Branch Mathematics and Statistics Faculty and Staff Publications
Document Type
Article
Publication Date
2024
Abstract
This paper is a follow up to our previous article [1] suggesting that it is possible to find tunneling time solutions for Schrodinger equation considering quasicrystalline as interstellar matter, by virtue of quasicrystalline potential. The paper also discusses the mapping of these equations to Riccati equations, a class of nonlinear differential equations. This mapping can provide insights into the behavior of the Navier-Stokes equations and may lead to new methods for solving them. The Navier-Stokes equations, a set of nonlinear partial differential equations, are fundamental in fluid mechanics. They describe the motion of viscous fluids. In three dimensions, these equations are particularly complex and often leading to turbulence. The paper also discusses shortly on Falaco soliton as a tunneling mechanism in a Navier-Stokes Universe, which is quite able to fill the gap of realistic mechanism of quantum tunneling which is missing in standard Wave Mechanics. Further investigations are advised.
Publication Title
SciNexuses
Volume
1
First Page
151
Last Page
159
Language (ISO)
English
Keywords
Schrodinger Equation, Quasicrystalline, Riccati Equations.
Recommended Citation
Christianto, Victor and Florentin Smarandache.
"Remark on Falaco Soliton as a Tunneling Mechanism in a Navier-Stokes Universe."
SciNexuses
Creative Commons License
This work is licensed under a Creative Commons Attribution 4.0 International License.
