What is it about?
Therefore, in this paper the Leibniz's formula properties are explored for these matrices determinant calculus. The main objective of this approach is to insert, in the AHP framework, new theories to the study of consistent and near consistent matrices. For that, two models of near consistent matrices are implemented, namely multiplicative and additive. In addition, some consequent results are explored, such as, diagonalization and exponential matrix.
Featured Image
Photo by John Schnobrich on Unsplash
Why is it important?
In the Analytic Hierarchy Process (AHP) are expected consistent matrices when the decision-maker performs perfect judgements. Such matrices rarely appear in real situations, since humans do not always decide in the same way. However, understanding these matrices helps to understand the near consistent matrices, which actually occur in real situations.
Read the Original
This page is a summary of: A tool for the Analytic Hierarchy Process based on Leibniz's formula for determinants computation, C Q D - Revista Eletrônica Paulista de Matemática, July 2021, C.Q.D.- Revista Eletronica Paulista de Matematica,
DOI: 10.21167/cqdvol20202123169664broaroapcfmaqd1221.
You can read the full text:
Contributors
The following have contributed to this page
