Positive vectors, pairwise comparison matrices and directed Hamiltonian cycles

IF 1 3区 数学 Q1 MATHEMATICS Linear Algebra and its Applications Pub Date : 2024-07-06 DOI:10.1016/j.laa.2024.07.003
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Abstract

In the Analytic Hierarchy Process (AHP) the efficient vectors for a pairwise comparison matrix (PC matrix) are based on the principle of Pareto optimal decisions. To infer the efficiency of a vector for a PC matrix we construct a directed Hamiltonian cycle of a certain digraph associated with the PC matrix and the vector. We describe advantages of using this process over using the strong connectivity of the digraph. As an application of our process we find efficient vectors for a PC matrix, A, obtained from a consistent one by perturbing three entries above the main diagonal and the corresponding reciprocal entries, in a way that there is a square submatrix of A of order 2 containing three of the perturbed entries and not containing a diagonal entry of A. For completeness, we include examples showing conditions under which, when deleting a certain entry of an efficient vector for the square matrix A of order n, we have a non-efficient vector for the corresponding square principal submatrix of order n-1 of A.

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正向量、成对比较矩阵和有向哈密顿循环
在层次分析法(AHP)中,成对比较矩阵(PC 矩阵)的有效向量是基于帕累托最优决策原则。为了推断 PC 矩阵向量的效率,我们构建了与 PC 矩阵和向量相关联的某个数图的有向哈密顿循环。我们描述了使用这一过程比使用数图的强连接性更有优势。作为我们过程的一个应用,我们为 PC 矩阵 A 找到了有效的向量,该矩阵是通过扰动主对角线上方的三个条目和相应的倒数条目从一致矩阵中得到的,其方式是 A 的阶数为 2 的正方形子矩阵包含三个扰动条目,且不包含 A 的对角线条目。为完整起见,我们举例说明在删除 n 阶正方形矩阵 A 的有效向量的某个条目时,A 的 n-1 阶正方形主子矩阵相应的非有效向量的条件。
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来源期刊
CiteScore
2.20
自引率
9.10%
发文量
333
审稿时长
13.8 months
期刊介绍: Linear Algebra and its Applications publishes articles that contribute new information or new insights to matrix theory and finite dimensional linear algebra in their algebraic, arithmetic, combinatorial, geometric, or numerical aspects. It also publishes articles that give significant applications of matrix theory or linear algebra to other branches of mathematics and to other sciences. Articles that provide new information or perspectives on the historical development of matrix theory and linear algebra are also welcome. Expository articles which can serve as an introduction to a subject for workers in related areas and which bring one to the frontiers of research are encouraged. Reviews of books are published occasionally as are conference reports that provide an historical record of major meetings on matrix theory and linear algebra.
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