Generalizations of Thomae's Formula for Zn Curves (Developments in Mathematics, Vol. 21) (Developments in Mathematics, 21),New

Product DescriptionPrevious publications on the generalization of the Thomae formulae to Zn curves have emphasized the theory's implications in mathematical physics and depended heavily on applied mathematical techniques. This book redevelops these previous results demonstrating how they can be derived directly from the basic properties of theta functions as functions on compact Riemann surfaces.'Generalizations of Thomae's Formula for Zn Curves' includes several refocused proofs developed in a generalized context that is more accessible to researchers in related mathematical fields such as algebraic geometry, complex analysis, and number theory.This book is intended for mathematicians with an interest in complex analysis, algebraic geometry or number theory as well as physicists studying conformal field theory.ReviewFrom the reviews:This book provides a detailed exposition of Thomaes formula for cyclic covers of CP1, in the nonsingular case and in the singular case for Zn curves of a particular shape. This book is written for graduate students as well as young researchers . In any case, the reader should be acquainted with complex analysis (in several variables), Riemann surfaces, and some elementary algebraic geometry. It is a very readable book. The theory is always illustrated with examples in a very generous mathematical style. (Juan M. Cervio Mathematical Reviews, Issue 2012 f)In the book under review, the authors present the background necessary to understand and then prove Thomaes formula for Zn curves. The point of view of the book is to work out Thomae formulae for Zn curves from first principles, i.e. just using Riemanns theory of theta functions. the elementary approach which is chosen in the book makes it a nice development of Riemanns ideas and accessible to graduate students and young researchers. (Christophe Ritzenthaler, Zentralblatt MATH, Vol. 1222, 2011)From the Back CoverThis book provides a comprehensive overview of the theory of theta functions, as applied to compact Riemann surfaces, as well as the necessary background for understanding and proving the Thomae formulae.The exposition examines the properties of a particular class of compact Riemann surfaces, i.e., the Zn curves, and thereafter focuses on how to prove the Thomae formulae, which give a relation between the algebraic parameters of the Zn curve, and the theta constants associated with the Zn curve.Graduate students in mathematics will benefit from the classical material, connecting Riemann surfaces, algebraic curves, and theta functions, while young researchers, whose interests are related to complex analysis, algebraic geometry, and number theory, will find new rich areas to explore. Mathematical physicists and physicists with interests also in conformal field theory will surely appreciate the beauty of this subject.