**Lectures on Siegel Modular Forms and Representation by Quadratic Forms**

by Y. Kitaoka

**Publisher**: Tata Institute of Fundamental Research 1986**ISBN/ASIN**: 0387164723**ISBN-13**: 9780387164724**Number of pages**: 197

**Description**:

This book is concerned with the problem of representation of positive definite quadratic forms by other such forms. From the table of contents: Preface; Fourier Coefficients of Siegel Modular Forms; Arithmetic of Quadratic Forms.

Download or read it online for free here:

**Download link**

(1.1MB, PDF)

## Similar books

**An Introduction to Algebraic Number Theory**

by

**F. Oggier**-

**Nanyang Technological University**

Contents: Algebraic numbers and algebraic integers (Rings of integers, Norms and Traces); Ideals (Factorization and fractional ideals, The Chinese Theorem); Ramification theory; Ideal class group and units; p-adic numbers; Valuations; p-adic fields.

(

**6103**views)

**Lectures on Topics in Algebraic Number Theory**

by

**Sudhir R. Ghorpade**-

**Indian Institute of Technology, Bombay**

These lecture notes give a rapid introduction to some basic aspects of Algebraic Number Theory with as few prerequisites as possible. Topics: Field Extensions; Ring Extensions; Dedekind Domains and Ramification Theory; Class Number and Lattices.

(

**6133**views)

**Lectures on Field Theory and Ramification Theory**

by

**Sudhir R. Ghorpade**-

**Indian Institute of Technology, Bombay**

These are notes of a series of lectures, aimed at covering the essentials of Field Theory and Ramification Theory as may be needed for local and global class field theory. Included are the two sections on cyclic extensions and abelian extensions.

(

**5708**views)

**Complex Multiplication**

by

**J. S. Milne**

These are preliminary notes for a modern account of the theory of complex multiplication. The reader is expected to have a good knowledge of basic algebraic number theory, and basic algebraic geometry, including abelian varieties.

(

**6011**views)