Bibliographic Information: Tian, Y., & Tu, J. (2024). The minimum number of maximal independent sets in graphs with given order and independence number. arXiv, 2410.17717v1.
Research Objective: The paper aims to determine the minimum number of maximal independent sets (MIS) in two specific graph classes: trees and unicyclic graphs, given their order and independence number.
Methodology: The authors employ mathematical induction and combinatorial arguments to establish lower bounds for the number of MIS in the considered graph classes. They analyze the structure of these graphs, particularly focusing on support vertices, leaves, and cycles, to derive recursive relationships for the MIS count.
Key Findings:
Main Conclusions: The study provides sharp lower bounds for the number of MIS in trees and unicyclic graphs with given order and independence number. The authors construct specific families of graphs demonstrating that these bounds are tight, meaning there exist graphs with exactly the minimum number of MIS as predicted by the derived formulas.
Significance: This research contributes to extremal graph theory, specifically to the branch studying the enumeration of graph invariants. Understanding the minimum and maximum values of such invariants, like the number of MIS, provides insights into the structure and properties of different graph classes.
Limitations and Future Research: The study focuses on trees and unicyclic graphs. Exploring similar questions for broader graph classes with specific properties (e.g., bipartite graphs, planar graphs) could be a potential direction for future research. Additionally, investigating the behavior of the MIS count under different graph operations or modifications could offer further insights.
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by Yuting Tian,... klokken arxiv.org 10-24-2024
https://arxiv.org/pdf/2410.17717.pdfDypere Spørsmål