Call Number (LC) | Title | Results |
---|---|---|
QA242 .E9 1983 | Upper bounds for the numbers of solutions of diophantine equations / | 1 |
QA242 .E939 2022 | Effective results and methods for diophantine equations over finitely / | 1 |
QA242 .E94 2015 |
Unit Equations in Diophantine Number Theory / Unit equations in Diophantine number theory / |
2 |
QA242 .E94 2022 | Effective Results and Methods for Diophantine Equations over Finitely Generated Domains. | 1 |
QA242 .E97 2012 | Explicit methods in number theory : rational points & Diophantine equations / | 1 |
QA242 .F34 2002 | Factorizations of bn [plus or minus symbol] 1, b=2, 3, 5, 6, 7, 10, 11, 12 up to high powers / | 1 |
QA242 .F57 2018 |
Diophantine approximation and the geometry of limit sets in Gromov hyperbolic metric spaces / Diophantine approximation and the geometry of limit sets in Gromov hyperbolic metric spaces |
3 |
QA242 .G22 2002 | Diophantine equations and power integral bases : new computational methods / | 1 |
QA242 .G22 2019eb | Diophantine equations and power integral bases : theory and algorithms / | 1 |
QA242 .G38 1818 | Theorematis fundamentalis in doctrina de residuis quadraticis demonstrationes et ampliationes novae / | 1 |
QA242 .G45 1960 | Die Auflösung von Gleichungen in ganzen Zahlen : (diophantische Gleichungen) / | 1 |
QA242 .G56 | Mehrgradige Gleichungen / | 1 |
QA242 .H29 1988 | Divisors / | 2 |
QA242 .H55 2000 |
Hilbert's tenth problem : relations with arithmetic and algebraic geometry : workshop on Hilbert's tenth problem : relations with arithmetic and algebraic geometry, November 2-5, 1999, Ghent University, Belgium / Hilbert's tenth problem : relations with arithmetic and algebraic geometry / |
2 |
QA242 .H8 2008 | Distribution theory of algebraic numbers / | 1 |
QA242 .H8 2008eb | Distribution theory of algebraic numbers / | 1 |
QA242 .J33 2009eb | Solving the Pell equation | 1 |
QA242 .K46 2021eb | A gateway to number theory : applying the power of algebraic curves / | 1 |
QA242 .L17 | Solutions of the Diophantine equation X[superscript 2] = DY[superscript 4]=K / | 1 |
QA242 .L2 | Diophantische Gleichungen mit endlich vielen Lösungen / | 1 |