Examples of 'fourier transforms' in a sentence
Meaning of "fourier transforms"
fourier transforms ~ mathematical formulas used to transform a function or signal from the time domain to the frequency domain, often used in areas such as signal processing and image analysis
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- plural of Fourier transform
How to use "fourier transforms" in a sentence
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fourier transforms
Fourier transforms have many uses.
These wavefunctions are Fourier transforms of each other.
Fourier transforms and their inverse.
We sat around talking about Fourier transforms.
Fast fourier transforms are used extensively in digital radar among other places.
A guide to distribution theory and Fourier transforms.
Fourier transforms are particularly useful for spectral analysis of time domain signals.
Conditions for the existence of Fourier transforms.
The use of fast Fourier transforms accelerates calculations.
That is one of a variety of applications of Fourier transforms to statistics.
The Fourier transforms for both functions are then calculated.
This is in contrast to how Fourier transforms are usually described.
The autocorrelation data are analyzed by fast Fourier transforms.
This is where Fourier transforms come into play.
This is due to the use of fast Fourier transforms.
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Two discrete Fourier transforms are performed in the logic unit of the receiver.
Many magnetic resonance imaging techniques use Fourier transforms.
This consists of a sequence of Fourier transforms with a fixed shift in time.
In practice this is performed by the use of fast Fourier transforms.
Transverse charge densities are Fourier transforms of the electromagnetic form factors.
The equations he had developed were called Fourier transforms.
This time the Fourier transforms need to be considered as a Cauchy principal value.
This formula is useful especially when working with Fourier transforms.
A series of Fourier transforms is carried out over various periods of the signal.
The reading of the hologram will generate two Fourier transforms.
Example of short time Fourier transforms used to determine time of impact from audio signal.
It is also possible to apply simulation methods using fast Fourier transforms.
The processings make use of discrete Fourier transforms of the processed signals.
The origin of this problem was first presented in the chapter on Fourier Transforms.
Wavelets have some slight benefits over Fourier transforms in reducing computations when examining specific frequencies.
This method is extremely fast because it only requires calculation of three Fourier transforms.
Fourier transforms of the GCD.
Signal analysis is comprised essentially by Fourier transforms and similar techniques.
The Fourier transforms used in the usual methods have been replaced by this matrix H DOE.
Pulse shapers usually refer to optical modulators which apply Fourier transforms to a laser beam.
Te if fast Fourier transforms are formed with half-block overlap.
The Hadamard transform is an example of a generalized class of Fourier transforms.
In effect, this makes it possible to speak of Fourier transforms of quadratically integrable functions.
Then the spatio-temporal responses are obtained using inverse Fourier transforms.
These figures represent a set of Fourier transforms ( FFT ) for a succession of moments.
Also optionally, the transform and inverse transform are discrete Fourier transforms.
Fast Fourier transforms are widely used for applications in engineering, science, and mathematics.
The PSD can be estimated through use of Fourier transforms.
From then, the formalism of Fourier transforms will make the work easier.
For example, Norbert Wiener had mastered Fourier transforms.
Computing the two-dimensional Fourier transforms of recorded images is computationally very expensive.
In the simplest approximation, the two are simply Fourier transforms of one another.
The fast Fourier transforms of acoustic transients reveal this property, as shown in Figure 4.
Summary of different Fourier transforms.
Fourier transforms then combine the intensity data and convert the 180 interferograms into a single absorbance spectrum.
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Examples of using Fourier
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Fourier analysis is particularly common for waves
Optical propagation and the fractional fourier transformation
Fourier analysis of continuous and discrete signals
Examples of using Transforms
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Then career slowly transforms into vocation
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