Circulant decomposition: Cyclic, quasi-cyclic and LDPC codes

This paper shows that a cyclic code can be put into quasi-cyclic form by decomposing a circular parity-check matrix through column and row permutations. Such a decomposition of a circular parity-check matrix of a cyclic code produces a group of shorter cyclic or quasi-cyclic codes and leads to a new method for constructing long cyclic codes from short cyclic codes. Also in this paper, new classes of cyclic and quasi-cyclic LDPC codes are derived from cyclic Euclidean geometry LDPC codes by decomposing their circular parity-check matrices. These new LDPC codes perform well and enlarge the repertoire of cyclic and quasi-cyclic LDPC codes.