Mathematical Properties of the JPEG2000 Wavelet Filters

The LeGall 5⁄3 and Daubechies 9⁄7 filters have risen to special prominence because they were selected for inclusion in the JPEG2000 standard. Here, we determine their key mathematical features: Riesz bounds, order of approximation, and regularity (Hölder and Sobolev). We give approximation theoretic quantities such as the asymptotic constant for the $L ^{ 2 }$ error and the angle between the analysis and synthesis spaces which characterizes the loss of performance with respect to an orthogonal projection. We also derive new asymptotic error formulæ that exhibit bound constants that are proportional to the magnitude of the first nonvanishing moment of the wavelet. The Daubechies 9⁄7 stands out because it is very close to orthonormal, but this turns out to be slightly detrimental to its asymptotic performance when compared to other wavelets with four vanishing moments.

Mathematical Properties of the JPEG2000 Wavelet Filters

The Sparsity of Cycle Spinning for Wavelet-Based Solutions of Linear Inverse Problems

Safety in Numbers: Asymptotic Analysis of a Monitoring Problem

JPEG XS-A New Standard for Visually Lossless Low-Latency Lightweight Image Coding

The Sparsity of Cycle Spinning for Wavelet-Based Solutions of Linear Inverse Problems

Safety in Numbers: Asymptotic Analysis of a Monitoring Problem

JPEG XS-A New Standard for Visually Lossless Low-Latency Lightweight Image Coding