Abstract-The discrete and continuous Fourier transforms are applicable to discrete and continuous time signals respectively. Time scales allows generalization to to any closed set of points on the real line. Discrete and continuous time are special cases. Using the Hilger exponential from time scale calculus, the discrete Fourier transform (DFT) is extended to signals on a set of points with arbitrary spacing. A time scale consisting of points in time is shown to impose a time scale (more appropriately dubbed a frequency scale), , in the Fourier domain The time scale DFT's (TS-DFT's) are shown to share familiar properties of the DFT, including the derivative theorem and the power theorem. Shifting on a time scale is accomplished t...
Signals that have undergone a non-homogeneous stretching or compression operation in time have recei...
The following four propositions are required for the proof of Theorem 1 given in II. The proofs of t...
this paper can not and does not intend to cover the area in full. Its goal is to introduce the basic...
AbstractIn this paper, we develop some important Fourier analysis tools in the context of time scale...
The combination of the time-discrete property of digital signals together with the commonly employed...
aperiodic + dst in time DTFT← → cts + periodic in freq ↓ periodic repetition ↓ sampling periodic + d...
This website includes a Java applet that displays the effect that various operations on an N-periodi...
We show that a stationary signal concept such as the Fourier transform (FT) can be linked to a time-...
Frequency analysis is an important issue in the IEEE. Using a computer in a calculation means moving...
The aim of this technical note is to provide practical knowledge on signal processing based on Fouri...
Index: 1. Introduction 1.1 Continuous- and discrete-time signals 1.2 Delta and step functions 1.3 Sa...
Mixed time-frequency representations are transformations of time-varying signals that depict how the...
AbstractIn this paper, we develop a (q,h)-Laplace transform on specific time scales. We show that th...
Given a signal, one can readily see how the energy of the signal is distributed in time. By computin...
In this thesis, I examine the theoretical properties of the short time discrete Fourier transform (S...
Signals that have undergone a non-homogeneous stretching or compression operation in time have recei...
The following four propositions are required for the proof of Theorem 1 given in II. The proofs of t...
this paper can not and does not intend to cover the area in full. Its goal is to introduce the basic...
AbstractIn this paper, we develop some important Fourier analysis tools in the context of time scale...
The combination of the time-discrete property of digital signals together with the commonly employed...
aperiodic + dst in time DTFT← → cts + periodic in freq ↓ periodic repetition ↓ sampling periodic + d...
This website includes a Java applet that displays the effect that various operations on an N-periodi...
We show that a stationary signal concept such as the Fourier transform (FT) can be linked to a time-...
Frequency analysis is an important issue in the IEEE. Using a computer in a calculation means moving...
The aim of this technical note is to provide practical knowledge on signal processing based on Fouri...
Index: 1. Introduction 1.1 Continuous- and discrete-time signals 1.2 Delta and step functions 1.3 Sa...
Mixed time-frequency representations are transformations of time-varying signals that depict how the...
AbstractIn this paper, we develop a (q,h)-Laplace transform on specific time scales. We show that th...
Given a signal, one can readily see how the energy of the signal is distributed in time. By computin...
In this thesis, I examine the theoretical properties of the short time discrete Fourier transform (S...
Signals that have undergone a non-homogeneous stretching or compression operation in time have recei...
The following four propositions are required for the proof of Theorem 1 given in II. The proofs of t...
this paper can not and does not intend to cover the area in full. Its goal is to introduce the basic...