Abstract
Time-scale transforms play a fundamental role in the compact representation of signals and images
[1]. Non linear time representation provided a significant contribution to the definition of
more flexible and adaptive transforms. However, in many applications signals are better characterized
in the frequency domain. In particular, frequency distribution in the frequency axis is
strictly dependent on the signal under study. On the contrary, frequency axis partition provided
by conventional transforms obeys more rigid rules. It would be then desirable to have a transform
able to adapt to the frequency content of the signal under study, i.e. having a changing
Q factor. The rational dilation wavelet transform [2, 3] (RDWT) is a flexible tool that allows to
change the dilation factor at each step of the transformaswell as the analyzingwindowfunction,
by maintaining the structure and properties of the classical wavelet transform, which is implemented
through perfect reconstruction filter banks. Some examples concerning the way of selecting
significant scales, i.e. central frequencies and bandwidths of the filter bank, in different
applications, including image denoising, deblurring and fusion, will be shown. The properties
of the corresponding adaptive transformwill be also discussed.
Anno
2016
Tipo pubblicazione
Altri Autori
V. Bruni, D. Vitulano