Schrödinger equation solver for a particle subject to diverse potentials.

This GUI allows the user to solve the Schrödinger equation for a particle subject to the potential the user chooses to apply, including multiple quantum wells, super lattices, band bending and the

WKB expansion for a fractional Schrödinger equation with applications to controllability

Find eigen values and eigen vectors of Schrödinger equation and plot them.

1d Schrödinger equation solver.This is Matlab version of qm1d program written in Fortran. I found it here: http://iffwww.iff.kfa-juelich.de/~ekoch/DFT/qm1d.html Note that this program uses lapack

Finite difference Mode Solver for TE/TM E- and/or H-fields in optical waveguide structures with arbitrary index profile.

the book 'Introduction to Optical Waveguide Analysis: Solving Maxwell's Equations and the Schrödinger Equation' by K. Kawano and T. Kitoh.I implemented this mode solver during my time as a PhD student

Method to compute vortex solitons, by Rohan Ramesh and Servando Lopez-Aguayo

section individually using CTRL+SHIFT+ENTER.% Details of the code shall be found % in the manuscript:% "Fast Petviashvili-Hankel method for vortex solitons in the generalized% nonlinear Schrödinger equation

Toolbox for multiparameter and singular eigenvalue problems

systems separation of variables applied to the Helmholtz, Laplace, or Schrödinger equation leads to a MEP, some cases are Mathieu’s system, Lamé’s system, and a system of spheroidal wave functions. A

Finite difference semi-vectorial wide-angle beam propagation algorithm for TE- and/or TM-Polarization of E- and/or H-fields in optical waveg

refer to appropriate literature. And excellent and comprehensive work is the book 'Introduction to Optical Waveguide Analysis: Solving Maxwell's Equations and the Schrödinger Equation' by K. Kawano and T

The toolbox comes with more than 170 special functions in the complex domain, covering in addition non-integer indices where appropriate.

quantumdynamics.Laguerre Polynomialsplay an important role in solving the radialSchrödinger equation for Coulomb systems. Here we evaluate generalizedor associate Laguerre polynomials.Chebychev Polynomialsare orthogonal