Complex Orthogonal Designs with Forbidden $2 \times 2$ Submatrices

TL;DR

This paper characterizes all first type complex orthogonal designs (CODs), constructs new examples with reduced decoding delay, and proves the uniqueness of maximal rate, minimal delay CODs.

Contribution

It determines all achievable parameters and structures of first type CODs, introduces new constructions with lower delay, and establishes the uniqueness of maximal rate designs.

Findings

All achievable parameters of first type CODs are identified.

New CODs with specific parameters demonstrate trade-offs between rate and delay.

Maximal rate, minimal delay CODs are unique up to equivalence.

Abstract

Complex orthogonal designs (CODs) are used to construct space-time block codes. COD $\mathcal{O}_z$ with parameter $[p, n, k]$ is a $p \times n$ matrix, where nonzero entries are filled by $\pm z_i$ or $\pm z^*_i$, $i = 1, 2,..., k$, such that $\mathcal{O}^H_z \mathcal{O}_z = (|z_1|^2+|z_2|^2+...+|z_k|^2)I_{n \times n}$. Define $\mathcal{O}_z$ a first type COD if and only if $\mathcal{O}_z$ does not contain submatrix {\pm z_j & 0; \ 0 & \pm z^*_j}$ or ${\pm z^*_j & 0; \ 0 & \pm z_j}$. It is already known that, all CODs with maximal rate, i.e., maximal $k/p$, are of the first type. In this paper, we determine all achievable parameters $[p, n, k]$ of first type COD, as well as all their possible structures. The existence of parameters is proved by explicit-form constructions. New CODs with parameters $[p,n,k]=[\binom{n}{w-1}+\binom{n}{w+1}, n, \binom{n}{w}], $ for $0 \le w \le n$, are constructed, which demonstrate the possibility of sacrificing code rate to reduce decoding delay. It's worth mentioning that all maximal rate, minimal delay CODs are contained in our constructions, and their uniqueness under equivalence operation is proved.