On the Solutions of Three-Variable Frobenius-Related Problems Using Order Reduction Approach

IF 1 Q1 MATHEMATICS
T. He, P. Shiue, R. Venkat
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引用次数: 1

Abstract

This paper presents a new approach to determine the number of solutions of three-variable Frobenius-related problems and to find their solutions by using order reducing methods. Here, the order of a Frobenius-related problem means the number of variables appearing in the problem. We present two types of order reduction methods that can be applied to the problem of finding all nonnegative solutions of three-variable Frobenius-related problems. The first method is used to reduce the equation of order three from a three-variable Frobenius-related problem to be a system of equations with two fixed variables. The second method reduces the equation of order three into three equations of order two, for which an algorithm is designed with an interesting open problem on solutions left as a conjecture.
用阶约法求解三变量frobenius相关问题
本文提出了一种利用降阶方法确定三变量frobenius相关问题解的个数并求其解的新方法。在这里,frobenius相关问题的顺序意味着问题中出现的变量的数量。我们提出了两种可应用于寻找三变量frobenius相关问题的所有非负解的降阶方法。第一种方法是将三变量frobenius相关问题的三阶方程简化为两个固定变量的方程组。第二种方法是将三阶方程简化为三个二阶方程,并设计了一种算法,将一个有趣的开放问题的解留作猜想。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
INTERNATIONAL JOURNAL OF MATHEMATICS AND MATHEMATICAL SCIENCES
INTERNATIONAL JOURNAL OF MATHEMATICS AND MATHEMATICAL SCIENCES Mathematics-Mathematics (miscellaneous)
CiteScore
2.30
自引率
8.30%
发文量
60
审稿时长
17 weeks
期刊介绍: The International Journal of Mathematics and Mathematical Sciences is a refereed math journal devoted to publication of original research articles, research notes, and review articles, with emphasis on contributions to unsolved problems and open questions in mathematics and mathematical sciences. All areas listed on the cover of Mathematical Reviews, such as pure and applied mathematics, mathematical physics, theoretical mechanics, probability and mathematical statistics, and theoretical biology, are included within the scope of the International Journal of Mathematics and Mathematical Sciences.
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