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Decentralized Federated Learning using Game Theory in Dynamic Networks: The pFedGame Algorithm


Основні поняття
pFedGame, a novel decentralized federated learning algorithm, leverages game theory to achieve efficient model aggregation in dynamic network environments, addressing challenges like data heterogeneity and the absence of a central server.
Анотація

Bibliographic Information:

Behera, M. R., & Chakraborty, S. (2024). pFedGame - Decentralized Federated Learning using Game Theory in Dynamic Topology. 2024 IEEE International Conference on Computer Communication and Networks (COMSNETS). https://doi.org/10.1109/COMSNETS59351.2024.10427470

Research Objective:

This paper introduces pFedGame, a novel decentralized federated learning algorithm designed to address the limitations of centralized approaches, particularly in dynamic network topologies. The research aims to demonstrate the effectiveness of game theory in achieving optimal model aggregation without relying on a central server.

Methodology:

The researchers propose a two-step approach: peer selection and pFedGame aggregation. Peer selection, inspired by the PENS algorithm, identifies suitable peers for collaboration based on model accuracy on local data. Subsequently, pFedGame, a two-player constant-sum cooperative game, determines optimal aggregation weights for participating models, considering data heterogeneity and dynamic network conditions.

Key Findings:

Experimental results on Fashion-MNIST, CIFAR-10, and CIFAR-100 datasets demonstrate that pFedGame achieves comparable accuracy to state-of-the-art methods, particularly in scenarios with extreme and severe data heterogeneity. Notably, pFedGame exhibits adaptability to dynamic network changes due to its peer selection and game-theoretic aggregation strategy.

Main Conclusions:

pFedGame offers a promising solution for decentralized federated learning in dynamic networks, effectively addressing challenges posed by data heterogeneity and the absence of a central server. The game-theoretic approach enables efficient model aggregation by considering individual model contributions and network dynamics.

Significance:

This research contributes to the growing field of decentralized federated learning by introducing a novel algorithm that leverages game theory for robust and adaptive model aggregation. The findings have implications for various applications, including Internet of Things, connected vehicles, and other dynamic network environments where centralized approaches are impractical.

Limitations and Future Research:

While pFedGame demonstrates strong performance in heterogeneous data settings, it shows limitations in homogeneous data distributions. Future research could explore extending the game-theoretic approach to peer selection and adapt the algorithm for diverse machine learning models beyond those tested in this study. Further investigation into optimizing pFedGame's performance in various dynamic network conditions is also warranted.

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Статистика
pFedGame achieves accuracy higher than 70% for heterogeneous data. The experiments were conducted on Fashion-MNIST, CIFAR-10, and CIFAR-100 datasets. The study simulated different levels of data heterogeneity: 'Extreme', 'Severe', and 'Homogeneous'. The values of 'r' (game rounds) and 'δ' (change in weight) were set to 10 and 0.1, respectively.
Цитати

Ключові висновки, отримані з

by Monik Raj Be... о arxiv.org 10-08-2024

https://arxiv.org/pdf/2410.04058.pdf
pFedGame -- Decentralized Federated Learning using Game Theory in Dynamic Topology

Глибші Запити

How could pFedGame be adapted to handle more complex network topologies, such as those with varying bandwidth or latency?

Adapting pFedGame to handle more complex network topologies with varying bandwidth or latency would require incorporating these network dynamics into the peer selection and aggregation processes. Here's a breakdown of potential adaptations: 1. Enhanced Peer Selection: Bandwidth-Aware Selection: Instead of solely relying on data similarity, incorporate bandwidth information into the peer selection process. Prioritize peers with higher bandwidth connections to ensure faster model exchange and reduce communication overhead. This could involve: Estimating Bandwidth: Employ bandwidth estimation techniques to dynamically assess the available bandwidth between nodes. Weighting Function: Modify the peer selection algorithm (Algorithm 1) to include a bandwidth weighting factor, favoring high-bandwidth peers. Latency-Aware Selection: Minimize the impact of latency by: Measuring Latency: Periodically measure round-trip latency between nodes. Proximity Prioritization: Prioritize geographically closer peers or those within the same network segment to reduce communication latency. Asynchronous Aggregation: Explore asynchronous communication protocols where nodes don't have to wait for slower peers, allowing faster nodes to progress quicker. 2. Adaptive Aggregation: Dynamic Round Timeouts: Instead of fixed game rounds (parameter 'r' in Algorithm 2), implement dynamic timeouts for each round based on the expected latency of participating peers. This ensures that slower peers are not left behind. Contribution Weighting: Adjust the contribution weights (ψ(.) in Algorithm 2) of peers based on their network conditions. Peers with poor connectivity or high latency could have their contributions down-weighted to prevent staleness or delays. 3. Hybrid Approaches: Clustering: Group nodes with similar network characteristics into clusters. Perform pFedGame within clusters to leverage the benefits of low latency and high bandwidth, and then aggregate cluster models using a hierarchical approach. Challenges: Accurate Network Monitoring: Implementing these adaptations necessitates accurate and real-time network monitoring to obtain reliable bandwidth and latency information. Overhead vs. Accuracy: Finding the right balance between incorporating network dynamics and maintaining model accuracy is crucial. Overly aggressive optimization for network conditions might negatively impact the final model's performance.

While pFedGame addresses data heterogeneity, could its reliance on local model accuracy for peer selection make it vulnerable to malicious actors providing inaccurate models?

Yes, pFedGame's reliance on local model accuracy for peer selection could make it vulnerable to malicious actors providing inaccurate models, potentially leading to model poisoning attacks. Here's how it could happen: Infiltration: Malicious actors could join the network and intentionally train their models to perform poorly on the target node's data. Misleading Accuracy: Since pFedGame uses local model accuracy on a target node's data as a selection criterion, these malicious models, despite being inaccurate overall, might appear to perform well on the target's data, misleading the peer selection process. Aggregation Poisoning: Once selected as peers, these malicious models can inject poisoned updates during the aggregation phase, degrading the global model's performance or introducing backdoors. Mitigation Strategies: Robust Peer Selection: Reputation Systems: Implement a reputation system where nodes track the historical behavior and accuracy of their peers. Nodes with consistently poor performance or suspicious behavior can be penalized or excluded from peer selection. Diversity Promotion: Encourage diversity in peer selection by not solely relying on accuracy. Consider factors like model architecture, training data distribution, or geographic location to reduce the impact of a single malicious actor. Byzantine-Tolerant Aggregation: Outlier Detection: Employ robust aggregation methods that can detect and mitigate the influence of outlier model updates, potentially originating from malicious actors. Threshold-Based Aggregation: Set thresholds on the acceptable deviation of model updates. Discard or down-weight updates that exceed these thresholds. Trade-offs: Security vs. Efficiency: Implementing robust security measures often comes with computational and communication overheads. Finding a balance between security and efficiency is crucial for practical deployment.

Can the principles of game theory used in pFedGame be applied to other distributed computing challenges beyond federated learning?

Absolutely! The principles of game theory, particularly the concept of finding equilibrium states in multi-agent systems, have broad applicability beyond federated learning and can be valuable in addressing various distributed computing challenges. Here are some examples: 1. Resource Allocation and Scheduling: Competing Agents: In cloud computing environments or edge networks, multiple applications or users compete for limited resources like CPU, memory, or bandwidth. Game theory can model these interactions, where each agent (application or user) aims to maximize its own utility (performance, cost savings) while considering the actions of others. Equilibrium Solutions: Game-theoretic algorithms can help find equilibrium resource allocation strategies that are fair, efficient, and prevent resource starvation. 2. Distributed Consensus and Agreement: Byzantine Fault Tolerance: In distributed systems, reaching consensus in the presence of faulty or malicious nodes is crucial. Game theory can model the incentives of both honest and malicious nodes, leading to the development of Byzantine fault-tolerant algorithms that are resilient to a certain number of malicious actors. 3. Security and Trust Management: Intrusion Detection: Game theory can be used to model the interactions between attackers and defenders in a network. This can aid in developing intrusion detection systems that anticipate attacker strategies and optimize defense mechanisms. Trust Establishment: In decentralized networks, establishing trust between unknown entities is challenging. Game-theoretic models can facilitate the design of trust management systems where nodes build trust relationships based on their interactions and reputation. 4. Network Routing and Optimization: Traffic Routing: Game theory can optimize traffic routing in communication networks by modeling the behavior of individual packets or flows as rational agents seeking the shortest or least congested paths. Congestion Control: Game-theoretic approaches can design congestion control mechanisms that incentivize users to share network resources fairly and prevent network congestion. 5. Distributed Optimization: Parameter Tuning: Many distributed systems require optimizing parameters across a network of nodes. Game theory can help design distributed optimization algorithms that converge to optimal or near-optimal solutions while considering the actions and constraints of individual nodes. Key Advantages of Game Theory: Strategic Interactions: Game theory excels at modeling scenarios involving multiple decision-makers with potentially conflicting goals. Equilibrium Analysis: It provides tools to analyze the stability and fairness of solutions, ensuring that no participant has an incentive to deviate from the agreed-upon strategy. By adapting the principles of game theory to specific distributed computing problems, we can design more robust, efficient, and secure systems.
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