Complex-Valued Wavelet Lifting and Applications |
| |
| Authors: | Jean Hamilton Matthew A. Nunes Marina I. Knight Piotr Fryzlewicz |
| |
| Affiliation: | 1. HEDS, ScHARR, University of Sheffield, Sheffield, United Kingdom;2. Department of Mathematics and Statistics, Lancaster University, Lancaster, United Kingdom;3. Department of Mathematics, University of York, York, United Kingdom;4. Department of Statistics, London School of Economics, London, United Kingdom |
| |
| Abstract: | Signals with irregular sampling structures arise naturally in many fields. In applications such as spectral decomposition and nonparametric regression, classical methods often assume a regular sampling pattern, thus cannot be applied without prior data processing. This work proposes new complex-valued analysis techniques based on the wavelet lifting scheme that removes “one coefficient at a time.” Our proposed lifting transform can be applied directly to irregularly sampled data and is able to adapt to the signal(s)’ characteristics. As our new lifting scheme produces complex-valued wavelet coefficients, it provides an alternative to the Fourier transform for irregular designs, allowing phase or directional information to be represented. We discuss applications in bivariate time series analysis, where the complex-valued lifting construction allows for coherence and phase quantification. We also demonstrate the potential of this flexible methodology over real-valued analysis in the nonparametric regression context. Supplementary materials for this article are available online. |
| |
| Keywords: | (Bivariate) time series Coherence and phase Lifting scheme Nondecimated transform Nonparametric regression Wavelets |
|
|
