论文信息 - Linear prediction, filtering, and smoothing: An information-theoretic approach

Linear prediction, filtering, and smoothing: An information-theoretic approach

Abstract Information-theoretic concepts are used to derive some fundamental principles for the general estimation problem. With these basic principles, a minimal-error entropy estimator for linear systems disturbed by Gaussian random processes is easily derived, which is identical to the Kalman filter. Under non-Gaussian disturbances it is shown that the Kalman filter is a minimax-error-entropy linear estimator.

Paul Kalata | Roland Priemer | P. Kalata | R. Priemer

[1] R. Gallager. Information Theory and Reliable Communication , 1968 .

[2] Nelson M. Blachman,et al. The convolution inequality for entropy powers , 1965, IEEE Trans. Inf. Theory.

[3] A. J. Stam. Some Inequalities Satisfied by the Quantities of Information of Fisher and Shannon , 1959, Inf. Control..

[4] J. Rissanen,et al. Minmax Entropy Estimation of Models for Vector Processes , 1976 .

[5] Roland Priemer,et al. On minimal error entropy stochastic approximation , 1974 .

[6] C. E. SHANNON,et al. A mathematical theory of communication , 1948, MOCO.

[7] D. A. Bell,et al. Information Theory and Reliable Communication , 1969 .

[8] James S. Meditch,et al. Stochastic Optimal Linear Estimation and Control , 1969 .

[9] Henry L. Weidemann. Entropy Analysis of Feedback Control Systems1 1The research for this paper was supported in part by funds from the United States Air Force Office of Scientific Research under AFOSR Grant 699-67. , 1969 .

[10] Roland Priemer,et al. ON SYSTEM IDENTIFICATION WITH AND WITHOUT CERTAINTY , 1978 .

[11] Seymour Sherman,et al. Non-mean-square error criteria , 1958, IRE Trans. Inf. Theory.

[12] P. R. Kalata,et al. When should smoothing cease , 1974 .