Comment on 'Nonlinear dynamics of a position-dependent mass-driven Duffing-type oscillator'
Loading...
Date
Authors
Journal Title
Journal ISSN
Volume Title
Publisher
IOP Publishing
Access Rights
info:eu-repo/semantics/closedAccess
Abstract
Using a generalized coordinate along with a proper invertible coordinate transformation, we show that the Euler–Lagrange equation used by Bagchi et al (2013 J. Phys. A: Math. Theor. 46 032001) is in clear violation of Hamilton's principle. We also show that the Newton equation of motion they have used is not in a form that satisfies the dynamics of position-dependent mass (PDM) settings. The equivalence between the Euler–Lagrange equation and Newton's equation is now proved and documented through the proper invertible coordinate transformation and the introduction of a new PDM byproducted reaction-type force. The total mechanical energy for the PDM is shown to be conservative (i.e., dE/dt = 0, unlike Bagchi et al's (2013) observation).
Description
Due to copyright restrictions, the access to the publisher version (published version) of this article is only available via subscription. You may click URI and have access to the Publisher Version of this article through the publisher web site or online databases, if your Library or institution has subscription to the related journal or publication
Keywords
PHYSICS, MULTIDISCIPLINARY, MATHEMATICAL, POTENTIALS
Journal or Series
Journal of Physics A: Mathematical and Theoretical
WoS Q Value
Scopus Q Value
Volume
46
Issue
36
