Is there a way to derive the Schrödinger equation from Lagrangian dynamics by an expression for kinetic and potential energy? If this is explained in a textbook, please give me a reference. Your videos are excellent. I would like to learn more about this topic. Thank you!
Thanks for your interesting video. Your viewers might enjoy this video showing under the right conditions, the quantization of a field is easily produced. The ground state energy is induced via Euler’s contain column analysis. Contain column m must come in to play before over buckling or the effect will not work. The system response in a quantized manor when force is applied in the perpendicular direction. Bonding at the points of highest probabilities and maximum duration( peeks and troughs) of the fields/sheet produced a stable structure out of three fields People say I am just plucked guitar strings. I said you can not make structures with vibrating guitar strings or harmonic oscillators. th-cam.com/video/wrBsqiE0vG4/w-d-xo.htmlsi=waT8lY2iX-wJdjO3 At this time I’m my research, I have been trying to describe the “U” shape formed. In the model, “U” shape waves are produced as the loading increases and just before the wave-like function shifts to the next higher energy level. Over-lapping all the waves frequencies together using Fournier Transforms, I understand makes a “U” shape or square wave form. Wondering if Feynman Path Integrals for all possible wave functions could be applicable here? If this model has merit, seeing the sawtooth load verse deflection graph produced could give some real insight in what happened during the quantum jumps. The mechanical description and white paper that goes with the video can be found on my TH-cam page. You can reproduce my results using a sheet of Mylar* ( the clear plastic found in school folders. Seeing it first hand is worth the effort!
Very clear description!
Is there a way to derive the Schrödinger equation from Lagrangian dynamics by an expression for kinetic and potential energy? If this is explained in a textbook, please give me a reference. Your videos are excellent. I would like to learn more about this topic. Thank you!
Consider searching Schrodinger equation deduction on TH-cam. There are a couple of vids coming from de Broglie relation
The explanation is amazing but kindly use your own voice. The AI generated voice sounds terrible.
Thanks for your interesting video.
Your viewers might enjoy this video showing under the right conditions, the quantization of a field is easily produced.
The ground state energy is induced via Euler’s contain column analysis. Contain column m must come in to play before over buckling or the effect will not work. The system response in a quantized manor when force is applied in the perpendicular direction. Bonding at the points of highest probabilities and maximum duration( peeks and troughs) of the fields/sheet produced a stable structure out of three fields
People say I am just plucked guitar strings. I said you can not make structures with vibrating guitar strings or harmonic oscillators.
th-cam.com/video/wrBsqiE0vG4/w-d-xo.htmlsi=waT8lY2iX-wJdjO3
At this time I’m my research, I have been trying to describe the “U” shape formed.
In the model, “U” shape waves are produced as the loading increases and just before the wave-like function shifts to the next higher energy level.
Over-lapping all the waves frequencies together using Fournier Transforms, I understand makes a “U” shape or square wave form.
Wondering if Feynman Path Integrals for all possible wave functions could be applicable here?
If this model has merit, seeing the sawtooth load verse deflection graph produced could give some real insight in what happened during the quantum jumps.
The mechanical description and white paper that goes with the video can be found on my TH-cam page.
You can reproduce my results using a sheet of Mylar* ( the clear plastic found in school folders.
Seeing it first hand is worth the effort!
Solving Schrodinger Equation Solutions On Hydrogen Atom Take 3 months 😞 🤥