THETA CONSTANTS, RIEMANN SURFACES AND THE MODULAR GROUP: AN INTRODUCTION
Ouvrage 9780821813928 : THETA CONSTANTS, RIEMANN SURFACES AND THE MODULAR GROUP: AN INTRODUCTION
There are incredibly rich connections between classical analysis and
number theory. For instance, analytic number theory contains many
examples of asymptotic expressions derived from estimates for analytic
functions, such as in the proof of the Prime Number Theorem. In
combinatorial number theory, exact formulas for number-theoretic
quantities are derived from relations between analytic functions.
Elliptic functions, especially theta functions, are an important class
of such functions in this context, which had been made clear already in
Jacobi's Fundamenta nova. Theta functions are also classically connected
with Riemann surfaces and with the modular group $\\Gamma =
\\mathrm{PSL}(2,\\mathbb{Z})$, which provide another path for insights
into number theory.Farkas and Kra, well-known masters of the theory of
Riemann surfaces and the analysis of theta functions, uncover here
interesting combinatorial identities by means of the function theory on
Riemann surfaces related to the principal congruence subgroups
$\\Gamma(k)$. For instance, the authors use this approach to derive
congruences discovered by Ramanujan for the partition function, with the
main ingredient being the construction of the same function in more than
one way. The authors also obtain a variant on Jacobi's famous result on
the number of ways that an integer can be represented as a sum of four
squares, replacing the squares by triangular numbers and, in the
process, obtaining a cleaner result.The recent trend of applying the
ideas and methods of algebraic geometry to the study of theta functions
and number theory has resulted in great advances in the area. However,
the authors choose to stay with the classical point of view. As a
result, their statements and proofs are very concrete. In this book the
mathematician familiar with the algebraic geometry approach to theta
functions and number theory will find many interesting ideas as well as
detailed explanations and derivations of new and old results.Highlights
of the book include systematic studies of theta constant identities,
uniformizations of surfaces represented by subgroups of the modular
group, partition identities, and Fourier coefficients of automorphic
functions.Prerequisites are a solid understanding of complex analysis,
some familiarity with Riemann surfaces, Fuchsian groups, and elliptic
functions, and an interest in number theory. The book contains summaries
of some of the required material, particularly for theta functions and
theta constants.Readers will find here a careful exposition of a
classical point of view of analysis and number theory. Presented are
numerous examples plus suggestions for research-level problems. The text
is suitable for a graduate course or for independent reading.
Auteur : FARKAS
Editeur : AMERICAN MATHEMATICAL SOCIETY
Nombre de pages : 552
Date de publication : 11 2001
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