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Matrix Domination: Genetic Algorithm Metaheuristic with Wisdom of Crowds


Conceptos Básicos
Genetic algorithm enriched with the wisdom of crowds optimizes matrix domination efficiently.
Resumen

I. Introduction

  • Matrix Domination: NP-Complete problem in graph theory.
  • Goal: Place dominators in a matrix for complete domination.
  • Practical applications: Network design, logistics, surveillance.

II. Prior Work

  • TMDP complexity: NP-Complete, computationally demanding.
  • TMDP vs. permutation matrices.
  • Problem statement and constraints.

III. Proposed Approach

  • Hybrid model: Genetic algorithm with wisdom of crowds.
  • Genetic algorithm principles and processes.
  • Wisdom of crowds concept and integration.

IV. Experimental Results

  • Genetic algorithm with wisdom of crowds shows efficiency.
  • Impact of parameter settings on performance.

V. Data

  • Randomly generated matrices used for program initiation.
  • Hard-coded matrices could be implemented for comparison.

VI. Results

  • Visualization with matplotlib for algorithm performance.
  • Genetic algorithm with wisdom of crowds outperforms other methods.

VII. Conclusions

  • Genetic algorithm with wisdom of crowds offers efficient solutions.
  • Potential for application in related NP-Complete problems.

VIII. References

  • Various references on graph theory, domination, genetic algorithms, and metaheuristics.
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Estadísticas
"Matrix Domination is an NP-Complete problem introduced more than forty years ago." "NP-Complete problems are fundamental to computational complexity." "The Cook-Levin Theorem demonstrated an NP-Complete problem." "Total domination in graph theory is a variation of the domination concept." "NP-Complete problems are generally quite simple to state."
Citas
"The genetic algorithm enriched with the wisdom of crowds metaheuristic was able to grow and perform much more optimally than other methods." "Results demonstrate the potential of this convergence using a genetic algorithm approach enriched with the wisdom of crowds."

Ideas clave extraídas de

by Shane Storm ... a las arxiv.org 03-28-2024

https://arxiv.org/pdf/2403.17939.pdf
Matrix Domination

Consultas más profundas

How can the integration of the wisdom of crowds enhance other computational problems?

The integration of the wisdom of crowds can enhance other computational problems by leveraging the collective intelligence and diverse perspectives of a group of individuals. In computational problems where there are multiple possible solutions or paths to explore, incorporating the wisdom of crowds can lead to more robust decision-making and potentially better outcomes. By aggregating the opinions and insights of a diverse group, the approach can help in identifying patterns, outliers, and innovative solutions that may not be apparent to individual experts or algorithms alone. In the context of optimization problems, such as genetic algorithms, the wisdom of crowds can provide valuable input during the selection and mutation phases. By considering the collective judgment of multiple individuals, the algorithm can explore a wider range of solutions and potentially avoid converging prematurely on suboptimal outcomes. This collective decision-making process can lead to more efficient and effective solutions, especially in complex problem spaces where traditional algorithms may struggle to find the best possible answer.

What are the limitations of relying on genetic algorithms for complex problem-solving?

While genetic algorithms are powerful tools for optimization and search problems, they also have limitations when applied to complex problem-solving scenarios. Some of the key limitations include: Stochastic Nature: Genetic algorithms are inherently stochastic, meaning that they do not always produce the same results even with the same parameters. This randomness can lead to variability in outcomes and may not always guarantee the most optimal solution. Computational Complexity: As the problem space grows larger or more complex, genetic algorithms can become computationally intensive and time-consuming. The search for optimal solutions in high-dimensional spaces can require significant computational resources. Local Optima: Genetic algorithms are susceptible to getting trapped in local optima, where they converge on suboptimal solutions instead of the global optimum. This can limit their effectiveness in finding the best possible solution in complex landscapes. Parameter Tuning: Genetic algorithms often require careful parameter tuning to achieve optimal performance. Selecting appropriate parameters such as mutation rates, crossover probabilities, and population sizes can be challenging and may impact the algorithm's efficiency. Limited Problem Representation: Genetic algorithms rely on a fixed representation of solutions, which may not always capture the complexity of real-world problems. In some cases, the encoding of solutions may not fully capture the nuances of the problem space, leading to suboptimal results.

How can the concept of total domination in graph theory be applied to real-world scenarios beyond network design?

The concept of total domination in graph theory, where every vertex must be dominated by another vertex, has applications beyond network design in various real-world scenarios. Some ways in which this concept can be applied include: Surveillance Systems: In surveillance systems, total domination can ensure that every area or point of interest is monitored or covered by a surveillance camera. This concept can help in enhancing security measures and ensuring comprehensive surveillance coverage. Resource Allocation: Total domination can be applied in resource allocation scenarios where every critical resource or asset must be monitored or managed effectively. By ensuring that every resource is accounted for and managed appropriately, organizations can optimize their resource allocation strategies. Supply Chain Management: In supply chain management, total domination can be used to ensure that every node in the supply chain network is monitored or controlled to prevent disruptions or inefficiencies. This concept can help in improving the resilience and efficiency of supply chain operations. Urban Planning: Total domination can be applied in urban planning to ensure that every key location or infrastructure element is adequately covered or monitored. This can help in optimizing urban development strategies and enhancing the overall functionality and safety of urban environments. By applying the concept of total domination in graph theory to real-world scenarios beyond network design, organizations and decision-makers can improve their decision-making processes, optimize resource utilization, and enhance overall system efficiency and resilience.
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