Locally Differentially Private Multi-Sensor Fusion Estimation With System Intrinsic Randomness

Abstract

This paper focuses on the privacy-preserving multi-sensor fusion estimation (MSFE) problem with differential privacy considerations. Most existing research efforts are directed towards the exploration of traditional differential privacy, also referred to as centralized differential privacy (CDP). It is important to note that CDP is tailored to protect the privacy of statistical data at fusion center such as averages and sums rather than individual data at sensors, which renders it inappropriate for MSFE. Additionally, the definitions and assumptions of CDP are primarily applicable for large-scale systems that require statistical results mentioned above. Therefore, to address these limitations, this paper introduces a more recent advancement known as local differential privacy (LDP) to enhance the privacy of MSFE. We provide some rigorous definitions about LDP based on the intrinsic properties of MSFE rather than directly presenting the assumptions under CDP. Subsequently, the LDP is proved to be realized with system intrinsic randomness, which is useful and has never been considered before. Furthermore, the Gaussian mechanism is designed when the intrinsic randomness is insufficient. The lower bound of the covariance for extra injected Gaussian noises is determined by integrating system information with privacy budgets. Moreover, the optimal fusion estimators under intrinsic and extra disturbances are respectively designed in the linear minimum variance sense. Finally, the effectiveness of the proposed methods is verified through numerical simulations, encompassing both one-dimensional and high-dimensional scenarios.