Add to ORKGWe provide a solvability criterion for a cubic equation in domains Z*3, Z3, and Q3
This article investigates the use of the history of mathematics as a pedagogical tool for the teachi...
A version of the Hardy–Littlewood circle method is developed for number fields K/QK/Q and is used to...
AbstractThe author determines all pure cubic fields Q(n3) whose class numbers are multiples of three
We provide a solvability criterion for a cubic equation in domains Z*3, Z3, and Q3
The p-adic models of statistical mechanics require an investigation of the roots of polynomial equat...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
The p-adic models of statistical mechanics require the investigation of roots of polynomial equation...
One of the most frequently asked question in the p-adic lattice models of statistical mechanics is t...
Unlike real numbers, in general, the cubic equation is not necessary to have a solution over p-adic ...
We give a criterion for the existence of solutions to an equation of the form x3 + ax = b, where a,...
We provide the number of solutions of a cubic equation in domains , 3 \ , 3\ 3 and Q3
A Diophantine problem means to find all solutions of an equation or system of equations in integers,...
We provide a solvability criterion for a cubic equation in domains . We show that, in principal, the...
Let M<SUB>s</SUB>, be the number of solutions of the equation X<SUB>1</SUB><SUP>3</SUP>+ X<SUB>2</SU...
This article investigates the use of the history of mathematics as a pedagogical tool for the teachi...
A version of the Hardy–Littlewood circle method is developed for number fields K/QK/Q and is used to...
AbstractThe author determines all pure cubic fields Q(n3) whose class numbers are multiples of three
We provide a solvability criterion for a cubic equation in domains Z*3, Z3, and Q3
The p-adic models of statistical mechanics require an investigation of the roots of polynomial equat...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
The p-adic models of statistical mechanics require the investigation of roots of polynomial equation...
One of the most frequently asked question in the p-adic lattice models of statistical mechanics is t...
Unlike real numbers, in general, the cubic equation is not necessary to have a solution over p-adic ...
We give a criterion for the existence of solutions to an equation of the form x3 + ax = b, where a,...
We provide the number of solutions of a cubic equation in domains , 3 \ , 3\ 3 and Q3
A Diophantine problem means to find all solutions of an equation or system of equations in integers,...
We provide a solvability criterion for a cubic equation in domains . We show that, in principal, the...
Let M<SUB>s</SUB>, be the number of solutions of the equation X<SUB>1</SUB><SUP>3</SUP>+ X<SUB>2</SU...
This article investigates the use of the history of mathematics as a pedagogical tool for the teachi...
A version of the Hardy–Littlewood circle method is developed for number fields K/QK/Q and is used to...
AbstractThe author determines all pure cubic fields Q(n3) whose class numbers are multiples of three