Title :
Construction of Even Length Binary Sequences With Asymptotic Merit Factor 6
Author :
Xiong, Tingyao ; Hall, Jonathan I.
Author_Institution :
Michigan State Univ., East Lansing
Abstract :
Starting with the family of Legendre sequences of length p, Parker constructed a new family of binary sequences of length 2p with good negacyclic correlation properties. Computer calculations indicated that the asymptotic merit factor of his family is 6. In this correspondence a simple version of Parker´s construction is given and further applied to Jacobi and modified Jacobi sequences. It is then proven that each of the families constructed, including Parker´s, has asymptotic merit factor 6.
Keywords :
binary sequences; Jacobi sequences; Legendre sequences; asymptotic merit factor 6; even length binary sequences; negacyclic correlation properties; Autocorrelation; Binary sequences; Jacobian matrices; Mathematics; Aperiodic correlation; Jacobi sequence; Legendre sequence; merit factor;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2007.913421
