Centrala begrepp
Formulating non-convex potential games for sensor network localization to identify global solutions efficiently.
Sammanfattning
The content discusses the challenges of non-convexity in sensor network localization problems and proposes a novel approach using potential games. It introduces a dual complementary problem, a conjugation-based algorithm, and explores the identification condition of global Nash equilibrium. The effectiveness is validated through numerical experiments.
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Introduction
- Sensor networks' significance in various applications.
- Importance of accurate sensor node localization.
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Problem Formulation
- Defining the range-based SNL problem.
- Formulating it as a potential game for N-player SNL.
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Derivation of Global Nash Equilibrium
- Exploring identification conditions using canonical duality theory.
- Designing a conjugation-based algorithm for computation.
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Numerical Experiments
- Validating the approach with UJI-IndoorLoc dataset.
- Demonstrating effectiveness with different node configurations.
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Conclusion
- Summary of key findings and future research directions.
Statistik
"N = 10, 20, 35, 50"
"Tolerance t_tol = 10^-5"
Citat
"The individual objective of each non-anchor node is to ensure its position accuracy."
"Potential game framework aligns individual profit with global network's objective."