Title :
Pursley´s aperiodic cross-correlation functions revisited
Author :
Kohda, Tohru ; Fujisaki, Hiroshi
Author_Institution :
Dept. of Comput. Sci. & Commun. Eng., Kyushu Univ., Fukuoka, Japan
fDate :
6/1/2003 12:00:00 AM
Abstract :
Pursley´s aperiodic cross-correlation function of one delay parameter, which plays an important role in the quasi-synchronous state, is revisited. Using sequences up-sampled by a factor of M, we generalize this function to the one with two discrete delay parameters which play an important role in asynchronous state. Furthermore, Markov spreading sequences are shown to be simply generated by a two-state Markov chain. Applying the central limit theorems, in particular, the Fortet-Kac theorem to the aperiodic cross-correlation function of spreading sequences with Markovity, we can get theoretical estimate of the variance of multiple-access interference.
Keywords :
Markov processes; code division multiple access; correlation theory; delays; radiofrequency interference; sequences; spread spectrum communication; DS/CDMA system; Fortet-Kac theorem; aperiodic cross-correlation function; asynchronous state; average interference parameter; central limit theorem; delay parameter; direct-sequence spread spectrum communication; multiple-access interference; quasi-synchronous state; spreading sequence; two-state Markov chain; up-sampled sequence; Application software; Baseband; Circuits and systems; Delay effects; Estimation theory; Machine assisted indexing; Multiaccess communication; Multiple access interference; Random variables; Spread spectrum communication;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
DOI :
10.1109/TCSI.2003.812605
