Abstract
The paper addresses a new facet of problem regarding the application of AHP in the real world. There are occasions that decision makers are not certain about relative importance assignment in pairwise comparison. The decision makers think the relative importance is among a set of scales, each of which is associated with a different possibility degree. A Discrete Single Valued Neutrosophic Number (DSVNN) with specified degrees of truth, indeterminacy, and falsity is employed to represent each assignment by taking into account all possible scales according to the decision maker’s thought. Each DSVNN assignment is transformed into a crisp value via a deneutrosophication using a similarity-to-absolute-truth measure. The obtained crisp scales are input to a pairwise comparison matrix for further analysis. The proposed neutrosophic set-based relative importance assignment is another additional novelty of the paper, which is different from all prior studies focusing only on the definition of measurement scales. The presented assignment emulates the real-world approach of decision making in human beings which may consider more than one possibility. It is also shown herein that the single and crisp relative importance assignment in the original AHP by Saaty is just a special case of the proposed methodology. The sensitivity analysis informs that when decision makers have neither absolute truth nor falsity about a scale, the proposed methodology is recommended for obtaining reliable relative importance scale. The applicability of the proposed methodology to the real-world problem is shown through the investment in equity market.
Highlights
Among the most popular Multi-Criteria Decision Making (MCDM) methods is Analytical Hierarchy Process (AHP) [1,2]
Mathematics 2021, 9, 2636 that the present work is different from the aforementioned studies in that the present work applies the neutrosophic set to the relative importance assignment while the past studies focus on the new scale definitions
A Discrete Single Valued Neutrosophic Number (DSVNN) is a special neutrosophic set on the real number set R [17]
Summary
Among the most popular Multi-Criteria Decision Making (MCDM) methods is Analytical Hierarchy Process (AHP) [1,2]. The decision maker assigns a set of scales each of which is associated with the truth, indeterminacy, and falsity degree to indicate the relative importance. Mathematics 2021, 9, 2636 that the present work is different from the aforementioned studies in that the present work applies the neutrosophic set to the relative importance assignment while the past studies focus on the new scale definitions. The problem of preferential uncertainty in relative importance assignment for AHP is considered; Propose DSVNN as a model of assignment; and Illustrate the applications of DSVNN for such a purpose. After this introduction, theoretical backgrounds related to neutrosophic set are described.
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