基于内外直接搜索优化技术的非概率系统数值研究

IF 1.8 3区 数学 Q1 MATHEMATICS
P. K. Panigrahi, S. Nayak
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引用次数: 2

摘要

在对参数定义不精确的物理系统进行建模时,经常会出现模糊方程组。有许多数学方法可用于研究它们,但由于计算复杂性和难以实现,处理它们是具有挑战性的。因此,本文将内外直接搜索(IODS)优化技术推广到模糊环境下求解非线性方程的模糊系统。扩展的主要目的是研究存在模糊信息的系统变量。为了管理模糊性,在不确定系统中采用模糊参数形式,控制向最优解的搜索过程。所提出的模糊IODS方法将非线性方程的模糊系统转化为无约束模糊优化问题。然后,利用IODS技术研究了无约束模糊优化问题。为了解决无约束模糊优化问题,利用探索性和模式搜索方法最小化模糊目标函数。这些搜索是通过内部和外部计算执行的。然后,得到的统一解给出使目标函数最小的期望解。从相同的不确定系统中,导出变量。为了验证解和算法的正确性,进行了收敛性分析。考虑了纯模糊系统和全模糊系统的三种情况,并讨论了各种情况。并与其他方法进行了比较,验证了该方法的有效性。利用MATLAB软件对所提出的算法进行了编码,并对结果进行了图形化分析。最后,简单的程序和计算效率的方法可以帮助实现同样的许多工程和科学问题,可以建模成方程组。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Numerical investigation of non-probabilistic systems using Inner Outer Direct Search optimization technique
Fuzzy systems of equations often appear while modeling physical systems with imprecisely defined parameters. Many mathematical methods are available to investigate them, but handling them is challenging due to the computational complexity and difficult implementation. As such, in this paper, the Inner-Outer Direct Search (IODS) optimization technique is extended in the fuzzy environment to solve a fuzzy system of nonlinear equations. The main purpose of the extension is to study the system variables in the presence of fuzzy information. To manage fuzziness, a fuzzy parametric form is employed in the uncertain system and controls the search process toward the optimal solution. The proposed approach of fuzzy IODS converts the fuzzy system of nonlinear equations to an unconstrained fuzzy optimization problem. Then, the unconstrained fuzzy optimization problem is studied through the IODS technique. To solve the unconstrained fuzzy optimization problem, the fuzzy objective function is minimized with the help of exploratory and pattern search approaches. These searches are performed with inner and outer computations. Then, the obtained united solution provides the desired solution which minimizes the objective function. From the same the uncertain system, variables are derived. To verify the solution and proposed algorithm, convergence analysis is performed. Three case studies are considered with only fuzzy and fully fuzzy systems, and various cases are discussed. A comparison with other methods is made to test the efficacy of the method. The proposed algorithm is coded with the help of MATLAB software, and the results are analyzed graphically. Finally, the simple procedure and computationally efficient approach may help to implement the same in many engineering and science problems that can be modeled into systems of equations.
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来源期刊
AIMS Mathematics
AIMS Mathematics Mathematics-General Mathematics
CiteScore
3.40
自引率
13.60%
发文量
769
审稿时长
90 days
期刊介绍: AIMS Mathematics is an international Open Access journal devoted to publishing peer-reviewed, high quality, original papers in all fields of mathematics. We publish the following article types: original research articles, reviews, editorials, letters, and conference reports.
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