On Fourier time-splitting methods for nonlinear Schrodinger equations in the semi-classical limit II. Analytic regularity

Carles Remi; Gallo Clement

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On Fourier time-splitting methods for nonlinear Schrodinger equations in the semi-classical limit II. Analytic regularity

机译：半古典极限II中非线性Schrodinger方程的傅立叶时间分裂方法。分析规则

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We consider the time discretization based on Lie-Trotter splitting, for the nonlinear Schrodinger equation, in the semi-classical limit, with initial data under the form of WKB states. We show that both the exact and the numerical solutions keep a WKB structure, on a time interval independent of the Planck constant. We prove error estimates, which show that the quadratic observables can be computed with a time step independent of the Planck constant. The functional framework is based on time-dependent analytic spaces, in order to overcome a previously encountered loss of regularity phenomenon.

机译：我们考虑基于Lie-Trootter分裂的时间离散化，用于非线性Schrodinger方程，以半古典限制，具有WKB状态形式的初始数据。我们表明，在独立于普通常量的时间间隔内，确切和数值解决方案都保持了WKB结构。我们证明错误估计，这表明可以使用与普通常量无关的时间步长来计算二次观察到。功能框架基于时间依赖的分析空间，以克服先前遇到的规律性现象。

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《Numerische Mathematik》 |2017年第1期|共28页
作者
Carles Remi; Gallo Clement;
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CNRS Inst Montpellierain Alexander Grothendieck CC51 Pl E Bataillon F-34095 Montpellier France;

CNRS Inst Montpellierain Alexander Grothendieck CC51 Pl E Bataillon F-34095 Montpellier France;

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1. 非线性散焦立方薛定谔方程的半古典极限 [J] . 王卫, 王术数学季刊（英文版） . 2002,第003期
2. On Fourier time-splitting methods for nonlinear Schrodinger equations in the semi-classical limit II. Analytic regularity [J] . Carles Remi, Gallo Clement Numerische Mathematik . 2017,第1期

机译：半古典极限II中非线性Schrodinger方程的傅立叶时间分裂方法。分析规则
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On Fourier time-splitting methods for nonlinear Schrodinger equations in the semi-classical limit II. Analytic regularity

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