Import Export International
In May 2003, I gave
Import Export International in San Diego a little bit more than $ 5000
as well as all of my personal belongings, including my mathematical
library, so that it could be shipped to Germany. Half a year later,
there's no trace of my things; my guess is that these guys
stole my books as well as my money and never intended to deliver.
In case you should find a single book with my name in it (I never
sold one) or sufficiently many of the books below (representing a
small but dear part of my collection) with the name removed,
please let me know.
Partial List of Stolen Books
- S.S. Abhyankar,
Algebraic geometry for scientists and engineers
- C. Adelmann,
The decomposition of primes in torsion point fields.
- S. D. Adhikari, S. A. Katre, D. Thakur (eds.)
Cyclotomic fields and related topics.
- E. Artin,
Collected papers
- E. Artin, J. Tate
Class Field Theory
- H. Bass, Algebraic K-theory.
- H. Bass, A. O. Kuku and C. Pedrini (eds.),
Algebraic K-theory and its applications.
- B. Berndt, R. Evans, K. Williams,
Gauss and Jacobi sums.
- A. Babakhanian,
Cohomology of finite groups.
- R. Bix,
Conics and cubics. A concrete introduction to algebraic curves.
- I. Blake, G. Seroussi, N. Smart,
Elliptic curves in cryptography
- Z.I. Borevich, I. Shafarevich
Number theory
- R. Brauer
Collected papers I, II, III
- E. Brieskorn, H. Knörrer
Ebene algebraische Kurven.
- M. Brodmann,
Algebraische Geometrie
- D. Bump,
Algebraic geometry
- D. Bump,
Automorphic forms and representations
- E. Burger,
Exploring the number jungle: a journey into Diophantine analysis.
- J.J. Callahan,
The Geometry of Spacetime
- J.W.S. Cassels,
Elliptic curves
- J.W.S. Cassels,
Local Fields
- J.W.S. Cassels, E.V. Flynn,
Prolegomena to a middlebrow arithmetic of curves of genus 2
- J.W.S. Cassels, A. Frölich
Algebraic Number Fields
- Ph. Cassou-Noguès, M. Taylor,
Elliptic functions and rings of integers
- J.S. Chahal,
Topics in number theory.
- C. Chevalley,
Class field theory
- N. Childress, J. Jones,
Arithmetic geometry
- C.H. Clemens,
A scrapbook of complex curve theory
- J. Coates, S.T. Yau, (eds.)
Elliptic curves, modular forms, & Fermat's last theorem.
- H. Cohen,
A course in computational algebraic number theory
- H. Cohen,
Advanced topics in computational number theory
- H. Cohn,
A classical invitation to algebraic numbers and class fields
- H. Cohn,
Construction of Class Fields
- P.M. Cohn, P. M.
Algebraic numbers and algebraic functions
- G. Cornell,
Arithmetic geometry
- G. Cornell, J. Silverman, G. Stevens (eds.)
Modular forms and Fermat's last theorem.
- D. Cox,
Primes of the form x2 + ny2.
- D. Cox, J. Little, D. O'Shea,
Using algebraic geometry
- J.E. Cremona,
Algorithms for modular elliptic curves.
- V.I. Danilov,
Algebraic curves, algebraic manifolds, and schemes
- O. Debarre,
Tores et variétés abéliennes complexes
- R. Dedekind, Lectures on the Algebraic Integers
- Delone, Faddeev,
Irrationalities of the third degree
- Dickson, History of the theory of numbers, I, II, III
- P.G.L. Dirichlet, Vorlesungen über Zahlentheorie
- Dixon et al.,
Analytic pro-p groups
- H. Edwards,
Fermat's Last Theorem.
- D. Eisenbud, J. Harris,
The geometry of schemes
- G. Eisenstein
Gesammelte Abhandlungen I, II (2 copies)
- B. Engquist, W. Schmid,
Mathematics unlimited---2001 and beyond
- G. Everest, Th. Ward,
Heights of polynomials and entropy in algebraic dynamics.
- I. Fesenko, S.V. Vostokov,
Local fields and their extensions
- Fischer
Ebene algebraische Kurven
- J. Foster, J.D. Nightingale,
A Short Course in General Relativity
- A. Fröhlich,
Algebraic number theory
- A. Fröhlich,
Central extensions, Galois groups, and ideal class groups of number fields
- A. Fröhlich, M.J. Taylor,
Algebraic number theory
- W. Fulton,
Algebraic curves. An introduction to algebraic geometry
- C.F. Gauss
Disquisitiones Arithmeticae (Engl.)
- C.F. Gauss
Arithmetische Untersuchungen
- C.G. Gibson,
Elementary geometry of algebraic curves: an undergraduate introduction.
- J.R. Goldman,
The queen of mathematics: a historically motivated guide to number theory
- D. Goldschmidt, Algebraic Functions and Projective Curves
- G. Gras, Class field theory
- Ph.A. Griffiths,
Introduction to algebraic curves.
- Ph. Griffiths, J. Harris,
Principles of algebraic geometry.
- J. Harris,
Algebraic geometry. A first course
- R. Hartshorne,
Algebraic geometry
- H. Hasse
Gesammelte Abhandlungen I, II, III
- H. Hasse
Number Theory
- H. Hasse
Über die Klassenzahl abelscher Zahlkörper.
- H. Hasse
Vorlesungen über Zahlentheorie
- H. Hasse
Vorlesungen über Klassenkörpertheorie
Bericht I, Ia, II
- E. Hecke,
Lectures on the theory of algebraic numbers
- Y. Hellegouarch
Invitation aux mathematiques de Fermat-Wiles
- D. Hilbert,
The theory of algebraic number fields.
Gesammelte Werke I
- M. Hindry, J. Silverman, Diophantine Geometry. An Introduction
- J.E. Hofmann, THE HISTORY OF MATHEMATICS
- L. Holzer,
Zahlentheorie I, II, III
- L. Holzer,
Klassenkörpertheorie
- L.P. Hughston, K.P. Tod, An Introduction to General Relativity
- K. Hulek,
Elementare algebraische Geometrie
- W. Hulsbergen,
Conjectures in arithmetic algebraic geometry. A survey
- D. Husemoller,
Elliptic curves
- S. Iitaka,
Algebraic geometry. An introduction to birational geometry
of algebraic varieties
- K. Ireland, M. Rosen,
A classical introduction to modern number theory. 2nd ed
- H. Iwaniec,
Topics in classical automorphic forms.
- K. Iwasawa,
Collected papers. Vol. I, II.
- C.G.J. Jacobi
Collected papers (5 vol.)
- G.J. Janusz,
Algebraic number fields
- W.E. Jenner,
Rudiments of algebraic geometry
- K. Kato, Kazuya N. Kurokawa, T. Saito,
Number theory 1. Fermat's dream.
- G. Kempf,
Algebraic varieties
- G. Kempf,
Algebraic structures
- G. Kempf,
Complex abelian varieties and theta functions
- G. Karpilovsky,
The Schur Multiplier
- K. Kendig,
Elementary algebraic geometry.
- F. Kirwan,
Complex algebraic curves.
- H. Kisilevsky, R. Murty (ed.)
Elliptic curves and related topics.
- A. Knapp,
Elliptic curves.
- N. Koblitz,
A course in number theory and cryptography
- N. Koblitz,
Algebraic aspects of cryptography.
- N. Koblitz,
Introduction to elliptic curves and modular forms
- N. Koblitz,
Number Theory related to Fermat's Last Theorem
- H. Koch,
Zahlentheorie
- H. Koch,
Galoistheorie der p-Erweiterungen
- H. Koch,
Galois theory of p-extensions
- H. Koch,
Number Theory II
- M. Koecher, A. Krieg,
Elliptische Funktionen und Modulformen.
- E. Kunz,
Ebene algebraische Kurven.
- S.Lang,
Algebra.
- S.Lang,
Topics in cohomology of groups.
- S.Lang,
Algebraic number theory (2 copies)
- S.Lang,
Cyclotomic fields. I
- S.Lang,
Cyclotomic fields. II
- S.Lang,
The beauty of doing mathematics
- S.Lang,
Number theory III: Diophantine geometry.
- S.Lang,
Elliptic functions
- S.Lang,
Complex multiplication
- S.Lang,
Abelian varieties
- S.Lang,
Introduction to algebraic and abelian functions
- S.Lang,
Elliptic curves: Diophantine analysis.
- J.M. Lee, Introduction to Smooth Manifolds
- F. Lemmermeyer,
Reciprocity laws. From Euler to Eisenstein. 2 copies
- S. Levy (ed.)
The eightfold way. The beauty of Klein's quartic curve
- Lidl, Niederreiter,
Finite Fields
- J.H. van Lint, G. van der Geer,
Introduction to coding theory and algebraic geometry
- Q. Liu,
Algebraic geometry and arithmetic curves.
- F. Lorenz,
Algebraische Zahlentheorie
- D. Lorenzini,
An invitation to arithmetic geometry
- M. Ludvigsen, General Relativity: A Geometric Approach
- B. A. Magurn,
An algebraic introduction to $K$-theory.
- D. Marcus,
Number Fields
- I.G. Mcdonald,
Algebraic geometry. Introduction to schemes
- H. McKean, V. Moll,
Elliptic curves. Function theory, geometry, arithmetic
- John Milnor, Introduction to algebraic K-theory.
- R. Miranda,
Algebraic curves and Riemann surfaces.
- K. Miyake,
Class field theory---its centenary and prospect.
- M. Miyanishi,
Algebraic geometry.
- R. Mollin,
Algebraic number theory
- P. Morandi, Field and Galois Theory
- C.J. Moreno,
Algebraic curves over finite fields
- C.J. Moreno,
Advanced analytic number theory. Part I. Ramification Theoretic methods
- D. Mumford
Abelian varieties
- D. Mumford
Tata lectures on theta. I
- D. Mumford
Tata lectures on theta. III
- D. Mumford
Red Book of Varieties
- K. Murty
Introduction to abelian varieties
- K. Murty
Seminar on Fermat's Last Theorem
- C. Musili,
Algebraic geometry for beginners.
- J. Neukirch,
Algebraische Zahlentheorie
- J. Neukirch, A. Schmid, K. Wingberg,
Cohomology of number fields
- H. Niederreiter, Ch. Xing,
Rational points on curves over finite fields: theory and applications.
- D.G. Northcott,
An introduction to homological algebra.
- T. Ono,
An introduction to algebraic number theory
- T. Ono,
Variations on a theme of Euler. Quadratic forms,
elliptic curves, and Hopf maps
- D. Perrin,
Géométrie algébrique. Une introduction
- V. Platonov, A. Rapinchuk,
Algebraic groups and number theory.
- Pollard, Diamond, Algebraic number theory
- V. Prasolov, Y. Solovyev,
Elliptic functions and elliptic integrals
- D. Ramakrishnan, R.J. Valenza,
Fourier Analysis on Number Fields
- E. Reyssat,
Quelques aspects des surfaces de Riemann.
- P. Ribenboim
The book of prime number records
- P. Ribenboim
13 Lectures on Fermat's Last Theorem, 1979.
- P. Ribenboim
Classical Theory of Algebraic Numbers
- L. Ribes,
Introduction to profinite groups and Galois cohomology
- A. Robert,
Elliptic curves
- A. Robert, A Course in p-adic Analysis
- S. Roman, Coding and Information Theory
- H.E. Rose,
A course in number theory
- M. Rosen
Number Theory of Function Fields
- J. Rosenberg, Algebraic K-theory and its applications.
- K. Rubin,
Euler systems
- P. Samuel,
Lectures on old and new results on algebraic curves
- V. Sanford, A Short History of Mathematics
- B.F. Schutz, A First Course in General Relativity.
- A. Seidenberg,
Elements of the theory of algebraic curves
- J.-P. Serre,
Abelian l-adic representations and elliptic curves
- J.-P. Serre,
Local Fields
- J.-P. Serre,
Galois cohomology
- I.R. Shafarevich,
Basic algebraic geometry. 1: Varieties in projective space
- I.R. Shafarevich,
Basic algebraic geometry. 2: Schemes amd complex manifolds
- S.S. Shatz,
Profinite groups, arithmetic, and geometry,
- G. Shimura,
Introduction to the arithmetic theory of automorphic functions
- J.H. Silverman,
Arithmetic of elliptic curves
- J.H. Silverman,
Advanced topics in the arithmetic of elliptic curves.
- J.H. Silverman, J. Tate,
Rational points on elliptic curves
- John R. Silvester, Introduction to algebraic K-theory.
- A. Skorobogatov,
Torsors and rational points
- N. Smart,
The algorithmic resolution of diophantine equations
- H. Smith
Report on Number Theory
- K. Smith, L. Kahanpää, P. Kekäläinen, W. Traves,
An invitation to algebraic geometry
- V. Srinivas, Algebraic K-theory
- H. Stephani, General Relativity
- I. Stewart, D. Tall,
Algebraic number theory.
- H. Stichtenoth,
Function Fields
- H.P.F. Swinnerton-Dyer,
A brief guide to algebraic number theory
- J. Tate,
Les conjectures de Stark sur les fonctions L d'Artin en s=0
- A.D. Thomas,
Zeta-functions: An introduction to algebraic geometry
- A. Trautmann, E. Pirani, H. Bondi,
Lectures on General Relativity
- K. Ueno,
An introduction to algebraic geometry.
- K. Ueno,
Algebraic geometry. 1. From algebraic varieties to schemes
- K. Ueno,
Algebraic geometry. 2. Sheaves and cohomology
- P. Du Val,
Elliptic functions and elliptic curves.
- C. Viola (ed.)
Arithmetic theory of elliptic curves.
- R. Wald, General Relativity
- R. Walker,
Plane Algebraic Curves
- L. Washington,
Introduction to cyclotomic fields. 1st ed.
- L. Washington,
Introduction to cyclotomic fields. 2nd ed.
- A. Weil,
Basic Number Theory
- A. Weil,
Number Theory - An approach through history,
- E. Weiss,
Algebraic number theory.
- E. Weiss,
Cohomology of Groups
- H. Weyl,
Algebraic Theory of Numbers
- J. Wilson
Profinite groups
- E. Witt,
Collected papers
- M. Yoshida,
Hypergeometric functions, my love.