On the probability of error for communication in white Gaussian noise

Author

Wyner, Aaron D.

Volume

Issue

fYear

1967

fDate

1/1/1967 12:00:00 AM

Firstpage

Lastpage

Abstract

Lower bounds on the error probability are obtained for communication with average power $P$ and no bandwidth constraint in the presence of white Gaussian noise with spectral density $N$ . For rates $R$ less than the channel capacity $C = P/N$ , these bounds show that the error-exponent (reliability) $E(R)$ satisfies $E(R) \\leq \\Bigg\\{ \\begin{array}{ll} C/2 -R, & R \\leq C/4,\\\\ (\\sqrt {C}-\\sqrt {R})^{2}, & R \\geq C/4. \\end{array}$ Since this exponent can be achieved with orthogonal signals, the reliability is now known exactly. For rates exceeding the capacity, it is shown that the error probability approaches unity as the delay approaches infinity. This is a "strong converse" for this channel.

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/TIT.1967.1053961

Filename

1053961

Link To Document

https://search.isc.ac/dl/search/defaultta.aspx?DTC=49&DC=908571