Newton's law for a trajectory of concentration of solutions to nonlinear Schrodinger equation

&

Abstract

One of important problems in mathematical physics concerns derivation of point dynamics from field equations. The most common approach to this problem is based on WKB method. Here we describe a different method based on the concept of trajectory of concentration. When we applied this method to nonlinear Klein-Gordon equation, we derived relativistic Newton's law and Einstein's formula for inertial mass. Here we apply the same approach to nonlinear Schrodinger equation and derive non-relativistic Newton's law for the trajectory of concentration.

Categories

Add categories

Keywords

Reprint years

Other Versions

No versions found

Links

PhilArchive

    This entry is not archived by us. If you are the author and have permission from the publisher, we recommend that you archive it. Many publishers automatically grant permission to authors to archive pre-prints. By uploading a copy of your work, you will enable us to better index it, making it easier to find.

    Upload a copy of this work     Papers currently archived: 106,894

External links

Setup an account with your affiliations in order to access resources via your University's proxy server

Through your library

  • Only published works are available at libraries.

My notes

Similar books and articles

Linear and nonlinear Schrödinger equations.G. Adomian & R. Rach - 1991 - Foundations of Physics 21 (8):983-991.
Explicit mathematical construction of relativistic nonlinear de Broglie waves described by three-dimensional (wave and electromagnetic) solitons “piloted” (controlled) by corresponding solutions of associated linear Klein-Gordon and Schrödinger equations.Jean-Pierre Vigier - 1991 - Foundations of Physics 21 (2):125-148.
Trial Equation Method Based on Symmetry and Applications to Nonlinear Equations Arising in Mathematical Physics.Cheng-Shi Liu - 2011 - Foundations of Physics 41 (5):793-804.
A 4*4 Schroedinger equation from relativistic total energy with a 2*2 Lorentz invariant solution.Han Geurdes - 2018 - High Energy Density Physics 26:10.1016/j.hedp.2017.12.004.
An Inhomogeneous Space–Time Patching Model Based on a Nonlocal and Nonlinear Schrödinger Equation.Christine C. Dantas - 2016 - Foundations of Physics 46 (10):1269-1292.
Generalized Lagrangian-Path Representation of Non-Relativistic Quantum Mechanics.Massimo Tessarotto & Claudio Cremaschini - 2016 - Foundations of Physics 46 (8):1022-1061.
Elimination of the Potential from the Schrödinger and Klein–Gordon Equations by Means of Conformal Transformations.Valerio Faraoni & Donovan M. Faraoni - 2002 - Foundations of Physics 32 (5):773-788.
A Fundamental Form of the Schrodinger Equation.Muhammad Adeel Ajaib - 2015 - Foundations of Physics 45 (12):1586-1598.
Field theory onR× S 3 topology. I: The Klein-Gordon and Schrödinger equations. [REVIEW]M. Carmeli - 1985 - Foundations of Physics 15 (2):175-184.
Derivation of the relativistic momentum and relativistic equation of motion from Newton's second law and Minkowskian space-time geometry.Krzysztof Rebilas - 2008 - Apeiron: Studies in Infinite Nature 15 (3).

Analytics

Added to PP
2017-03-08

Downloads
9 (#1,608,771)

6 months
3 (#1,188,611)

Historical graph of downloads
How can I increase my downloads?

Citations of this work

No citations found.

Add more citations

References found in this work

No references found.

Add more references