Error estimates of the Bloch band-based Gaussian beam superposition for the Schrödinger equation

Liu, Hailiang; Pryporov, Maksym

doi:10.1090/conm/640/12852

Cited by 6 publications

(2 citation statements)

References 48 publications

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“…In this paper we investigate issues related to the accuracy of Gaussian beam approximations to high frequency wave propagation. This is related to recent results on Gaussian beam methods in [5][6][7][8][9][10][11]13]. Our model equation is the acoustic wave equation…”

Section: Introductionsupporting

confidence: 58%

General superpositions of Gaussian beams and propagation errors

2019

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Gaussian beams are asymptotically valid high frequency solutions concentrated on a single curve through the physical domain, and superposition of Gaussian beams provides a powerful tool to generate more general high frequency solutions to PDEs. We present a superposition of Gaussian beams over an arbitrary bounded set of dimension m in phase space, and show that the tools recently developed in [ H. Liu, O. Runborg, and N. M. Tanushev, Math. Comp., 82: 919-952, 2013] can be applied to obtain the propagation error of order k 1− N, where N is the order of beams and d is the spatial dimension. Moreover, we study the sharpness of this estimate in examples.2000 Mathematics Subject Classification. Primary 35L05, 35A35, 41A60.

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Section: Introductionsupporting

confidence: 58%

General superpositions of Gaussian beams and propagation errors

2019

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“…One of the reasons have been to give a rigorous foundation for the beam based numerical methods above. For the time-dependent case error estimates were first derived for the initial data [18,37], and later for the solution of scalar hyperbolic equations and the Schrödinger equation [23,24,26,41,22]. For the Helmholtz equation estimates have been given in [29,25].…”

Section: Introductionmentioning

confidence: 99%

Sobolev and max norm error estimates for Gaussian beam superpositions

Liu

Runborg

Tanushev

2016

Communications in Mathematical Sciences

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Abstract. This work is concerned with the accuracy of Gaussian beam superpositions, which are asymptotically valid high frequency solutions to linear hyperbolic partial differential equations and the Schrödinger equation. We derive Sobolev and max norms estimates for the difference between an exact solution and the corresponding Gaussian beam approximation, in terms of the short wavelength ε. The estimates are performed for the scalar wave equation and the Schrödinger equation. Our result demonstrates that a Gaussian beam superposition with k-th order beams converges to the exact solution as O(ε k/2−s ) in order s Sobolev norms. This result is valid in any number of spatial dimensions and it is unaffected by the presence of caustics in the solution. In max norm, we show that away from caustics the convergence rate is O(ε k/2 ) and away from the essential support of the solution, the convergence is spectral in ε. However, in the neighborhood of a caustic point we are only able to show the slower, and dimensional dependent, rate O(ε (k−n)/2 ) in n spatial dimensions.

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Error estimates for Gaussian beam methods applied to symmetric strictly hyperbolic systems

Liu

Pryporov

2017

Wave Motion

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Error estimates of the Bloch band-based Gaussian beam superposition for the Schrödinger equation

Cited by 6 publications

References 48 publications

General superpositions of Gaussian beams and propagation errors

General superpositions of Gaussian beams and propagation errors

Sobolev and max norm error estimates for Gaussian beam superpositions

Error estimates for Gaussian beam methods applied to symmetric strictly hyperbolic systems

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