A Generalized Reverse Jacket Transform

Arbitrary-Length Walsh-Jacket Transforms

Due to the efficiency in implementation, the Walsh (Hadamard) transform plays an important role in signal analysis and communication. Recently, Lee generalized the Walsh transform into the Jacket transform. Since the entries of the Jacket transform can be ±2, it is more flexible than the Walsh transform. Both the Walsh transform and the Jacket transform are defined for the case where the length...

Optimal Bipolar Sequences for the Complex Reverse-Jacket Transform

A class of bipolar sequences is identified which has optimally flat spectrum using the Complex Reverse Jacket Transform (CRJT). This class is found to correspond exactly to the family of Bent bipolar sequences using the Walsh-Hadamard Transform. In total there are 576 such transforms for which this class has optimal spectrum of which the CRJT is one. The spectral properties of odd-power-of-two ...

Jacket matrices constructed from Hadamard matrices and generalized Hadamard matrices

An explicit construction of fast cocyclic jacket transform on the finite field with any size

An orthogonal cocyclic framework of the block-wise inverse Jacket transform (BIJT) is proposed over the finite field. Instead of the conventional block-wise inverse Jacket matrix (BIJM), we investigate the cocyclic block-wise inverse Jacket matrix (CBIJM), where the high-order CBIJM can be factorized into the low-order sparse CBIJMs with a successive block architecture. It has a recursive fashi...

Fast circulant block Jacket transform based on the Pauli matrices

Owing to its orthogonality, simplicity of the inversion and fast algorithms, Jacket transform generalising from the Hadamard transform has played important roles in signal and image processing, mobile communication for coding design, cryptography, etc. In this paper, inspired by the emerging block Jacket transform, a new class of circulant block Jacket matrices (CBJMs) are mathematically define...