Fusion of Quantized and Unquantized Sensor Data for Estimation

This letter investigates the usefulness of quantized data for estimation problems in which unquantized data is already available. A worst case scenario is considered in which a fusion center has access to continuous and binary-valued measurements of the same uniformly distributed parameter observed in Gaussian noise. The difference in mean squared error between a minimum mean squared error estimate using unquantized data and a minimum mean squared error estimate using both quantized and unquantized data is used to quantify the value of fusing the two kinds of data. Discussion of the Cramér-Rao Bound predicts how noise in the quantized data affects the reduction in estimate mean squared error from fusing the data types. It is then determined that the maximum reduction in estimate mean squared error from fusion can be approximated as a rational function of the ratio of the standard deviations of the measurement noise in the two data types. Finally, similarities between the approximation to the reduction in estimate mean squared error for the most favorable uniform prior width and a closed form expression based on the Cramér-Rao Bound are discussed.

[1]  Alfred O. Hero,et al.  Distributed maximum likelihood estimation for sensor networks , 2004, 2004 IEEE International Conference on Acoustics, Speech, and Signal Processing.

[2]  Pramod K. Varshney,et al.  Energy Aware Iterative Source Localization for Wireless Sensor Networks , 2010, IEEE Transactions on Signal Processing.

[3]  Douglas L. Jones,et al.  Decentralized Detection With Censoring Sensors , 2008, IEEE Transactions on Signal Processing.

[4]  Pramod K. Varshney,et al.  Distributed detection with multiple sensors I. Fundamentals , 1997, Proc. IEEE.

[5]  C. J. Harris,et al.  Comparison of two measurement fusion methods for Kalman-filter-based multisensor data fusion , 2001 .

[6]  Brian M. Sadler,et al.  Fundamentals of energy-constrained sensor network systems , 2005, IEEE Aerospace and Electronic Systems Magazine.

[7]  Y. Bar-Shalom,et al.  Censoring sensors: a low-communication-rate scheme for distributed detection , 1996, IEEE Transactions on Aerospace and Electronic Systems.

[8]  James Llinas,et al.  An introduction to multi-sensor data fusion , 1998, ISCAS '98. Proceedings of the 1998 IEEE International Symposium on Circuits and Systems (Cat. No.98CH36187).

[9]  Alejandro Ribeiro,et al.  Bandwidth-constrained distributed estimation for wireless sensor Networks-part I: Gaussian case , 2006, IEEE Transactions on Signal Processing.

[10]  S. Marano,et al.  Measurement fusion for target tracking under bandwidth constraints , 2001, 2001 IEEE Aerospace Conference Proceedings (Cat. No.01TH8542).

[11]  P.K. Varshney,et al.  Target Location Estimation in Sensor Networks With Quantized Data , 2006, IEEE Transactions on Signal Processing.