Evaluating the Minimum Spanning Trees Using Prim's Algorithm with Undirected Neutrosophic Graphs
Keywords:
Minimum Spanning Tree; Neutrosophic Graph; Neutrosophic Number; Prim’s Algorithm; Score FunctionAbstract
This research paper presents an innovative approach for determining the minimum
spanning tree (MST) in an undirected neutrosophic graph using Prim's Algorithm,
which is extensively used in addressing network optimization problems. We analyze
the effectiveness of Prim's method for constructing the minimum spanning trees in
undirected neutrosophic networks, where edge weights are denoted by neutrosophic
numbers. Neutrosophic numbers with components reflecting truth, uncertainty, and falsehood provide a more sophisticated method of expressing uncertainty in network
modeling. Here, we use a score function to contrast different NMSTs based on weights
calculated by adding neutrosophic numbers. This method is particularly beneficial for
use in transportation, communication networks, and logistics, where uncertain
properties frequently define network configurations. Numerical illustrations prove the
effectiveness of the proposed method, showing its efficiency in handling neutrosophic
graphs and keeping it computationally feasible. The results indicated that the
suggested Prim's algorithm efficiently produces the minimum spanning trees in
uncertain environments and is advantageous for network design and optimization in
these scenarios.
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Copyright (c) 2025 Neutrosophic Sets and Systems
This work is licensed under a Creative Commons Attribution 4.0 International License.
