000			04163cam a2200553Ii 4500
001			9780429506550
003			FlBoTFG
005			20220711212429.0
006			m o d
007			cr cnu|||unuuu
008			200512s2020 flu ob 001 0 eng d
040			_aOCoLC-P _beng _erda _epn _cOCoLC-P
020			_a9780429506550 _q(electronic bk.)
020			_a0429506554 _q(electronic bk.)
020			_a9780429014666 _q(electronic bk. : EPUB)
020			_a042901466X _q(electronic bk. : EPUB)
020			_z9781138583610
020			_a9780429014673 _q(electronic bk. : PDF)
020			_a0429014678 _q(electronic bk. : PDF)
020			_z1138583588
020			_z9781138583580
035			_a(OCoLC)1154016889 _z(OCoLC)1153453960
035			_a(OCoLC-P)1154016889
050		4	_aQA247
072		7	_aMAT _x000000 _2bisacsh
072		7	_aMAT _x002000 _2bisacsh
072		7	_aMAT _x022000 _2bisacsh
072		7	_aPBF _2bicssc
082	0	4	_a512.7/4 _223
100	1		_aHalter-Koch, Franz, _d1944- _eauthor. _916483
245	1	3	_aAn invitation to algebraic numbers and algebraic functions / _cFranz Halter-Koch, University of Graz, Austria.
264		1	_aBoca Raton : _bCRC Press, Taylor & Francis Group, _c2020.
300			_a1 online resource (xiv, 580 pages)
336			_atext _btxt _2rdacontent
337			_acomputer _bc _2rdamedia
338			_aonline resource _bcr _2rdacarrier
500			_a"A Chapman & Hall book."
520			_aThe author offers a thorough presentation of the classical theory of algebraic numbers and algebraic functions which both in its conception and in many details differs from the current literature on the subject. The basic features are: Field-theoretic preliminaries and a detailed presentation of Dedekind's ideal theory including non-principal orders and various types of class groups; the classical theory of algebraic number fields with a focus on quadratic, cubic and cyclotomic fields; basics of the analytic theory including the prime ideal theorem, density results and the determination of the arithmetic by the class group; a thorough presentation of valuation theory including the theory of difference, discriminants, and higher ramification. The theory of function fields is based on the ideal and valuation theory developed before; it presents the Riemann-Roch theorem on the basis of Weil differentials and highlights in detail the connection with classical differentials. The theory of congruence zeta functions and a proof of the Hasse-Weil theorem represent the culminating point of the volume. The volume is accessible with a basic knowledge in algebra and elementary number theory. It empowers the reader to follow the advanced number-theoretic literature, and is a solid basis for the study of the forthcoming volume on the foundations and main results of class field theory. Key features: " A thorough presentation of the theory of Algebraic Numbers and Algebraic Functions on an ideal and valuation-theoretic basis. " Several of the topics both in the number field and in the function field case were not presented before in this context. " Despite presenting many advanced topics, the text is easily readable. Franz Halter-Koch is professor emeritus at the university of Graz. He is the author of "Ideal Systems" (Marcel Dekker,1998), "Quadratic Irrationals" (CRC, 2013), and a co-author of "Non-Unique Factorizations" (CRC 2006).
505	0		_a1 Field Extensions 2 Dedekind Theory 3 Algebraic Number Fields: Elementary and Geometric Methods 4 Elementary Analytic Theory 5 Valuation Theory 6 Algebraic Function Fields Bibliography Index List of Symbols
588			_aOCLC-licensed vendor bibliographic record.
650		7	_aMATHEMATICS / General _2bisacsh _916484
650		7	_aMATHEMATICS / Algebra / General _2bisacsh _913209
650		7	_aMATHEMATICS / Number Theory _2bisacsh _915665
650		0	_aAlgebraic fields. _916485
650		0	_aAlgebraic functions. _916486
856	4	0	_3Taylor & Francis _uhttps://www.taylorfrancis.com/books/9780429506550
856	4	2	_3OCLC metadata license agreement _uhttp://www.oclc.org/content/dam/oclc/forms/terms/vbrl-201703.pdf
942			_cEBK
999			_c71266 _d71266