用对数切比雪夫近似法解决多标准成对比较问题中的热带优化应用

IF 3.2 3区 计算机科学 Q2 COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE
Nikolai Krivulin
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引用次数: 0

摘要

我们考虑了一个决策问题,即如何根据多个标准找到成对比较的备选方案的绝对评分,并对评分之间的比率以双面约束的形式加以限制。给定根据标准进行成对比较的矩阵,问题被表述为通过一个共同一致矩阵(单位秩的对称互易矩阵)对这些矩阵进行 log-Chebyshev 近似,以同时使所有矩阵的近似误差最小。我们将近似问题重新安排为一个受约束的多目标优化问题,即找到一个确定近似一致矩阵的向量。然后,我们用热带代数框架来表示这个问题,热带代数涉及幂等矢量的理论和应用,并为模糊运算和区间运算提供了形式基础。我们运用热带优化的方法和结果,根据各种最优性原则,开发出一种处理多目标优化问题的新方法。我们在最大排序、词典排序和词典最大排序最优性的意义上获得了新的完整解,这些解以紧凑的向量形式给出,可用于形式分析和高效计算。我们给出了解决多标准问题的数字示例,即通过成对比较对四个备选方案进行评级,以说明该技术并将其与其他技术进行比较。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Application of tropical optimization for solving multicriteria problems of pairwise comparisons using log-Chebyshev approximation

We consider a decision-making problem to find absolute ratings of alternatives that are compared in pairs under multiple criteria, subject to constraints in the form of two-sided bounds on ratios between the ratings. Given matrices of pairwise comparisons made according to the criteria, the problem is formulated as the log-Chebyshev approximation of these matrices by a common consistent matrix (a symmetrically reciprocal matrix of unit rank) to minimize the approximation errors for all matrices simultaneously. We rearrange the approximation problem as a constrained multiobjective optimization problem of finding a vector that determines the approximating consistent matrix. The problem is then represented in the framework of tropical algebra, which deals with the theory and applications of idempotent semirings and provides a formal basis for fuzzy and interval arithmetic. We apply methods and results of tropical optimization to develop a new approach for handling the multiobjective optimization problem according to various principles of optimality. New complete solutions in the sense of the max-ordering, lexicographic ordering and lexicographic max-ordering optimality are obtained, which are given in a compact vector form ready for formal analysis and efficient computation. We present numerical examples of solving multicriteria problems of rating four alternatives from pairwise comparisons to illustrate the technique and compare it with others.

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来源期刊
International Journal of Approximate Reasoning
International Journal of Approximate Reasoning 工程技术-计算机:人工智能
CiteScore
6.90
自引率
12.80%
发文量
170
审稿时长
67 days
期刊介绍: The International Journal of Approximate Reasoning is intended to serve as a forum for the treatment of imprecision and uncertainty in Artificial and Computational Intelligence, covering both the foundations of uncertainty theories, and the design of intelligent systems for scientific and engineering applications. It publishes high-quality research papers describing theoretical developments or innovative applications, as well as review articles on topics of general interest. Relevant topics include, but are not limited to, probabilistic reasoning and Bayesian networks, imprecise probabilities, random sets, belief functions (Dempster-Shafer theory), possibility theory, fuzzy sets, rough sets, decision theory, non-additive measures and integrals, qualitative reasoning about uncertainty, comparative probability orderings, game-theoretic probability, default reasoning, nonstandard logics, argumentation systems, inconsistency tolerant reasoning, elicitation techniques, philosophical foundations and psychological models of uncertain reasoning. Domains of application for uncertain reasoning systems include risk analysis and assessment, information retrieval and database design, information fusion, machine learning, data and web mining, computer vision, image and signal processing, intelligent data analysis, statistics, multi-agent systems, etc.
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