This paper presents a revolutionary computerized multiple criteria decision making method. The method was tested in a mathematical programming application by solving a complex multiple criteria production optimization problem. The proposed method, labeled the method of relative improvement preferences (RIP), is compared to the standard “what if” spreadsheet analysis in an empirical examination. Both of these computer-supported methods are appropriate for solving multiple criteria decision-making problems, especially when the number of alternatives is very large. Many interactive techniques are based on the standard what if model. The RIP method proposed in this paper, however, is a departure from the standard model. It is very user friendly...
Multi-criteria optimization problems naturally arise in practice when there is no single criterion f...
For multiple-criteria decision-making (MCDM) problems, interactive methods based on sequentially upd...
This paper considers the main positions of one-sided and two-sided problems. For one-sided problems ...
In practice, optimization problems are often multiple criteria. The criteria are usually contradicto...
In this dissertation a man-machine interactive mathematical programming method based on the theory o...
An interactive approach for discrete multiple criteria decision making problems is developed. The ap...
Solving multiobjective optimization problems means finding the best balance among multiple conflicti...
Interactive methods are useful decision-making tools for multiobjective optimization problems, becau...
Abstract: An original method is proposed for revealing preferences of a decision-making pe...
The objective of this dissertation is the development and description of a methodology which will he...
AMS subject classification: 90C29.The paper proposes an interactive method solving the multiple crit...
Interactive multiobjective optimization methods have proven promising in solving optimization proble...
In Multi-Response Surface Optimization (MRSO), responses are often in conflict. To obtain a satisfac...
There are many different methods for analysis of multiple criteria decision-making problems. Consid...
A simple, eclectic approach for solving discrete alternative multiple criteria decision problems is ...
Multi-criteria optimization problems naturally arise in practice when there is no single criterion f...
For multiple-criteria decision-making (MCDM) problems, interactive methods based on sequentially upd...
This paper considers the main positions of one-sided and two-sided problems. For one-sided problems ...
In practice, optimization problems are often multiple criteria. The criteria are usually contradicto...
In this dissertation a man-machine interactive mathematical programming method based on the theory o...
An interactive approach for discrete multiple criteria decision making problems is developed. The ap...
Solving multiobjective optimization problems means finding the best balance among multiple conflicti...
Interactive methods are useful decision-making tools for multiobjective optimization problems, becau...
Abstract: An original method is proposed for revealing preferences of a decision-making pe...
The objective of this dissertation is the development and description of a methodology which will he...
AMS subject classification: 90C29.The paper proposes an interactive method solving the multiple crit...
Interactive multiobjective optimization methods have proven promising in solving optimization proble...
In Multi-Response Surface Optimization (MRSO), responses are often in conflict. To obtain a satisfac...
There are many different methods for analysis of multiple criteria decision-making problems. Consid...
A simple, eclectic approach for solving discrete alternative multiple criteria decision problems is ...
Multi-criteria optimization problems naturally arise in practice when there is no single criterion f...
For multiple-criteria decision-making (MCDM) problems, interactive methods based on sequentially upd...
This paper considers the main positions of one-sided and two-sided problems. For one-sided problems ...