Publication date
April 2015
DOI Publisher
Faculty of Medicine, Universiti Kebangsaan Malaysia ISSN
0126-6039Abstract
We provide a solvability criterion for a cubic equation in domains Z3, Z3, and Q3
We provide a solvability criterion for a cubic equation in domains Z3, Z3, and Q3
We establish the solvability criteria for the equation xq=a in the field of p-adic numbers, for any ...
AbstractThe equation by2 + pn = x3 is regarded as a diophantine equation in the integer variables x,...
Algebraic equations over finite fields and over finite rings have been of interest due to their beau...
We provide the number of solutions of a cubic equation in domains , 3 \ , 3\ 3 and Q3
We provide a solvability criterion for a cubic equation in domains Z*3, Z3, and Q3
We give a criterion for the existence of solutions to an equation of the form x3 + ax = b, where a,...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
Unlike real numbers, in general, the cubic equation is not necessary to have a solution over p-adic ...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
A Diophantine problem means to find all solutions of an equation or system of equations in integers,...
One of the most frequently asked question in the p-adic lattice models of statistical mechanics is t...
The p-adic models of statistical mechanics require an investigation of the roots of polynomial equat...
AbstractIn this paper we provide a solvability criterion for the monomial equation xq=a over Qp for ...
We provide a solvability criterion for a cubic equation in domains . We show that, in principal, the...
The p-adic models of statistical mechanics require the investigation of roots of polynomial equation...
We establish the solvability criteria for the equation xq=a in the field of p-adic numbers, for any ...
AbstractThe equation by2 + pn = x3 is regarded as a diophantine equation in the integer variables x,...
Algebraic equations over finite fields and over finite rings have been of interest due to their beau...
We provide the number of solutions of a cubic equation in domains , 3 \ , 3\ 3 and Q3
We provide a solvability criterion for a cubic equation in domains Z*3, Z3, and Q3
We give a criterion for the existence of solutions to an equation of the form x3 + ax = b, where a,...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
Unlike real numbers, in general, the cubic equation is not necessary to have a solution over p-adic ...
Solvability criteria for cubic equations over the p-adic field, where p>3, were studied in previous ...
A Diophantine problem means to find all solutions of an equation or system of equations in integers,...
One of the most frequently asked question in the p-adic lattice models of statistical mechanics is t...
The p-adic models of statistical mechanics require an investigation of the roots of polynomial equat...
AbstractIn this paper we provide a solvability criterion for the monomial equation xq=a over Qp for ...
We provide a solvability criterion for a cubic equation in domains . We show that, in principal, the...
The p-adic models of statistical mechanics require the investigation of roots of polynomial equation...
We establish the solvability criteria for the equation xq=a in the field of p-adic numbers, for any ...
AbstractThe equation by2 + pn = x3 is regarded as a diophantine equation in the integer variables x,...
Algebraic equations over finite fields and over finite rings have been of interest due to their beau...
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