On Hilbert, Fourier, and wavelet transforms

We present the windowed Fourier transform and wavelet transform as tools for analyzing persistent signals, such as bounded power signals and almost periodic functions. We establish the analogous Parseval-type identities. We consider discretized versions of these transforms and construct generalized

## Abstract Time‐frequency and time‐scale transforms are one of the powerful mathematical methods for feature extraction of non‐stationary signals such as partial discharge (PD) signals. Modified Fourier‐based transforms and Wavelet transforms are well known among them. PD signals can be analyzed b

In this paper, a Hilbert transform algorithm is developed based on an analysing wavelet. It has a nice feature that one level of combination wavelet forms an orthogonal filter. As a result, a perfect orthogonality and constant passband are obtained. Meanwhile it solves the problem of selectivity for

This article presents potential sensor data representation schemes for force and vibration signals in the context of flank wear estimation in turning processes. In particular, the performances of methods based on fast Fourier transforms (FFTs) and fast wavelet transforms (FWTs) are compared using da

## Continuous wavelet transforms associated with the spherical Radon transform For the operator R and for its inverse R 01 explicit representations are given in the wavelet form. As a consequence we obtain the characterization of the range of R.