Logical necessity of Quantum Mechanics

Autor: Enrico Pier Giorgio Cadeddu
Jazyk: angličtina
Rok vydání: 2023
Předmět:
Quantum mechanics classical continuous discontinuous motion emission paradox Zeno Cantor Dedekind Planck Schrödinger Heisenberg uncertainty principle first transfinite ordinal number ω successor logical necessity finite infinite infinity infinitesimal part segment ∆x ∆p ℏ ∆t ∆E ℏ physics not-classical behaviour
Dedekind
First transfinite ordinal number ω
Cantor
Quantum mechanics
Planck Schrödinger Heisenberg
Discontinuous motion
Discontinuous emission
Uncertainty principle
Quantum mechanics classical continuous discontinuous motion emission paradox Zeno Cantor Dedekind Planck Schrödinger Heisenberg uncertainty principle first transfinite ordinal number ω successor logical necessity finite infinite infinity infinitesimal part segment physics not-classical behaviour
Successor
Classical mechanics
Zeno paradoxes
Logical necessity
DOI: 10.5281/zenodo.7908751
Popis: From classical mechanics, in particular the motion in a straight line, together set theory and ordinal number theory, we prove a not-classical behaviour, a discontinuous motion and emission. Now we have obtained that the not-classical behaviour is essentially due to ∄n(ω = S(n)). But incredibly this could have been discovered about 140 years ago, before Planck theory. So quantum behaviour looks very natural and classical mechanics has to be rejected. The classical limit h = 0 cannot exist. The most important theories describe Quantum behavior. It is the first time that classical mechanics is theoretically refuted in favor of quantum mechanics.
Databáze: OpenAIRE
Externí odkaz: