, including groups and fields. Covering classic applications of the theory, such as solvability by radicals, geometric constructions, and finite fields, Galois Theory, Second Edition delves into novel topics like Abel & rsquo;s theory of Abelian equations, casus irreducibili, and the Galois.
650		0	_aGalois theory.
650		4	_aGalois theory.
650		4	_aMathematics.
650		7	_aMATHEMATICS _xAlgebra _xIntermediate. _2bisacsh
650		7	_aGalois theory. _2fast _0(OCoLC)fst00937326
655		4	_aElectronic books.
776	0	8	_iPrint version: _aCox, David A. _tGalois theory. _b2nd ed. _dHoboken, N.J. : John Wiley & Sons, ©2012 _z9781118072059 _w(DLC) 2011039044 _w(OCoLC)755640849
830		0	_aPure and applied mathematics (John Wiley & Sons : Unnumbered)
856	4	0	_uhttp://onlinelibrary.wiley.com/book/10.1002/9781118218457 _zWiley Online Library
938			_aCoutts Information Services _bCOUT _n22302714
938			_aEBL - Ebook Library _bEBLB _nEBL817908
938			_aebrary _bEBRY _nebr10560585
938			_aEBSCOhost _bEBSC _n444554
938			_aYBP Library Services _bYANK _n7578085
938			_aYBP Library Services _bYANK _n7292965
994			_a92 _bDG1
999			_c11820 _d11820