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Asymptotics of a Time-Splitting Scheme for the RandomSchrödinger Equation with Long-Range Correlations

Published online by Cambridge University Press:  20 February 2014

Christophe Gomez
Affiliation:
Laboratoire d’Analyse, Topologie, Probabilités, UMR 7353, Aix-Marseille Université, Marseille, France.. christophe.gomez@latp.univ-mrs.fr
Olivier Pinaud
Affiliation:
Department of Mathematics, Colorado State University, Fort Collins, CO, USA.; pinaud@math.colostate.edu
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Abstract

This work is concerned with the asymptotic analysis of a time-splitting scheme for theSchrödinger equation with a random potential having weak amplitude, fast oscillations intime and space, and long-range correlations. Such a problem arises for instance in thesimulation of waves propagating in random media in the paraxial approximation. Thehigh-frequency limit of the Schrödinger equation leads to different regimes depending onthe distance of propagation, the oscillation pattern of the initial condition, and thestatistical properties of the random medium. We show that the splitting scheme capturesthese regimes in a statistical sense for a time stepsize independent of the frequency.

Type
Research Article
Copyright
© EDP Sciences, SMAI, 2014

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References

Bal, G., Komorowski, T. and Ryzhik, L., Kinetic limits for waves in a random medium. Kinet. Relat. Models 3 (2010) 529644. Google Scholar
G. Bal, T. Komorowski and L. Ryzhik, Asymptotics of the phase of the solutions of the random schrödinger equation. ARMA (2011) 13–64.
Bal, G. and Ryzhik, L., Time splitting for wave equations in random media. ESAIM: M2AN 38 (2004) 961988. Google Scholar
Bao, W., Jin, S. and Markowich, P.A., On Time-Splitting spectral approximations for the Schrödinger equation in the semiclassical regime. J. Comput. Phys. 175 (2002) 487524. Google Scholar
P. Billingsley, Convergence of Probability Measures. John Wiley and Sons, New York (1999).
Dolan, S., Bean, C. and Riollet, B., The broad-band fractal nature of heterogeneity in the upper crust from petrophysical logs. Geophys. J. Int. 132 (1998) 489507. Google Scholar
J.-P. Fouque, J. Garnier, G. Papanicolaou and K. Sølna, Wave propagation and time reversal in randomly layered media, in vol. 56 of Stoch. Model. Appl. Probab. Springer, New York (2007).
Gomez, C., Radiative transport limit for the random Schrödinger equation with long-range correlations. J. Math. Pures. Appl. 98 (2012) 295327. Google Scholar
C. Gomez, Wave decoherence for the random Schrödinger equation with long-range correlations. To appear in CMP (2012).
A.A. Gonoskov and I.A. Gonoskov, Suppression of reflection from the grid boundary in solving the time-dependent Schroedinger equation by split-step technique with fast Fourier transform, ArXiv Physics e-prints (2006).
Jin, S., Markowich, P. and Sparber, C., Mathematical and computational methods for semiclassical Schrödinger equations. Acta Numer. 20 (2011) 121209. Google Scholar
Lions, P.-L. and Paul, T., Sur les mesures de Wigner. Rev. Mat. Iberoamericana 9 (1993) 553618. Google Scholar
Markowich, P.A., Pietra, P. and Pohl, C., Numerical approximation of quadratic observables of Schrödinger-type equations in the semi-classical limit. Numer. Math. 81 (1999) 595630. Google Scholar
Martin, J.M. and Flatté, M., Intensity images and statistics from numerical simulation of the wave propagation in 3-d random media. Appl. Optim. 247 (1988) 21112126. Google Scholar
McLachlan, R.I. and Quispel, G.R.W., Splitting methods. Acta Numer. 11 (2002) 341434. Google Scholar
Sidi, C. and Dalaudier, F., Turbulence in the stratified atmosphere: Recent theoretical developments and experimental results. Adv. Space Research 10 (1990) 2536. Google Scholar
Strang, G., On the construction and comparison of difference schemes. SIAM J. Numer. Anal. 5 (1968) 506517. Google Scholar
F. Tappert, The parabolic approximation method, Wave propagation in underwater acoustics. In vol. 70 of Lect. Notes Phys. Springer (1977) 224–287.