Near-Optimal Partial Hadamard Codebook Construction Using Binary Sequences Obtained From Quadratic Residue Mapping.

In this paper, a new class of (N,K) near-optimal partial Hadamard codebooks is proposed. The construction of the proposed codebooks from Hadamard matrices is based on binary row selection sequences, which are generated by quadratic residue mapping of p -ary m -sequences. The proposed codebooks have parameters and K=({p-1}/{2p})(N+\sqrt{N})+1 for an odd prime p$ and an even positive integer $n$ . We prove that the maximum magnitude of inner products between the code vectors of the proposed codebooks asymptotically achieves the Welch bound equality for sufficiently large $p$ and derive their inner product distribution. [ABSTRACT FROM PUBLISHER]