Title :
Directional hypercomplex wavelets for multidimensional signal analysis and processing
Author :
Chan, Wai Lam ; Choi, Hyeokho ; Baraniuk, Richard G.
Author_Institution :
Dept. of Electr. & Comput. Eng., Rice Univ., Houston, TX, USA
Abstract :
We extend the wavelet transform to handle multidimensional signals that are smooth save for singularities along lower-dimensional manifolds. We first generalize the complex wavelet transform to higher dimensions using a multidimensional Hilbert transform. Then, using the resulting hypercomplex wavelet transform (HWT) as a building block, we construct new classes of nearly shift-invariant wavelet frames that are oriented along lower-dimensional subspaces. The HWT can be computed efficiently using a 1D dual-tree complex wavelet transform along each signal axis. We demonstrate how the HWT can be used for fast line detection in 3D.
Keywords :
Hilbert transforms; discrete wavelet transforms; multidimensional signal processing; piecewise constant techniques; signal representation; trees (mathematics); 1D dual-tree complex wavelet transform; 3D fast line detection; DWT; HWT; directional hypercomplex wavelet transforms; discrete wavelet transform; lower-dimensional manifold singularities; multidimensional Hilbert transform; multidimensional piecewise smooth signals; multidimensional signal analysis; multidimensional signal processing; multiscale signal representations; shift-invariant wavelet frames; Continuous wavelet transforms; Discrete wavelet transforms; Multidimensional signal processing; Multidimensional systems; Signal analysis; Signal processing; Tensile stress; Wavelet analysis; Wavelet coefficients; Wavelet transforms;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 2004. Proceedings. (ICASSP '04). IEEE International Conference on
Print_ISBN :
0-7803-8484-9
DOI :
10.1109/ICASSP.2004.1326715
