Nonlinear Consensus Protocol Modified from Doubly Stochastic Quadratic Operators in Networks of Dynamic Agents
Abstract
:1. Introduction
- To find the optimal decision of the group.
- To investigate simple mathematical nonlinear consensus protocol.
2. Background
3. Materials and Methods
- (i)
- The sum of all m matrices is a matrix with all entries as ones as follows:
- (ii)
- The sum of each row or column in each matrix is stochastic and the sum of all m matrices is a matrix with all entries as ones as follows:
- (iii)
- Triple stochastic matrix, where the sum of each row and column in each matrix is stochastic and the sum of all m matrices is a matrix with all entries as ones as follows:
4. Results
5. Numerical Solution
6. Comparison Study between the Nonlinear Model of MDSQO and DeGroot’s Linear Model
7. The Comparison of the Convergence of MDSQO with DSQO
8. Discussion and Critical Reflection of the Research
9. Conclusions
Author Contributions
Funding
Acknowledgments
Conflicts of Interest
Appendix A
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Abdulghafor, R.; Almotairi, S.; Almohamedh, H.; Turaev, S.; Almutairi, B. Nonlinear Consensus Protocol Modified from Doubly Stochastic Quadratic Operators in Networks of Dynamic Agents. Symmetry 2019, 11, 1519. https://doi.org/10.3390/sym11121519
Abdulghafor R, Almotairi S, Almohamedh H, Turaev S, Almutairi B. Nonlinear Consensus Protocol Modified from Doubly Stochastic Quadratic Operators in Networks of Dynamic Agents. Symmetry. 2019; 11(12):1519. https://doi.org/10.3390/sym11121519
Chicago/Turabian StyleAbdulghafor, Rawad, Sultan Almotairi, Hamad Almohamedh, Sherzod Turaev, and Badr Almutairi. 2019. "Nonlinear Consensus Protocol Modified from Doubly Stochastic Quadratic Operators in Networks of Dynamic Agents" Symmetry 11, no. 12: 1519. https://doi.org/10.3390/sym11121519
APA StyleAbdulghafor, R., Almotairi, S., Almohamedh, H., Turaev, S., & Almutairi, B. (2019). Nonlinear Consensus Protocol Modified from Doubly Stochastic Quadratic Operators in Networks of Dynamic Agents. Symmetry, 11(12), 1519. https://doi.org/10.3390/sym11121519