Feng Zhang scite author profile

Due to the severe multipath effect, no satisfactory device-free methods have ever been found for indoor speed estimation problem, especially in non-line-of-sight scenarios, where the direct path between the source and observer is blocked. In this paper, we present WiSpeed, a universal low-complexity indoor speed estimation system leveraging radio signals, such as commercial WiFi, LTE, 5G, etc., which can work in both device-free and devicebased situations. By exploiting the statistical theory of electromagnetic waves, we establish a link between the autocorrelation function of the physical layer channel state information and the speed of a moving object, which lays the foundation of WiSpeed. WiSpeed differs from the other schemes requiring strong line-of-sight conditions between the source and observer in that it embraces the rich-scattering environment typical for indoors to facilitate highly accurate speed estimation. Moreover, as a calibration-free system, WiSpeed saves the users' efforts from large-scale training and fine-tuning of system parameters. In addition, WiSpeed could extract the stride length as well as detect abnormal activities such as falling down, a major threat to seniors that leads to a large number of fatalities every year. Extensive experiments show that WiSpeed achieves a mean absolute percentage error of 4.85% for device-free human walking speed estimation and 4.62% for device-based speed estimation, and a detection rate of 95% without false alarms for fall detection.

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ϵ-Nash mean-field games for general linear-quadratic systems with applications

Zhang

2020

Automatica

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Randomized nonuniform sampling and reconstruction in fractional Fourier domain

Zhang

Tao

2016

Signal Processing

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Maximum Principle for Stochastic Recursive Optimal Control Problems Involving Impulse Controls

Zhang

2012

Abstract and Applied Analysis

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We consider a stochastic recursive optimal control problem in which the control variable has two components: the regular control and the impulse control. The control variable does not enter the diffusion coefficient, and the domain of the regular controls is not necessarily convex. We establish necessary optimality conditions, of the Pontryagin maximum principle type, for this stochastic optimal control problem. Sufficient optimality conditions are also given. The optimal control is obtained for an example of linear quadratic optimization problem to illustrate the applications of the theoretical results.

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Feng Zhang

Stochastic Maximum Principle for Optimal Control Problems of Forward-Backward Systems Involving Impulse Controls

WiSpeed: A Statistical Electromagnetic Approach for Device-Free Indoor Speed Estimation

ϵ-Nash mean-field games for general linear-quadratic systems with applications

Randomized nonuniform sampling and reconstruction in fractional Fourier domain

Maximum Principle for Stochastic Recursive Optimal Control Problems Involving Impulse Controls

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