Majority multiplicative ordered weighting geometric operators and their use in the aggregation of multiplicative preference relations.
José Ignacio Peláez; Jesús María Doña; Alejandro Mesas
Mathware and Soft Computing (2005)
- Volume: 12, Issue: 2-3, page 107-120
- ISSN: 1134-5632
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topPeláez, José Ignacio, Doña, Jesús María, and Mesas, Alejandro. "Majority multiplicative ordered weighting geometric operators and their use in the aggregation of multiplicative preference relations.." Mathware and Soft Computing 12.2-3 (2005): 107-120. <http://eudml.org/doc/40862>.
@article{Peláez2005,
abstract = {In this paper, we introduced the majority multiplicative ordered weighted geometric (MM-OWG) operator and its properties. This is a general type of the aggregate dependent weights which we have applied in geometric environment. The MM-OWG operator is based on the OWG operators and on the majority operators. We provide the MM-OWG operators to aggregate in a multiplicative environment, i.e. when it's necessary to aggregate information given on a ratio scale. Therefore, it allows us to incorporate the concept of majority in problems where the information is provided using a ratio scale. Its properties are studied and an application for multicriteria decision making problems with multiplicative preference relations is presented.},
author = {Peláez, José Ignacio, Doña, Jesús María, Mesas, Alejandro},
journal = {Mathware and Soft Computing},
keywords = {Procesos de decisión; Lógica difusa; Operadores difusos},
language = {eng},
number = {2-3},
pages = {107-120},
title = {Majority multiplicative ordered weighting geometric operators and their use in the aggregation of multiplicative preference relations.},
url = {http://eudml.org/doc/40862},
volume = {12},
year = {2005},
}
TY - JOUR
AU - Peláez, José Ignacio
AU - Doña, Jesús María
AU - Mesas, Alejandro
TI - Majority multiplicative ordered weighting geometric operators and their use in the aggregation of multiplicative preference relations.
JO - Mathware and Soft Computing
PY - 2005
VL - 12
IS - 2-3
SP - 107
EP - 120
AB - In this paper, we introduced the majority multiplicative ordered weighted geometric (MM-OWG) operator and its properties. This is a general type of the aggregate dependent weights which we have applied in geometric environment. The MM-OWG operator is based on the OWG operators and on the majority operators. We provide the MM-OWG operators to aggregate in a multiplicative environment, i.e. when it's necessary to aggregate information given on a ratio scale. Therefore, it allows us to incorporate the concept of majority in problems where the information is provided using a ratio scale. Its properties are studied and an application for multicriteria decision making problems with multiplicative preference relations is presented.
LA - eng
KW - Procesos de decisión; Lógica difusa; Operadores difusos
UR - http://eudml.org/doc/40862
ER -
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