Valdez-Alvarado, Solving the time-dependent Schrodinger equation using finite difference methods, Rev Mex De Fisica E 54 (2008), 120-132.Becerril, R., Guzman, F.S., Rendon-Romero, A. and Valdez-Alvarodo, S. (2008) Solving the Time Dependent Schrodinger Equation Using Finite Difference ...
Solutions of time-independent Schrodinger equation for potentials periodic in space satisfy Bloch theorem. The theorem has been used to obtain solutions of the Schrodinger equation for periodic systems by expanding them in terms of plane waves of appropr
Non-Markovian open-system boundary conditions for the time-dependent Schrödinger equation The open-system boundary conditions for the one-dimensional Schr枚dinger equation are derived by dividing the unbounded domain into a finite system and two... JR Hellums,WR Frensley - 《Physical Review B》...
Our previous paper [J. Chem. Phys. 127, 224104 (2007) ] revealed that the Schrodinger equation in the fixed-nucleus approximation could be very accurately solved for helium atom and its isoelectronic ions (Z=1-10) with the free iterative-complement-interaction (ICI) method combined with the ...
For efficiently solving the time dependent Schrödinger equation,TimeSimulationclass must be used. It takes as an argument the Hamiltonian you have previously defined, and the method you desire to use. For a quick start, take a look to the examples found in theexamples subdirectory. ...
摘要: Fastconvergentstudyonpotential-harmonicmethodofdirectlysolvingSchrodingerequationinfew-bodysystemsWangYi-Xuan(王沂轩)andDensCong...关键词: Hyperspherical coordinates Potential-harmonic Fast convergent Eigenenergy Helium atom DOI: CNKI:SUN:HKXJ.0.1996-02-006 ...
Chang Qianshun,Wang Guobin.Multigrid and adaptive algorithm for solving the nonlinear Schr?dinger equation.Journal of Computational Physics. 1990Q. Chang,G. wang.Multigrid and adaptive algorithm for solving the Non-linear Schrodinger Equation. Journal of Computational Physics . 1990...
LagrangeMesh 1.0 is a Mathematica package devoted to solving numerically the one-dimensional time-independent Schrödinger equation with Dirichlet boundary conditions for an arbitrary one-dimensional domain. - JuanCarlosdelValle/LagrangeMesh-Package
77,78. Recently, Chen et al. trained the traditional DNN to solve the MDE in diblock copolymer systems and the static Schrodinger equation in quantum systems, and the efficiency of the solver was analyzed67,79. In this work, we developed a PINN with residual units, which combines with the...
For efficiently solving the time dependent Schrödinger equation,TimeSimulationclass must be used. It takes as an argument the Hamiltonian you have previously defined, and the method you desire to use. For a quick start, take a look to the examples found in theexamples subdirectory. ...