Arithmetic Moduli of Elliptic Curves

Name: Arithmetic Moduli of Elliptic Curves
Brand: Princeton University Press
SKU: 9780691083520
Price: 142.99 EUR
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Product variants

A01=Barry Mazur

A01=Nicholas M. Katz

Abelian variety

Addition

Algebraic variety

Algebraically closed field

Ambient space

Arithmetic

Author_Barry Mazur

Author_Nicholas M. Katz

Axiom

Barry Mazur

Base change

Calculation

Canonical map

Category=PBM

Change of base

Closed immersion

Coefficient

Coherent sheaf

Cokernel

Commutative property

Congruence relation

Coprime integers

Corollary

Cusp form

Cyclic group

Dense set

Diagram (category theory)

Dimension

Discrete valuation ring

Disjoint union

Divisor

Eigenfunction

Elliptic curve

Empty set

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

Factorization

Field of fractions

Finite field

Finite group

Finite morphism

Free module

Functor

Group (mathematics)

Integer

Irreducible component

Level structure

Local ring

Maximal ideal

Modular curve

Modular equation

Modular form

Moduli space

Morphism

Morphism of schemes

Neighbourhood (mathematics)

Noetherian

One-parameter group

Open problem

Prime factor

Prime number

Prime power

Q.E.D.

Regularity theorem

Representation theory

Residue field

Riemann hypothesis

Special case

Subgroup

Subring

Subset

Theorem

Topology

Two-dimensional space

Zariski topology

Product details

ISBN 9780691083520
Weight: 765g
Dimensions: 152 x 229mm
Publication Date: 21 Feb 1985
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback

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This work is a comprehensive treatment of recent developments in the study of elliptic curves and their moduli spaces. The arithmetic study of the moduli spaces began with Jacobi's "Fundamenta Nova" in 1829, and the modern theory was erected by Eichler-Shimura, Igusa, and Deligne-Rapoport. In the past decade mathematicians have made further substantial progress in the field. This book gives a complete account of that progress, including not only the work of the authors, but also that of Deligne and Drinfeld.