This book provides a self-contained exposition of the theory of algebraic curves without requiring any of the prerequisites of modern algebraic geometry. The self-contained treatment makes this important and mathematically central subject accessible to non-specialists. At the same time, specialists in the field may be interested to discover several unusual topics. Among these are Tates theory of residues, higher derivatives and Weierstrass points in characteristic p, the Stöhr--Voloch proof of the Riemann hypothesis, and a treatment of inseparable residue field extensions. Although the exposition is based on the theory of function fields in one variable, the book is unusual in that it also covers projective curves, including singularities and a section on plane curves. David Goldschmidt has served as the Director of the Center for Communications Research since 1991. Prior to that he was Professor of Mathematics at the University of California, Berkeley.
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From the reviews:
"This is a well-written book, which will quickly give the reader access to the theory of projective algebraic curves. The author manages to convey a very good amount of information on this subject, and there's also a lot of results on function fields. The treatment given to the theory of Weierstrass points, in which the ground field may have any characteristic, will certainly be remembered by the reader, even after he/she has studied the subject with the machinery offered by the scheme language. It is the opinion of this reviewer that this book is a fine contribution to a first study of algebraic functions and projective curves." -- MATHEMATICAL REVIEWS
"This is a very nice algebraic introduction to the theory of algebraic curves (no geometry) with full, clear and simple proofs. It should be very useful for workers in coding theory." (Edoardo Ballico, Zentralblatt MATH, Vol. 1034, 2004)
"The author treats some topics not often found elsewhere like Tates theory of residues, inseparable residue field extensions, a proof of the Riemann hypothesis for finite fields etc. Since the book is rather self-contained - even an appendix on field theory is provided - it can be recommended even for non-specialists interested in this classical topic." (G. Kowol, Monatshefte für Mathematik, Vol. 143 (2), 2004)
"This book provides a self-contained exposition of the theory of algebraic curves without requiring any of the prerequisites of modern algebraic geometry. The self-contained treatment makes this important and mathematically central subject accessible to non specialists. At the same time, specialists in the field may be interested to discover several unusual topics." (L'ENSEIGNEMENT MATHEMATIQUE, Vol. 49 (1-2), 2003)
"Goldschmidt ... brings readers, in a minimal number of pages, from first principles to a major landmark of 20th-century mathematics (which falls outside of Riemann surface theory!), namely, Weil's Riemannhypothesis for curves over finite fields. An excellent stepping stone either to algebraic number theory or to abstract algebraic geometry." (D.V. Feldman, CHOICE, July 2003)
"The powerful interaction between algebra and geometry ... led to an unprecedented development of many fields in mathematics, and in particular of the one presently called algebraic geometry. ... This is a well-written book, which will quickly give the reader access to the theory of projective algebraic curves. The author manages to convey a very good amount of information on this subject ... . this book is a fine contribution to a first study of algebraic functions and projective curves." (Cicero Fernandes de Carvalho, Mathematical Reviews, 2003 j)
"This is a well-written book, which will quickly give the reader access to the theory of projective algebraic curves. The author manages to convey a very good amount of information on this subject, and there's also a lot of results on function fields. The treatment given to the theory of Weierstrass points, in which the ground field may have any characteristic, will certainly be remembered by the reader, even after he/she has studied the subject with the machinery offered by the scheme language. It is the opinion of this reviewer that this book is a fine contribution to a first study of algebraic functions and projective curves." -- MATHEMATICAL REVIEWS
"This is a very nice algebraic introduction to the theory of algebraic curves (no geometry) with full, clear and simple proofs. It should be very useful for workers in coding theory." (Edoardo Ballico, Zentralblatt MATH, Vol. 1034, 2004)
"The author treats some topics not often found elsewhere like Tates theory of residues, inseparable residue field extensions, a proof of the Riemann hypothesis for finite fields etc. Since the book is rather self-contained - even an appendix on field theory is provided - it can be recommended even for non-specialists interested in this classical topic." (G. Kowol, Monatshefte für Mathematik, Vol. 143 (2), 2004)
"This book provides a self-contained exposition of the theory of algebraic curves without requiring any of the prerequisites of modern algebraic geometry. The self-contained treatment makes this important and mathematically central subject accessible to non specialists. At the same time, specialists in the field may be interested to discover several unusual topics." (L'ENSEIGNEMENT MATHEMATIQUE, Vol. 49 (1-2), 2003)
"Goldschmidt ... brings readers, in a minimal number of pages, from first principles to a major landmark of 20th-century mathematics (which falls outside of Riemann surface theory!), namely, Weil's Riemannhypothesis for curves over finite fields. An excellent stepping stone either to algebraic number theory or to abstract algebraic geometry." (D.V. Feldman, CHOICE, July 2003)
"The powerful interaction between algebra and geometry ... led to an unprecedented development of many fields in mathematics, and in particular of the one presently called algebraic geometry. ... This is a well-written book, which will quickly give the reader access to the theory of projective algebraic curves. The author manages to convey a very good amount of information on this subject ... . this book is a fine contribution to a first study of algebraic functions and projective curves." (Cicero Fernandes de Carvalho, Mathematical Reviews, 2003 j)