Twisted L-Functions and Monodromy

Name: Twisted L-Functions and Monodromy
Brand: Princeton University Press
SKU: 9780691091518
Price: 104.99 EUR
Availability: InStock

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Product variants

A01=Nicholas M. Katz

Abelian variety

Addition

Affine space

Author_Nicholas M. Katz

Betti number

Birch and Swinnerton-Dyer conjecture

Blowing up

Category=PBH

Codimension

Coefficient

Computation

Conjecture

Conjugacy class

Convolution

Differential geometry of surfaces

Dimension

Dimension (vector space)

Direct sum

Divisor

Divisor (algebraic geometry)

Eigenvalues and eigenvectors

Elliptic curve

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

Equation

Equidistribution theorem

Existential quantification

Factorization

Finite field

Flat map

Fourier transform

Function field

Functional equation

Goursat's lemma

Group representation

Hyperplane

Hypersurface

Integer

Integer matrix

Irreducible component

Irreducible polynomial

Irreducible representation

K3 surface

L-function

Lebesgue measure

Lefschetz pencil

Lie algebra

Limit superior and limit inferior

Minimal polynomial (field theory)

Modular form

Monodromy

Morphism

Numerical analysis

Orthogonal group

Percentage

Polynomial

Prime number

Probability measure

Quadratic function

Quotient space (topology)

Representation theory

Residue field

Riemann hypothesis

Root of unity

Scalar (physics)

Set (mathematics)

Sheaf (mathematics)

Subgroup

Summation

Symmetric group

System of imprimitivity

Theorem

Trivial representation

Zariski topology

Product details

ISBN 9780691091518
Weight: 340g
Dimensions: 152 x 235mm
Publication Date: 24 Feb 2002
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback

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For hundreds of years, the study of elliptic curves has played a central role in mathematics. The past century in particular has seen huge progress in this study, from Mordell's theorem in 1922 to the work of Wiles and Taylor-Wiles in 1994. Nonetheless, there remain many fundamental questions where we do not even know what sort of answers to expect. This book explores two of them: What is the average rank of elliptic curves, and how does the rank vary in various kinds of families of elliptic curves? Nicholas Katz answers these questions for families of "big" twists of elliptic curves in the function field case (with a growing constant field). The monodromy-theoretic methods he develops turn out to apply, still in the function field case, equally well to families of big twists of objects of all sorts, not just to elliptic curves. The leisurely, lucid introduction gives the reader a clear picture of what is known and what is unknown at present, and situates the problems solved in this book within the broader context of the overall study of elliptic curves. The book's technical core makes use of, and explains, various advanced topics ranging from recent results in finite group theory to the machinery of l-adic cohomology and monodromy. Twisted L-Functions and Monodromy is essential reading for anyone interested in number theory and algebraic geometry.

Nicholas M. Katz is Professor of Mathematics at Princeton University. He is the author of four other books in this series: Arithmetic Moduli of Elliptic Curves (with Barry Mazur); Gauss Sums, Kloosterman Sums, and Monodromy Groups; Exponential Sums and Differential Equations; and Rigid Local Systems.