Methods for Arriving at Numerical Solutions for Equations of the Type (k+3) & (k+5) Bi-quadratic's Equal to a Bi-quadratic (For Different Values of k)

Seiji Tomita; Oliver Couto

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Methods for Arriving at Numerical Solutions for Equations of the Type (k+3) & (k+5) Bi-quadratic's Equal to a Bi-quadratic (For Different Values of k)

机译：（k + 3）和（k + 5）双二次型等于双二次型的方程的数值解的求解方法（对于k的不同值）

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Different authors have done analysis regarding sums of powers (Ref. no. 1,2 & 3), but systematic approach for solving Diophantine equations having sums of many bi-quadratics equal to a quartic has not been done before. In this paper we give methods for finding numerical solutions to equation (A) given above in section one. Next in section two, we give methods for finding numerical solutions for equation (B) given above. It is known that finding parametric solutions to biquadratic equations is not easy by conventional method. So the authors have found numerical solutions to equation (A) & (B) using elliptic curve theory.

机译：不同的作者已经完成了关于幂和的分析（参考文献1,2和3），但是以前尚未完成系统的求解Diophantine方程的方法，该方程具有多个等于一个四次方程的双二次方程。在本文中，我们提供了找到第一节中给出的方程（A）的数值解的方法。接下来，在第二部分中，我们给出了找到上述方程（B）的数值解的方法。众所周知，用常规方法很难找到双二次方程的参数解。因此，作者使用椭圆曲线理论找到了方程（A）和（B）的数值解。

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《Universal Journal of Applied Mathematics》 |2016年第2期|共6页
作者
Seiji Tomita; Oliver Couto;
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中图分类数学;
关键词
Sums of PowersDiophantine EquationElliptic Curves;

机译：幂之和Diophantine方程椭圆曲线;

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1. On Set-Valued Solutions of a Generalized Bi-quadratic Functional Equation [J] . EL-Fassi Iz-iddine, El-Hady El-Sayed, Nikodem Kazimierz Results in mathematics . 2020,第3期

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2. Lipschitz criteria for bi-quadratic functional equations [J] . Ismail Nikoufar Communications of the Korean Mathematical Society . 2016,第4期

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3. On a bi-quadratic functional equation and its stability [J] . Park WG, Bae JH Nonlinear Analysis: An International Multidisciplinary Journal . 2005,第4期

机译：双二次函数方程及其稳定性
4. On bi-quadratic equation with four unknowns 7xy+3z~2 = 3w~4 [C] . Shreemathi Adiga International Conference on Advances in Applicable Mathematics . 2020

机译：关于四个未知的双二次方程7xy + 3z〜2 = 3W〜4
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Methods for Arriving at Numerical Solutions for Equations of the Type (k+3) & (k+5) Bi-quadratic's Equal to a Bi-quadratic (For Different Values of k)

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