Stability analysis of finite difference schemes for quantum mechanical equations of motion

Numerical simulation of relaxation of quantum thermal fluctuations

Golubjeva O.N.
Sidorov S.V.
Bar’Yakhtar V.G.

March 2020

A generalization of quantum-mechanical equations expressed in the hydrodynamic form by introducing t...

Dynamical difference equations

Greenspan, D.

December 1998

AbstractDynamical difference equations are motivated and developed. Conservation and covariance laws...

Numerical simulation of relaxation of quantum thermal fluctuations

Golubjeva O.N.
Sidorov S.V.
Bar’Yakhtar V.G.

A generalization of quantum-mechanical equations expressed in the hydrodynamic form by introducing t...

Stability analysis of finite difference schemes for quantum mechanical equations of motion

Chattaraj, P. K.
Rao, S. Koneru
Deb, B. M.

October 1987

For a pdf involving both space and time variables, stability criteria are presently shown to change ...

The Free Particle Schrodinger Equation and Constant Accelerating Frames

Francesco R. Ruggeri

January 2021

In (1), a free quantum particle is analyzed from a frame moving such that t1=t (time) and x1=x-X(t)....

Finite difference modelling, Fourier analysis, and stability

Peter M. Manning
Gary F. Margrave

December 2014

This paper uses Fourier analysis to present conclusions about stability and dispersion in finite dif...

Numerical Solutions of the Time-Dependent Schr�dinger Equation

Haas, Kevin

May 2021

The behavior of particles at the atomic level is dictated by quantum theory and must satisfy the Sch...

Stability of quantum motion: Beyond Fermi-golden-rule and Lyapunov decay

Wang, W.-G.
Casati, G.
Li, B.

February 2004

10.1103/PhysRevE.69.025201Physical Review E - Statistical, Nonlinear, and Soft Matter Physics692 202...

Stability of quantum motion in regular systems: A uniform semiclassical approach

Wang, W.-G.
Casati, G.
Li, B.

January 2007

10.1103/PhysRevE.75.016201Physical Review E - Statistical, Nonlinear, and Soft Matter Physics751-PLE...

A finite difference Schroedinger equation

Meessen, Auguste

January 1972

To avoid any arbitrariness, one should consider the ultimate limit for the smallest measurable dista...

Numerical stability for finite difference approximations of Einstein's equations

Calabrese, G.
Hinder, I.
Husa, S.

January 2006

We extend the notion of numerical stability of finite difference approximations to include hyperboli...

Numerical stability for finite difference approximations of Einstein's equations

Calabrese, Gioel
Hinder, Ian
Husa, Sascha

January 2006

We extend the notion of numerical stability of finite difference approximations to include hyperboli...

Stability analysis of a real space split operator method for the Klein-Gordon equation

Blumenthal, F.

January 2011

The Klein-Gordon equation is the relativistic, quantum mechanical equation of motion for spinless pa...

Stability analysis of a real space split operator method for the Klein-Gordon equation

Blumenthal, F.

January 2011

The Klein-Gordon equation is the relativistic, quantum mechanical equation of motion for spinless pa...

Numerical Simulation of Quantum Systems -Dynamics of Electrons in Microstructures-

Totsuji, Hiroo
Hashimoto, Seiji
Nara, Shigetoshi

March 1994

Difficulties in simulating systems composed of classical and quantum particles lie in the treatment ...

Numerical simulation of relaxation of quantum thermal fluctuations

Golubjeva O.N.
Sidorov S.V.
Bar’Yakhtar V.G.

March 2020

A generalization of quantum-mechanical equations expressed in the hydrodynamic form by introducing t...

Dynamical difference equations

Greenspan, D.

December 1998

AbstractDynamical difference equations are motivated and developed. Conservation and covariance laws...

Numerical simulation of relaxation of quantum thermal fluctuations

Golubjeva O.N.
Sidorov S.V.
Bar’Yakhtar V.G.

A generalization of quantum-mechanical equations expressed in the hydrodynamic form by introducing t...

Stability analysis of finite difference schemes for quantum mechanical equations of motion

Chattaraj, P. K.
Rao, S. Koneru
Deb, B. M.

October 1987

For a pdf involving both space and time variables, stability criteria are presently shown to change ...

The Free Particle Schrodinger Equation and Constant Accelerating Frames

Francesco R. Ruggeri

January 2021

In (1), a free quantum particle is analyzed from a frame moving such that t1=t (time) and x1=x-X(t)....

Finite difference modelling, Fourier analysis, and stability

Peter M. Manning
Gary F. Margrave

December 2014

This paper uses Fourier analysis to present conclusions about stability and dispersion in finite dif...

Numerical Solutions of the Time-Dependent Schr�dinger Equation

Haas, Kevin

May 2021

The behavior of particles at the atomic level is dictated by quantum theory and must satisfy the Sch...

Stability of quantum motion: Beyond Fermi-golden-rule and Lyapunov decay

Wang, W.-G.
Casati, G.
Li, B.

February 2004

10.1103/PhysRevE.69.025201Physical Review E - Statistical, Nonlinear, and Soft Matter Physics692 202...

Stability of quantum motion in regular systems: A uniform semiclassical approach

Wang, W.-G.
Casati, G.
Li, B.

January 2007

10.1103/PhysRevE.75.016201Physical Review E - Statistical, Nonlinear, and Soft Matter Physics751-PLE...

A finite difference Schroedinger equation

Meessen, Auguste

January 1972

To avoid any arbitrariness, one should consider the ultimate limit for the smallest measurable dista...

Numerical stability for finite difference approximations of Einstein's equations

Calabrese, G.
Hinder, I.
Husa, S.

January 2006

We extend the notion of numerical stability of finite difference approximations to include hyperboli...

Numerical stability for finite difference approximations of Einstein's equations

Calabrese, Gioel
Hinder, Ian
Husa, Sascha

January 2006

We extend the notion of numerical stability of finite difference approximations to include hyperboli...

Stability analysis of a real space split operator method for the Klein-Gordon equation

Blumenthal, F.

January 2011

The Klein-Gordon equation is the relativistic, quantum mechanical equation of motion for spinless pa...

Stability analysis of a real space split operator method for the Klein-Gordon equation

Blumenthal, F.

January 2011

The Klein-Gordon equation is the relativistic, quantum mechanical equation of motion for spinless pa...

Numerical Simulation of Quantum Systems -Dynamics of Electrons in Microstructures-

Totsuji, Hiroo
Hashimoto, Seiji
Nara, Shigetoshi

March 1994

Difficulties in simulating systems composed of classical and quantum particles lie in the treatment ...

Numerical simulation of relaxation of quantum thermal fluctuations

Golubjeva O.N.
Sidorov S.V.
Bar’Yakhtar V.G.

March 2020

A generalization of quantum-mechanical equations expressed in the hydrodynamic form by introducing t...

Dynamical difference equations

Greenspan, D.

December 1998

AbstractDynamical difference equations are motivated and developed. Conservation and covariance laws...

Numerical simulation of relaxation of quantum thermal fluctuations

Golubjeva O.N.
Sidorov S.V.
Bar’Yakhtar V.G.

A generalization of quantum-mechanical equations expressed in the hydrodynamic form by introducing t...

Stability analysis of finite difference schemes for quantum mechanical equations of motion

Abstract

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Stability analysis of finite difference schemes for quantum mechanical equations of motion

Abstract

Extracted data

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