Soft Approximations and Uni-Int Decision Making

Generalised Interval-Valued Fuzzy Soft Set

Journal of Applied Mathematics ◽

10.1155/2012/870504 ◽

2012 ◽

Vol 2012 ◽

pp. 1-18 ◽

Cited By ~ 10

Author(s):

Shawkat Alkhazaleh ◽

Abdul Razak Salleh

Keyword(s):

Decision Making ◽

Similarity Measure ◽

Fuzzy Set ◽

Medical Diagnosis ◽

Soft Set ◽

Fuzzy Soft Set ◽

Soft Sets ◽

Decision Making Problem ◽

Fuzzy Soft Sets ◽

Interval Valued

We introduce the concept of generalised interval-valued fuzzy soft set and its operations and study some of their properties. We give applications of this theory in solving a decision making problem. We also introduce a similarity measure of two generalised interval-valued fuzzy soft sets and discuss its application in a medical diagnosis problem: fuzzy set; soft set; fuzzy soft set; generalised fuzzy soft set; generalised interval-valued fuzzy soft set; interval-valued fuzzy set; interval-valued fuzzy soft set.

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An algorithm for fuzzy soft set based decision making approach

Yugoslav journal of operations research ◽

10.2298/yjor190715026m ◽

2020 ◽

Vol 30 (1) ◽

pp. 59-70

Author(s):

Shehu Mohammed ◽

Akbar Azam

Keyword(s):

Decision Making ◽

Set Theory ◽

Group Decision Making ◽

Group Decision ◽

Soft Set ◽

Mathematical Tool ◽

Fuzzy Soft Set ◽

Soft Sets ◽

Fuzzy Soft Sets ◽

Priority Table

The notion of soft set theory was initiated as a general mathematical tool for handling ambiguities. Decision making is viewed as a cognitive-based human activity for selecting the best alternative. In the present time, decision making techniques based on fuzzy soft sets have gained enormous attentions. On this development, this paper proposes a new algorithm for decision making in fuzzy soft set environment by hybridizing some existing techniques. The first novelty is the idea of absolute scores. The second concerns the concept of priority table in group decision making problems. The advantages of our approach herein are stronger power of objects discrimination and a well-determined inference.

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New expected impact functions and algorithms for modeling games under soft sets

Journal of Intelligent & Fuzzy Systems ◽

10.3233/jifs-200440 ◽

2020 ◽

Vol 39 (3) ◽

pp. 4463-4472

Author(s):

Irfan Deli ◽

Hoang Viet Long ◽

Le Hoang Son ◽

Raghvendra Kumar ◽

Arindam Dey

Keyword(s):

Decision Making ◽

Nash Equilibrium ◽

Model Theory ◽

Saddle Points ◽

Soft Set ◽

Soft Sets ◽

Matrix Games ◽

Soft Matrix ◽

Dominated Strategies

Soft set is the power tool to deal with uncertainty in a parametric manner. In applications of soft set, one of the most important steps is to define mappings on soft sets. In this study, we model theory of game under theory of soft set which is an effective tool for handling uncertainties events and problems that may exist in a game. To this end, we first define some expected impact functions of players in soft games. Then, we propose three new decision making algorithms to solve the 2.2 × p, 2 . n × p and m . 2 × p soft matrix games, which cannot be settled by the relevant soft methods such as saddle points, lover and upper values, dominated strategies and Nash equilibrium. The proposed soft game algorithms are illustrated by examples.

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An Interval Valued Fuzzy Soft Set Based Optimization Algorithm for High Yielding Seed Selection

International Journal of Fuzzy System Applications ◽

10.4018/ijfsa.2018040102 ◽

2018 ◽

Vol 7 (2) ◽

pp. 44-61 ◽

Cited By ~ 2

Author(s):

T. R. Sooraj ◽

B. K. Tripathy

Keyword(s):

Decision Making ◽

Experimental Verification ◽

Hybrid Models ◽

Soft Set ◽

Seed Selection ◽

Fuzzy Soft Set ◽

Soft Sets ◽

New Varieties ◽

Interval Valued ◽

Selection Of

As seed selection is a challenging task due to the presence of hundreds of varieties of seeds of each kind, some homework is necessary for selecting suitable seeds as new varieties and kinds of seeds are introduced in the market every year having their own strengths and weaknesses. The complexities involved in the characteristics in the form of parameters results in uncertainties and as a result some uncertainty based model or hybrid models of more than is required to model the scenario and come out with a decision. Soft sets have enough of parameterization tools to support and hence is the most suitable one for such a study. However, as hybrid models are more efficient, the authors select a model called the interval valued fuzzy soft set (IVFSS) and propose a decision-making algorithm for the selection of seeds. A real database of seeds is used for experimental verification of the efficiency of the algorithm. This is the first attempt for such a study. The use of signed priorities and intervals for the membership of values for entities makes the study more efficient and realistic.

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An Approach toward a Q-Neutrosophic Soft Set and Its Application in Decision Making

Symmetry ◽

10.3390/sym11020139 ◽

2019 ◽

Vol 11 (2) ◽

pp. 139 ◽

Cited By ~ 10

Author(s):

Majdoleen Abu Qamar ◽

Nasruddin Hassan

Keyword(s):

Decision Making ◽

Uncertain Data ◽

Real Life ◽

Soft Set ◽

Neutrosophic Set ◽

Uncertain Information ◽

Soft Sets ◽

Independent Functions ◽

Axis Of Symmetry ◽

Set Aggregation

A neutrosophic set was proposed as an approach to study neutral uncertain information. It is characterized through three memberships, T , I and F, such that these independent functions stand for the truth, indeterminate, and false-membership degrees of an object. The neutrosophic set presents a symmetric form since truth enrolment T is symmetric to its opposite false enrolment F with respect to indeterminacy enrolment I that acts as an axis of symmetry. The neutrosophic set was further extended to a Q-neutrosophic soft set, which is a hybrid model that keeps the features of the neutrosophic soft set in dealing with uncertainty, and the features of a Q-fuzzy soft set that handles two-dimensional information. In this study, we discuss some operations of Q-neutrosophic soft sets, such as subset, equality, complement, intersection, union, AND operation, and OR operation. We also define the necessity and possibility operations of a Q-neutrosophic soft set. Several properties and illustrative examples are discussed. Then, we define the Q-neutrosophic-set aggregation operator and use it to develop an algorithm for using a Q-neutrosophic soft set in decision-making issues that have indeterminate and uncertain data, followed by an illustrative real-life example.

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Combination of the Single-Valued Neutrosophic Fuzzy Set and the Soft Set with Applications in Decision-Making

Symmetry ◽

10.3390/sym12081361 ◽

2020 ◽

Vol 12 (8) ◽

pp. 1361 ◽

Cited By ~ 2

Author(s):

Ahmed Mostafa Khalil ◽

Dunqian Cao ◽

Abdelfatah Azzam ◽

Florentin Smarandache ◽

Wedad R. Alharbi

Keyword(s):

Decision Making ◽

Fuzzy Set ◽

Soft Set ◽

Fuzzy Decision Making ◽

Fuzzy Decision ◽

Fuzzy Soft Set ◽

Soft Sets ◽

Numerical Example ◽

Fuzzy Soft Sets ◽

Novel Concept

In this article, we propose a novel concept of the single-valued neutrosophic fuzzy soft set by combining the single-valued neutrosophic fuzzy set and the soft set. For possible applications, five kinds of operations (e.g., subset, equal, union, intersection, and complement) on single-valued neutrosophic fuzzy soft sets are presented. Then, several theoretical operations of single-valued neutrosophic fuzzy soft sets are given. In addition, the first type for the fuzzy decision-making based on single-valued neutrosophic fuzzy soft set matrix is constructed. Finally, we present the second type by using the AND operation of the single-valued neutrosophic fuzzy soft set for fuzzy decision-making and clarify its applicability with a numerical example.

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DFIS: A novel data filling approach for an incomplete soft set

International Journal of Applied Mathematics and Computer Science ◽

10.2478/v10006-012-0060-3 ◽

2012 ◽

Vol 22 (4) ◽

pp. 817-828 ◽

Cited By ~ 20

Author(s):

Hongwu Qin ◽

Xiuqin Ma ◽

Tutut Herawan ◽

Jasni Mohamad Zain

Keyword(s):

Decision Making ◽

Missing Data ◽

Soft Set ◽

Soft Sets ◽

Forecasting Accuracy ◽

Comparison Results ◽

Benchmark Datasets

The research on incomplete soft sets is an integral part of the research on soft sets and has been initiated recently. However, the existing approach for dealing with incomplete soft sets is only applicable to decision making and has low forecasting accuracy. In order to solve these problems, in this paper we propose a novel data filling approach for incomplete soft sets. The missing data are filled in terms of the association degree between the parameters when a stronger association exists between the parameters or in terms of the distribution of other available objects when no stronger association exists between the parameters. Data filling converts an incomplete soft set into a complete soft set, which makes the soft set applicable not only to decision making but also to other areas. The comparison results elaborated between the two approaches through UCI benchmark datasets illustrate that our approach outperforms the existing one with respect to the forecasting accuracy.

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A new approach to bipolar soft sets and its applications

Discrete Mathematics Algorithms and Applications ◽

10.1142/s1793830915500548 ◽

2015 ◽

Vol 07 (04) ◽

pp. 1550054 ◽

Cited By ~ 8

Author(s):

Faruk Karaaslan ◽

Serkan Karataş

Keyword(s):

Decision Making ◽

Set Theory ◽

Soft Set ◽

Mathematical Tool ◽

Soft Sets ◽

New Approach ◽

Basic Properties ◽

Set Operations ◽

First Results

Molodtsov [Soft set theory-first results, Comput. Math. App. 37 (1999) 19–31] proposed the concept of soft set theory in 1999, which can be used as a mathematical tool for dealing with problems that contain uncertainty. Shabir and Naz [On bipolar soft sets, preprint (2013), arXiv:1303.1344v1 [math.LO]] defined notion of bipolar soft set in 2013. In this paper, we redefine concept of bipolar soft set and bipolar soft set operations as more functional than Shabir and Naz’s definition and operations. Also we study on their basic properties and we present a decision making method with application.

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A Soft Interval Based Decision Making Method and Its Computer Application

Foundations of Computing and Decision Sciences ◽

10.2478/fcds-2021-0018 ◽

2021 ◽

Vol 46 (3) ◽

pp. 273-296

Author(s):

Gözde Yaylalı ◽

Nazan Çakmak Polat ◽

Bekir Tanay

Keyword(s):

Decision Making ◽

Set Theory ◽

Soft Set ◽

Computer Application ◽

Complex Data ◽

Soft Sets ◽

Mathematical Algorithm ◽

Huge Data ◽

Special Cases ◽

General Method

Abstract In today’s society, decision making is becoming more important and complicated with increasing and complex data. Decision making by using soft set theory, herein, we firstly report the comparison of soft intervals (SI) as the generalization of interval soft sets (ISS). The results showed that SIs are more effective and more general than the ISSs, for solving decision making problems due to allowing the ranking of parameters. Tabular form of SIs were used to construct a mathematical algorithm to make a decision for problems that involves uncertainties. Since these kinds of problems have huge data, constructing new and effective methods solving these problems and transforming them into the machine learning methods is very important. An important advance of our presented method is being a more general method than the Decision-Making methods based on special situations of soft set theory. The presented method in this study can be used for all of them, while the others can only work in special cases. The structures obtained from the results of soft intervals were subjected to test with examples. The designed algorithm was written in recently used functional programing language C# and applied to the problems that have been published in earlier studies. This is a pioneering study, where this type of mathematical algorithm was converted into a code and applied successfully.

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A Decision Making Method using Fuzzy Soft Sets

Malaysian Journal of Fundamental and Applied Sciences ◽

10.11113/mjfas.v9n2.91 ◽

2014 ◽

Vol 9 (2) ◽

Cited By ~ 1

Author(s):

Samsiah Abdul Razak ◽

Daud Mohamad

Keyword(s):

Decision Making ◽

Group Decision Making ◽

Group Decision ◽

Uncertain Data ◽

Soft Set ◽

Decision Makers ◽

Fuzzy Soft Set ◽

Soft Sets ◽

Analytic Hierarchy ◽

Fuzzy Soft Sets

The introduction of soft set theory by Molodstov has gained attention by many as it is useful in dealing with uncertain data. It is advantageous to use due to its parameterization form of data. This concept has been used in solving many decision making problems and has been generalized in various aspects in particular to fuzzy soft set (FSS) theory. In decision making using FSS, the objective is to select an object from a set of objects with respect to a set of choice parameter using fuzzy values. Although FSS theory has been extensively used in many applications, the importance of weight of parameters has not been highlighted and thus is not incorporated in the calculation. As it depends on one’s perception or opinion, the importance of the parameters may differ from one decision maker to another. Besides, existing methods in FSS only consider one or two decision makers to select the alternatives. In reality, group decision making normally involves more than two decision makers. In this paper we present a method for solving group decision making problems that involves more than two decision makers based on fuzzy soft set by taking into consideration the weight of parameters. The method of lambda – max which frequently utilize in fuzzy analytic hierarchy process (FAHP) has been applied to determine the weight of parameters and an algorithm for solving decision making problems is presented. Finally we illustrate the effectiveness of our method with a numerical example.

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