Your search keyword '"Shortest path problem"' showing total 22 results

1. A Novel Method for Solving the Time-Dependent Shortest Path Problem under Bipolar Neutrosophic Fuzzy Arc Values.

Author

K., Vidhya, A., Saraswathi, and Said, Broumi

Subjects

*FUZZY numbers, *WEATHER, *FUZZY graphs, *ALGORITHMS, *COMPARATIVE studies, *EVERYDAY life

Abstract

The Shortest path problem is highly relevant in our daily lives, addressing uncertainties like traffic conditions and weather variations. To handle such uncertainties, we utilize Fuzzy Numbers. This paper focuses on Bipolar Neutrosophic Fuzzy Numbers, which have dual positive and negative aspects. They provide a robust framework for representing arc (node/edge) weights, signifying uncertain travel times between nodes. Importantly, these weights can change over time in bipolar neutrosophic fuzzy graphs. Our study introduces an extended Bellman-Ford Algorithm for identifying optimal paths and minimum times with time-dependent Bipolar Neutrosophic Fuzzy arc weights. We demonstrate its effectiveness through a step-by-step numerical example and conduct a comparative analysis to evaluate its efficiency. [ABSTRACT FROM AUTHOR]

Published

2024

2. Employing the Bellman-Ford Algorithm with Score Functions to Address the Linear Diophantine Fuzzy Shortest Path Problem in Network Analysis.

Author

Kannan, Vidhya and Appasamy, Saraswathi

Subjects

FUZZY numbers, FUZZY graphs, ALGORITHMS

Abstract

The realms of Intuitionistic Fuzzy Sets (IFSs), Pythagorean Fuzzy Sets (PFS), and qrung Orthopair Fuzzy Sets (q-ROFSs) have found extensive applications across various disciplines, notably in resolving real-world problems. However, limitations concerning membership and non-membership grades pose challenges to these theories. Efforts to mitigate these constraints have led to the introduction of a new concept, the Linear Diophantine Fuzzy Set (LDFS), with reference parameters. This study advances the shortest path (SP) problem for Linear Diophantine Fuzzy graphs. An innovative method for constructing direct network graphs within a Linear Diophantine Fuzzy (LDF) context is proposed. Distances or costs between nodes are encapsulated by Linear Diophantine Fuzzy numbers. The principal contribution of this investigation lies in proposing a novel approach to solving the Linear Fuzzy Diophantine Fuzzy shortest path problem using the Bellman-Ford algorithm for optimal solution attainment. Usage of the score function enables the comparison and identification of the minimum arc value between nodes. The proposed algorithm's validity is demonstrated through a numerical example, and a comparison with existing methodologies underscores the benefits of the proposed algorithm. [ABSTRACT FROM AUTHOR]

Published

2023

3. Calculation of Fuzzy shortest path problem using Multi-valued Neutrosophic number under fuzzy environment.

Author

Raut, Prasanta Kumar, Behera, Siva Prasad, Broumi, Said, and Mishra, Debdas

Subjects

*GRAPH theory, *GRAPH connectivity, *DIRECTED graphs, *FIRE stations, *TELECOMMUNICATION systems, *SERVICE stations, *FUZZY numbers

Abstract

The most well-known subject in graph theory is the shortest path problem (SPP), which has real-world applications in several different fields of study, including transportation, emergency services, network communications, fire station services, etc. The arc weights of the applicable SP problems are typically represented by fuzzy numbers in real-world applications. In this paper, we discussed the process of finding the shortest distance in a connected graph network in which the arc weights are multi-valued neutrosophic numbers (MNNs). Moreover, here we compare our method with some of the existing results and illustrate one implementation of our method with the help of one numerical example. [ABSTRACT FROM AUTHOR]

Published

2023

4. Floyd-Warshall Algorithm Based on Picture Fuzzy Information.

Author

Habib, Shaista, Majeed, Aqsa, Akram, Muhammad, and Ali Al-Shamiri, Mohammed M.

Subjects

ALGORITHMS, FUZZY algorithms, COMPUTER networks, PICTURES, FUZZY numbers, FUZZY sets

Abstract

The Floyd-Warshall algorithm is frequently used to determine the shortest path between any pair of nodes. It works well for crisp weights, but the problem arises when weights are vague and uncertain. Let us take an example of computer networks, where the chosen path might no longer be appropriate due to rapid changes in network conditions. The optimal path from among all possible courses is chosen in computer networks based on a variety of parameters. In this paper, we design a new variant of the Floyd-Warshall algorithm that identifies an All-Pair Shortest Path (APSP) in an uncertain situation of a network. In the proposed methodology, multiple criteria and their mutual association may involve the selection of any suitable path between any two node points, and the values of these criteria may change due to an uncertain environment. We use trapezoidal picture fuzzy addition, score, and accuracy functions to find APSP. We compute the time complexity of this algorithm and contrast it with the traditional Floyd-Warshall algorithm and fuzzy Floyd-Warshall algorithm. [ABSTRACT FROM AUTHOR]

Published

2023

5. Admissible Orders on Fuzzy Numbers.

Author

Zumelzu, Nicolas, Bedregal, Benjamin, Mansilla, Edmundo, Bustince, Humberto, and Diaz, Roberto

Subjects

WEIGHTED graphs, FUZZY graphs, FUZZY numbers, LINEAR orderings, FUZZY sets

Abstract

From the more than two hundred partial orders for fuzzy numbers proposed in the literature, only a few are total. In this article, we introduce the notion of admissible order for fuzzy numbers equipped with a partial order, i.e., a total order which refines the partial order. In particular, it is given special attention to the partial order proposed by Klir and Yuan in 1995. Moreover, we propose a method to construct admissible orders on fuzzy numbers in terms of linear orders defined for intervals considering a strictly increasing upper dense sequence, proving that this order is admissible for a given partial order. Finally, we use admissible orders to ranking the path costs in fuzzy weighted graphs. [ABSTRACT FROM AUTHOR]

Published

2022

6. Bellman–Ford algorithm for solving shortest path problem of a network under picture fuzzy environment.

Author

Parimala, Mani, Broumi, Said, Prakash, Karthikeyan, and Topal, Selçuk

Subjects

FUZZY numbers, SET theory, PICTURES, FUZZY graphs, RESEARCH methodology

Abstract

An elongation of the novel intuitionistic fuzzy set is a picture fuzzy set theory. The demonstration of this has been used to deal with the abstinence criteria in a decision-making problem. The uncertainty in nature occurs sometimes in real-world problems and amidst them, the prominent one is the shortest path problem (SPP) solving. In the last few years, one of the best algorithms on the network for finding SPP is Bellman–Ford. Due to uncertainty in the decision-making process, it becomes difficult for decision-makers for communicating their point of view and judgment with certainty. We conceive of SPP in this contribution via Bellman's algorithm (BA) for a network with trapezoidal picture fuzzy numbers (TPFNs). We introduce a new algorithm to stand the shortest picture fuzzy path between each pair of nodes. A TPFN is considered for the length of all edges. A numerical example for the validation of the presented algorithm has also been proposed. There has also been relative research with existing techniques showing the benefits of the new algorithm. [ABSTRACT FROM AUTHOR]

Published

2021

7. Modified artificial bee colony algorithm for solving mixed interval-valued fuzzy shortest path problem.

Author

Ebrahimnejad, Ali, Enayattabr, Mohammad, Motameni, Homayun, and Garg, Harish

Subjects

BEES algorithm, WIRELESS sensor networks, PARTICLE swarm optimization, FUZZY numbers, MEMBERSHIP functions (Fuzzy logic)

Abstract

In recent years, numerous researchers examined and analyzed several different types of uncertainty in shortest path (SP) problems. However, those SP problems in which the costs of arcs are expressed in terms of mixed interval-valued fuzzy numbers are less addressed. Here, for solving such uncertain SP problems, first a new procedure is extended to approximate the summation of mixed interval-valued fuzzy numbers using alpha cuts. Then, an extended distance function is introduced for comparing the path weights. Finally, we intend to use a modified artificial bee colony (MABC) algorithm to find the interval-valued membership function of SP in such mixed interval-valued fuzzy network. The proposed algorithm is illustrated via two applications of SP problems in wireless sensor networks and then the results are compared with those derived from genetic and particle swarm optimization (PSO) algorithms, based on three indexes convergence iteration, convergence time and run time. The obtained results confirm that the MABC algorithm has less convergence iteration, convergence time and implementation time compared to GA and PSO algorithm. [ABSTRACT FROM AUTHOR]

Published

2021

8. Fuzzy Constrained Shortest Path Problem for Location-Based Online Services.

Author

Sori, Ali Abbaszadeh, Ebrahimnejad, Ali, Motameni, Homayun, and Verdegay, Jose Luis

Subjects

*LOCATION-based services, *ENVIRONMENTAL economics, *WEATHER, *FUZZY numbers, *DYNAMIC programming

Abstract

One of the important issues under discussion connected with traffic on the roads is improving transportation. In this regard, spatial information, including the shortest path, is of particular importance due to the reduction of economic and environmental costs. Here, the constrained shortest path (CSP) problem which has an important application in location-based online services is considered. The aim of this problem is to find a path with the lowest cost where the traversal time of the path does not exceed from a predetermined time bound. Since precise prediction of cost and time of the paths is not possible due to traffic and weather conditions, this paper discusses the CSP problems with fuzzy cost and fuzzy time. After formulating the CSP problem an efficient algorithm for finding the constrained optimal path is designed. The application of the proposed model is presented on a location-based online service called Snap. [ABSTRACT FROM AUTHOR]

Published

2021

9. Solving fuzzy multi-objective shortest path problem based on data envelopment analysis approach.

Author

Bagheri, M., Ebrahimnejad, Ali, Razavyan, S., Lotfi, F. Hosseinzadeh, and Malekmohammadi, N.

Subjects

DATA envelopment analysis, LINEAR programming, FUZZY graphs, QUALITY of service

Abstract

The shortest path problem (SPP) is a special network structured linear programming problem that appears in a wide range of applications. Classical SPPs consider only one objective in the networks while some or all of the multiple, conflicting and incommensurate objectives such as optimization of cost, profit, time, distance, risk, and quality of service may arise together in real-world applications. These types of SPPs are known as the multi-objective shortest path problem (MOSPP) and can be solved with the existing various approaches. This paper develops a Data Envelopment Analysis (DEA)-based approach to solve the MOSPP with fuzzy parameters (FMOSPP) to account for real situations where input–output data include uncertainty of triangular membership form. This approach to make a connection between the MOSPP and DEA is more flexible to deal with real practical applications. To this end, each arc in a FMOSPP is considered as a decision-making unit with multiple fuzzy inputs and outputs. Then two fuzzy efficiency scores are obtained corresponding to each arc. These fuzzy efficiency scores are combined to define a unique fuzzy relative efficiency. Hence, the FMOSPP is converted into a single objective Fuzzy Shortest Path Problem (FSPP) that can be solved using existing FSPP algorithms. [ABSTRACT FROM AUTHOR]

Published

2021

10. An optimization study based on Dijkstra algorithm for a network with trapezoidal picture fuzzy numbers.

Author

Akram, Muhammad, Habib, Amna, and Alcantud, José Carlos R.

Subjects

*FUZZY numbers, *ALGORITHMS, *FUZZY algorithms, *EXPECTED returns, *PICTURES, *EXERCISE

Abstract

Path finding models attempt to provide efficient approaches for finding shortest paths in networks. A well-known shortest path algorithm is the Dijkstra algorithm. This paper redesigns it in order to tackle situations in which the parameters of the networks may be uncertain. To be precise, we allow that the parameters take the form of special picture fuzzy numbers. We use this concept so that it can flexibly fit the vague character of subjective decisions. The main contributions of this article are fourfold: (i) The trapezoidal picture fuzzy number along with its graphical representation and operational laws is defined. (ii) The comparison of trapezoidal picture fuzzy numbers on the basis of their expected values is proposed in terms of their score and accuracy functions. (iii) Based on these elements, we put forward an adapted form of the Dijkstra algorithm that works out a picture fuzzy shortest path problem, where the costs associated with the arcs are captured by trapezoidal picture fuzzy numbers. Also, a pseudocode for the application of our solution is provided. (iv) The proposed algorithm is numerically evaluated on a transmission network to prove its practicality and efficiency. Finally, a comparative analysis of our proposed method with the fuzzy Dijkstra algorithm is presented to support its cogency. [ABSTRACT FROM AUTHOR]

Published

2021

11. A novel lexicographic optimization method for solving shortest path problems with interval-valued triangular fuzzy arc weights.

Author

Ebrahimnejad, Ali, Tabatabaei, Somayeh, and Santos-Arteaga, Francisco J.

Subjects

*WIRELESS sensor networks, *LINEAR programming, *FUZZY numbers, *TELECOMMUNICATION

Abstract

Shortest path (SP) optimization problems arise in a wide range of applications such as telecommunications and transportation industries. The main purpose of these problems is to find a path between two predetermined nodes within a network as cheaply or quickly as possible. Conventional SP problems generally assume that the arc weights are defined by crisp variables, though imprecise data have been lately incorporated into the analysis. The present study formulates the SP problem in a directed interval-valued triangular fuzzy network. The resulting interval-valued fuzzy SP (IVFSP) problem is converted into a multi objective linear programming (MOLP) problem. Then, a lexicographic optimization structure is used to obtain the efficient solution of the resulting MOLP problem. The optimization process confirms that the optimum interval-valued fuzzy shortest path weight preserves the form of an interval-valued triangular fuzzy number. The applicability of the proposed approach is illustrated through an example dealing with wireless sensor networks. [ABSTRACT FROM AUTHOR]

Published

2020

12. A novel approach for solving all-pairs shortest path problem in an interval-valued fuzzy network.

Author

Enayattabr, M., Ebrahimnejad, A., Motameni, H., and Garg, H.

Subjects

*WIRELESS sensor networks, *FUZZY numbers

Abstract

Researchers have studied several different types of directed shortest path (SP) problems under fuzzy environment. However, few researchers have focused on solving this problem in an interval-valued fuzzy network. Thus, in order to light these, we investigate a generalized kind of the SP problem under interval-valued fuzzy environment namely all pairs shortest path (APSP) problem. The main contributions of the present study are fivefold: (1) In the interval-valued fuzzy network under consideration, each arc weight is represented in terms of interval-valued fuzzy number. (2) We seek the shortest weights between every pair of nodes in a given interval-valued fuzzy network based on a dynamic approach. (3) In contrast to most existing approaches, which provide the shortest path between two predetermined nodes, the proposed approach provides the interval-valued fuzzy shortest path between every pair of nodes. (4) Similarly to the competing methods in the literature, the proposed approach not only gives the interval-valued fuzzy weights of all pairs shortest path but also provides the corresponding interval-valued fuzzy APSP. (5) The efficiency of the proposed approach is illustrated through two applications of APSP problems in wireless sensor networks and robot path planning problems. [ABSTRACT FROM AUTHOR]

Published

2019

13. Dijkstra algorithm for shortest path problem under interval-valued Pythagorean fuzzy environment.

Author

Enayattabar, Mohammad, Ebrahimnejad, Ali, and Motameni, Homayun

Subjects

FUZZY numbers, ALGORITHMS, FUZZY graphs, FUZZY sets, FUZZY mathematics

Abstract

Pythagorean fuzzy set as an extension of fuzzy set has been presented to handle the uncertainty in real-world decision-making problems. In this work, we formulate a shortest path (SP) problem in an interval-valued Pythagorean fuzzy environment. Here, the costs related to arcs are taken in the form of interval-valued Pythagorean fuzzy numbers (IVPFNs). The main contributions of this paper are fourfold: (1) the interval-valued Pythagorean fuzzy optimality conditions in directed networks are described to design of solution algorithm. (2) To do this, an improved score function is used to compare the costs between different paths with their arc costs represented by IVPFNs. (3) Based on these optimality conditions and the improved score function, the traditional Dijkstra algorithm is extended to find the cost of interval-valued Pythagorean fuzzy SP (IVPFSP) and corresponding IVPFSP. (4) Finally, a small sized telecommunication network is provided to illustrate the potential application of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2019

14. Neutrosophic Shortest Path Problem.

Author

Kumar, Ranjan, Edaltpanah, S. A., Jha, Sripati, Broumi, Said, and Dey, Arindam

Subjects

*NEUTROSOPHIC logic, *FUZZY numbers, *MATHEMATICAL optimization, *GEOGRAPHIC information systems, *GENETIC algorithms

Abstract

Neutrosophic set theory provides a new tool to handle the uncertainties in shortest path problem (SPP). This paper introduces the SPP from a source node to a destination node on a neutrosophic graph in which a positive neutrosophic number is assigned to each edge as its edge cost. We define this problem as neutrosophic shortest path problem (NSSPP). A simple algorithm is also introduced to solve the NSSPP. The proposed algorithm finds the neutrosophic shortest path (NSSP) and its corresponding neutrosophic shortest path length (NSSPL) between source node and destination node. Our proposed algorithm is also capable to find crisp shortest path length (CrSPL) of the corresponding neutrosophic shortest path length (NSSPL) which helps the decision maker to choose the shortest path easily. We also compare our proposed algorithm with some existing methods to show efficiency of our proposed algorithm. Finally, some numerical experiments are given to show the effectiveness and robustness of the new model. Numerical and graphical results demonstrate that the novel methods are superior to the existing method. [ABSTRACT FROM AUTHOR]

Published

2018

15. A novel artificial bee colony algorithm for shortest path problems with fuzzy arc weights.

Author

Ebrahimnejad, Ali, Tavana, Madjid, and Alrezaamiri, Hamidreza

Subjects

*BEES algorithm, *FUZZY algorithms, *CLUSTER set theory, *LEAST squares, *ISOTONIC regression

Abstract

The shortest path (SP) problem is a network optimization problem with a wide range of applications in business and engineering. Conventional network problems assume precise values for the weights of the edges. However, these weights are often vague and ambiguous in practical applications. Several heuristics have been proposed to find the shortest path (SP) weight and the corresponding SP on a network with fuzzy arc weights. These heuristics largely use α -cuts and the least squares method. We propose an artificial bee colony (ABC) algorithm to solve the fuzzy SP (FSP) problems with fuzzy arc weights. The performance of the proposed ABC algorithm is compared with the performance of other competing algorithms with two SP problems taken from the literature. We present a wireless sensor network (WSN) problem and demonstrate the applicability of the proposed method and exhibit the efficiency of the procedures and algorithms. [ABSTRACT FROM AUTHOR]

Published

2016

16. The attitude of MCDM approaches versus the optimization model in finding the safest shortest path on a fuzzy network.

Author

Özçelik, Gökhan

Subjects

*MULTIPLE criteria decision making, *FUZZY sets, *COMPUTATIONAL complexity, *FUZZY numbers

Abstract

• An auxiliary algorithm is proposed to construct initial stage of the MCDM methods. • A multi-objective fuzzy optimization model is formulated. • An extensive comparative analysis is conducted in terms of the addressed methods. • The stability and validity of the results are tested and discussed. • Key findings and managerial insights are provided. This paper examines the performances of the multi-criteria decision-making (MCDM) methods and optimization model in solving multi-attribute shortest path problems such as the safest shortest path under a fuzzy environment. To the best of the knowledge of the authors, this is the first study performing comparative analysis on finding the multi-attribute shortest path by employing well-known techniques in terms of computational effort and results in a fuzzy environment. To this end, the safest shortest path problem, where the risk and distance values concerning arcs on a directed network are defined as triangular fuzzy numbers, is handled. The solution process is carried out under two main headings: (i) To start the solution with MCDM methods, an auxiliary algorithm that constructs a fuzzy decision matrix is proposed. Then, Fuzzy-Technique for Order Preference by Similarity to Ideal Solution (F-TOPSIS), Fuzzy Simple Additive Weighting (F-SAW), and Fuzzy Evaluation Based on Distance from Average Solution (F-EDAS), that are fuzzy-based MCDM methods, are employed to rank the alternative paths. (ii) A multi-objective fuzzy optimization model is formulated, and the most reasonable paths are obtained considering different α-cut levels. Following that, comparative analysis is performed through a set of scenarios considering the different weights of the criteria to see the variability in the rankings. Besides, the addressed fuzzy-based MCDM methods are compared in terms of computational complexity. Overall, the main findings and managerial insights regarding the effectiveness and performance of the methods discussed in the solution process are provided. [ABSTRACT FROM AUTHOR]

Published

2022

17. Admissible orders on fuzzy numbers

Author

Nicolas Zumelzu, Benjamin Bedregal, Edmundo Mansilla, Humberto Bustince, Roberto Diaz, Universidad Pública de Navarra. Departamento de Estadística, Informática y Matemáticas, Universidad Pública de Navarra / Nafarroako Unibertsitate Publikoa. ISC - Institute of Smart Cities, and Nafarroako Unibertsitate Publikoa. Estatistika, Informatika eta Matematikak Saila

Subjects

Fuzzy sets, Shortest path problem, Orders on fuzzy numbers, Writing, Applied Mathematics, Fuzzy weighted graphs, Uncertainty, Fuzzy numbers, Topology, Kernel, Computational Theory and Mathematics, Admissible orders, Artificial Intelligence, Control and Systems Engineering, General Mathematics (math.GM), FOS: Mathematics, Mathematics - General Mathematics, Upper bound

Abstract

From the more than two hundred partial orders for fuzzy numbers proposed in the literature, only a few are total. In this paper, we introduce the notion of admissible order for fuzzy numbers equipped with a partial order, i.e. a total order which refines the partial order. In particular, it is given special attention to the partial order proposed by Klir and Yuan in 1995. Moreover, we propose a method to construct admissible orders on fuzzy numbers in terms of linear orders defined for intervals considering a strictly increasing upper dense sequence, proving that this order is admissible for a given partial order. Finally, we use admissible orders to ranking the path costs in fuzzy weighted graphs., Comment: 11 pages, 12 figures

Published

2020

18. Fuzzy Dijkstra algorithm for shortest path problem under uncertain environment.

Author

Deng, Yong, Chen, Yuxin, Zhang, Yajuan, and Mahadevan, Sankaran

Subjects

FUZZY algorithms, PROBLEM solving, GENERALIZATION, FUZZY numbers, NUMERICAL analysis, PATHS & cycles in graph theory

Abstract

Abstract: A common algorithm to solve the shortest path problem (SPP) is the Dijkstra algorithm. In this paper, a generalized Dijkstra algorithm is proposed to handle SPP in an uncertain environment. Two key issues need to be addressed in SPP with fuzzy parameters. One is how to determine the addition of two edges. The other is how to compare the distance between two different paths with their edge lengths represented by fuzzy numbers. To solve these problems, the graded mean integration representation of fuzzy numbers is adopted to improve the classical Dijkstra algorithm. A numerical example of a transportation network is used to illustrate the efficiency of the proposed method. [Copyright &y& Elsevier]

Published

2012

19. Fuzzy shortest path problems incorporating interactivity among paths

Author

Okada, Shinkoh

Subjects

*FUZZY numbers, *CRITICAL path analysis, *POSSIBILITY, *FUZZY sets

Abstract

This paper deals with a shortest path problem on a network in which a fuzzy number, instead of a real number, is assigned to each arc length. Such a problem is “ill-posed” because each arc cannot be identified as being either on the shortest path or not. Therefore, based on the possibility theory, we introduce the concept of “degree of possibility” that an arc is on the shortest path. Every pair of distinct paths from the source node to any other node is implicitly assumed to be noninteractive in the conventional approaches. This assumption is unrealistic and involve inconsistencies. To overcome this drawback, we define a new comparison index between the sum of fuzzy numbers by considering interactivity among fuzzy numbers. An algorithm is presented to determine the degree of possibility for each arc on a network. Finally, this algorithm is evaluated by means of large-scale numerical examples. Consequently, we can find this approach is efficient even for real world practical networks. [Copyright &y& Elsevier]

Published

2004

20. Applying the Dijkstra Algorithm to Solve a Linear Diophantine Fuzzy Environment.

Author

Parimala, Mani, Jafari, Saeid, Riaz, Muhamad, and Aslam, Muhammad

Subjects

*FUZZY numbers, *ALGORITHMS, *DIRECTED graphs, *FUZZY sets, *TELECOMMUNICATION systems, *FUZZY graphs

Abstract

Linear Diophantine fuzzy set (LDFS) theory expands Intuitionistic fuzzy set (IFS) and Pythagorean fuzzy set (PyFS) theories, widening the space of vague and uncertain information via reference parameters owing to its magnificent feature of a broad depiction area for permissible doublets. We codify the shortest path (SP) problem for linear Diophantine fuzzy graphs. Linear Diophantine fuzzy numbers (LDFNs) are used to represent the weights associated with arcs. The main goal of the presented work is to create a solution technique for directed network graphs by introducing linear Diophantine fuzzy (LDF) optimality constraints. The weights of distinct routes are calculated using an improved score function (SF) with the arc values represented by LDFNs. The conventional Dijkstra method is further modified to find the arc weights of the linear Diophantine fuzzy shortest path (LDFSP) and coterminal LDFSP based on these enhanced score functions and optimality requirements. A comparative analysis was carried out with the current approaches demonstrating the benefits of the new algorithm. Finally, to validate the possible use of the proposed technique, a small-sized telecommunication network is presented. [ABSTRACT FROM AUTHOR]

Published

2021

21. Shortest Path Solution of Trapezoidal Fuzzy Neutrosophic Graph Based on Circle-Breaking Algorithm.

Author

Yang, Lehua, Li, Dongmei, and Tan, Ruipu

Subjects

*ALGORITHMS, *FUZZY graphs, *FUZZY numbers

Abstract

The shortest path problem is a topic of increasing interest in various scientific fields. The damage to roads and bridges caused by disasters makes traffic routes that can be accurately expressed become indeterminate. A neutrosophic set is a collection of the truth membership, indeterminacy membership, and falsity membership of the constituent elements. It has a symmetric form and indeterminacy membership is their axis of symmetry. In uncertain environments, the neutrosophic number can more effectively express the edge distance. The objectives in this study are to solve the shortest path problem of the neutrosophic graph with an edge distance expressed using trapezoidal fuzzy neutrosophic numbers (TrFNN) and resolve the edge distance according to the score and exact functions based on the TrFNN. Accordingly, the use of a circle-breaking algorithm is proposed to solve the shortest path problem and estimate the shortest distance. The feasibility of this method is verified based on two examples, and the rationality and effectiveness of the approach are evaluated by comparing it with the Dijkstra and Bellman algorithms. [ABSTRACT FROM AUTHOR]

Published

2020

22. Computing a fuzzy shortest path in a network with mixed fuzzy arc lengths using α-cuts

Author

Bahram Sadeghpour-Gildeh, Nezam Mahdavi-Amiri, Ali Tajdin, and Iraj Mahdavi

Subjects

Mathematical optimization, Shortest path, Fuzzy numbers, Dynamic programming, Defuzzification, Average path length, Fuzzy logic, Distance function, Regression, Computational Mathematics, Computational Theory and Mathematics, Modeling and Simulation, α-cut, Shortest path problem, Linear least squares, Fuzzy number, Fuzzy set operations, Yen's algorithm, Constrained Shortest Path First, Mathematics

Abstract

We are concerned with the design of a model and an algorithm for computing a shortest path in a network having various types of fuzzy arc lengths. First, we develop a new technique for the addition of various fuzzy numbers in a path using α-cuts by proposing a linear least squares model to obtain membership functions for the considered additions. Then, using a recently proposed distance function for comparison of fuzzy numbers, we present a dynamic programming method for finding a shortest path in the network. Examples are worked out to illustrate the applicability of the proposed model.