dorsal/arxiv
View SchemaPhysical model of Schrodinger's electron. Heisenberg convenient way for description of its quantum behaviour
| Authors | Josiph Mladenov Rangelov |
|---|---|
| Categories | |
| ArXiv ID | quant-ph/0001099 |
| URL | https://arxiv.org/abs/quant-ph/0001099 |
Abstract
The object of this paper is to discuss the physical interpretation of quantum behaviour of Schrodinger electron (SchEl) and bring to light on the cause for the Heisenberg convenient operator way of its describing, using the nonrelativistic quantum mechanics laws and its mathematical results. We describe the forced stochastically diverse circular oscillation motion, created by force of the electrical interaction of the SchEl's elementary electric charge with the electric intensity of the resultant quantum electromagnetic field of the existing StchVrtPhtns, as a solution of Abraham-Lorentz equation. By dint of this equation we obtain that the smooth thin line of a classical macro particle is rapidly broken of many short and disorderly orientated lines, owing the continuous dispersion of the quantum micro particle (QntMicrPrt) on the StchVrtPhtns. Between two successive scattering the centers of diverse circular oscillations with stochastically various radii are moving along this short disordered line. These circular oscillations lie within the flats, perpendicular to same disordered short line, along which are moving its centers. In a result of same forced circular oscillation motion the smooth thin line of the LrEl is roughly spread and turned out into some cylindrically wide path of the SchEl. Hence the dispersions of different dynamical parameters, determining the state of the SchEl, which are results of its continuously interaction with the resultant quantum electromagnetic field of the StchVrtPhtns. The absence of the smooth thin line trajectory at the circular oscilation moving of the QntMicrPrt forces us to use the matrix elements (Fourier components) of its roughly spread wide cylindrical path for its description.
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"abstract": "The object of this paper is to discuss the physical interpretation of quantum\nbehaviour of Schrodinger electron (SchEl) and bring to light on the cause for\nthe Heisenberg convenient operator way of its describing, using the\nnonrelativistic quantum mechanics laws and its mathematical results. We\ndescribe the forced stochastically diverse circular oscillation motion, created\nby force of the electrical interaction of the SchEl\u0027s elementary electric\ncharge with the electric intensity of the resultant quantum electromagnetic\nfield of the existing StchVrtPhtns, as a solution of Abraham-Lorentz equation.\nBy dint of this equation we obtain that the smooth thin line of a classical\nmacro particle is rapidly broken of many short and disorderly orientated lines,\nowing the continuous dispersion of the quantum micro particle (QntMicrPrt) on\nthe StchVrtPhtns. Between two successive scattering the centers of diverse\ncircular oscillations with stochastically various radii are moving along this\nshort disordered line. These circular oscillations lie within the flats,\nperpendicular to same disordered short line, along which are moving its\ncenters. In a result of same forced circular oscillation motion the smooth thin\nline of the LrEl is roughly spread and turned out into some cylindrically wide\npath of the SchEl. Hence the dispersions of different dynamical parameters,\ndetermining the state of the SchEl, which are results of its continuously\ninteraction with the resultant quantum electromagnetic field of the\nStchVrtPhtns. The absence of the smooth thin line trajectory at the circular\noscilation moving of the QntMicrPrt forces us to use the matrix elements\n(Fourier components) of its roughly spread wide cylindrical path for its\ndescription.",
"arxiv_id": "quant-ph/0001099",
"authors": [
"Josiph Mladenov Rangelov"
],
"categories": [
"quant-ph"
],
"title": "Physical model of Schrodinger\u0027s electron. Heisenberg convenient way for description of its quantum behaviour",
"url": "https://arxiv.org/abs/quant-ph/0001099"
},
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"type": "Model",
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