New physical wavelet ‘Gaussian wave packet’

Perel, M. V.; Sidorenko, Mikhail S.

doi:10.1088/1751-8113/40/13/011

Cited by 34 publications

(30 citation statements)

References 20 publications

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“…It has infinitely many zero moments with respect to spatial coordinates. As is shown in [22], its asymptotics coincides with the Morlet wavelet [9,10] as p → ∞ and the time t is fixed:…”

mentioning

confidence: 73%

“…We also consider exponentially localized physical wavelets found and generalized in [19,20,21], wavelet properties of which has been studied in [22].…”

Section: Introductionmentioning

confidence: 99%

“…We also restrict the class of admissible proxy wavelet to the class L 1 (R) L 2 (R). A special case of solutions of the class (81) named the Gaussian wave packet was found in [19,20] and studied in [22]:…”

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confidence: 99%

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Wavelet-based integral representation for solutions of the wave equation

Perel¹,

Sidorenko²

2009

J. Phys. A: Math. Theor.

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An integral representation of solutions of the wave equation as a superposition of other solutions of this equation is built. The solutions from a wide class can be used as building blocks for the representation. Considerations are based on mathematical techniques of continuous wavelet analysis. The formulas obtained are justified from the point of view of distribution theory. A comparison of the results with those by G. Kaiser is carried out. Methods of obtaining physical wavelets are discussed.

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mentioning

confidence: 73%

“…We also consider exponentially localized physical wavelets found and generalized in [19,20,21], wavelet properties of which has been studied in [22].…”

Section: Introductionmentioning

confidence: 99%

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Wavelet-based integral representation for solutions of the wave equation

Perel¹,

Sidorenko²

2009

J. Phys. A: Math. Theor.

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“…The The construction of the wavelets Ψ j is not so obvious, and we briefly discuss the procedure. The starting point for the wavelet construction is the 'Gaussian packet' [8,9]. We construct wavelets in the Fourier domain, because all calculations are performed in the Fourier domain by convolution.…”

Section: Poincaré Wavelets and The Wavelet Transform: Numerical Examplesmentioning

confidence: 99%

“…It is easy to see that the function (18) does not satisfy the admissibility condition (8), but the second derivative of it does. Just this derivative with a small modification is taken as a mother wavelet in the domains D 1,2 :…”

Section: Poincaré Wavelets and The Wavelet Transform: Numerical Examplesmentioning

confidence: 99%

The Poincar´e wavelet transform: Implementation and interpretation

Gorodnitskiy

Perel

2011

Proceedings of the International Conference Days on Diffraction 2011

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Numerical implementation and examples of calculation of the Poincaré wavelet transform for model space-time signals are presented. This transform is a coefficient in the decomposition of solutions of the wave equation in terms of elementary localized solutions found in [1]. Elementary localized solutions are shifted and scaled versions of some chosen solution in a given reference frame, as well as in frames moving with respect to given the one with different constant speeds. We discuss what information about the wave field can be extracted from the Poincaré wavelet transform.

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