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An Easy-to-implement Coding Scheme for Multifrequency PPMIn implementing multifrequency PPM, a naturally arising question is: Let P be a fixed number; among all integer valued processes X1, X2, X3, with E ( X(n+1)-X(n) squared) less than or = P, which has the largest entropy? Earlier work by McEliece and Rodemich answered this question, but there is no obvious way to use this process to implement a code for multifrequency PPM. The present article describes an easy-to-implement process X1, X2, with E ( X(n+1)-X(n) squared) less than or = P, whose entropy is nearly as great as that of the McEliece-Rodemich process.
Document ID
19840017828
Acquisition Source
Legacy CDMS
Document Type
Other
Authors
Mceliece, R. J.
(Jet Propulsion Lab., California Inst. of Tech. Pasadena, CA, United States)
Swanson, L.
(Jet Propulsion Lab., California Inst. of Tech. Pasadena, CA, United States)
Date Acquired
August 12, 2013
Publication Date
March 15, 1984
Publication Information
Publication: The Telecommun. and Data Acquisition Rept.
Subject Category
Communications And Radar
Accession Number
84N25896
Distribution Limits
Public
Copyright
Work of the US Gov. Public Use Permitted.
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