Information rates of Wiener processes

Author

Berger, Toby

Volume

16

Issue

2

fYear

1970

fDate

3/1/1970 12:00:00 AM

Firstpage

134

Lastpage

139

Abstract

Rate distortion functions are calculated for time discrete and time continuous Wiener processes with respect to the mean squared error criterion. In the time discrete case, we find the interesting result that, for $0 \\leq D \\leq \\sigma ^2 /4$ , $R(D)$ for the Wiener process is identical to $R(D)$ for the sequence of zero mean independent normally distributed increments of variance sigma^2 whose partial sums form the Wiener process. In the time continuous case, we derive the explicit formula $R(D) = 2 \\sigma ^2 / ( \\pi^2 D)$ , where $\\sigma ^2$ is the variance of the increment daring a one-second interval. The resuiting $R(D)$ curves are compared with the performance of an optimum integrating delta modulation system. Finally, by incorporating a delta modulation scheme in the random coding argument, we prove a source coding theorem that guarantees our $R(D)$ curves are physically significant for information transmission purposes even though Wiener processes are nonstationary.

Keywords

Rate-distortion theory; Wiener processes; Delta modulation; Distortion measurement; Encoding; Extraterrestrial measurements; Information rates; Probability; Q measurement; Random variables; Rate-distortion; Source coding;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/TIT.1970.1054423

Filename

1054423