Wave Mechanics - dfcd.net: Articles
... the electrons in the atom involves whole numbers, and so far the only phenomena in which whole numbers were involved in physics were those of interference and of eigenvibrations. That suggested the idea to me that electrons ...
... the electrons in the atom involves whole numbers, and so far the only phenomena in which whole numbers were involved in physics were those of interference and of eigenvibrations. That suggested the idea to me that electrons ...
Ultimate Intelligence Part I: Physical Completeness and Objectivity
... to halting oracles, which would be truly incomputable, and by our arguments in this paper, have no physical relevance. Note that the halting probability is semi-computable. The computable pdf model is a good abstraction of the observations in quantum mechanics (QM). In QM, the wave function itself h ...
... to halting oracles, which would be truly incomputable, and by our arguments in this paper, have no physical relevance. Note that the halting probability is semi-computable. The computable pdf model is a good abstraction of the observations in quantum mechanics (QM). In QM, the wave function itself h ...
Quantum Entanglement: Where Dark Energy and Negative Gravity
... Einstein’s E mc 2 gives the correct total energy formula for an infinitely large Cantor set-like clopen i.e. closed and open universe [24-29] but it does not distinguish between ordinary energy and negative dark energy of a basically fractal cosmos. Noting that measurement leads to quantum wave co ...
... Einstein’s E mc 2 gives the correct total energy formula for an infinitely large Cantor set-like clopen i.e. closed and open universe [24-29] but it does not distinguish between ordinary energy and negative dark energy of a basically fractal cosmos. Noting that measurement leads to quantum wave co ...
Titles and Abstracts - The Institute of Mathematical Sciences
... structure to work with and no sufficient differentiability conditions are known. Our main result will be a generalization of Hörmander’s theorem for discrete groups. The proof is based on an abstract formulation of Calderón-Zygmund theory for von Neumann algebras which we will briefly introduce if ...
... structure to work with and no sufficient differentiability conditions are known. Our main result will be a generalization of Hörmander’s theorem for discrete groups. The proof is based on an abstract formulation of Calderón-Zygmund theory for von Neumann algebras which we will briefly introduce if ...
Quantum telescopes
... entangled. Before the photons become entangled via an atomic interaction, the Heisenberg uncertainty principle applies to the two photons separately. Once the photons are entangled, the uncertainty principle applies to the ensemble of the two photons. This entangled system has twice the energy of th ...
... entangled. Before the photons become entangled via an atomic interaction, the Heisenberg uncertainty principle applies to the two photons separately. Once the photons are entangled, the uncertainty principle applies to the ensemble of the two photons. This entangled system has twice the energy of th ...
Classical/Quantum Dynamics in a Uniform Gravitational Field: B
... that the expressions on the right sides of (15) and (16) become singular in the limit g ↓ 0, and that this makes physical good sense. single -bounce path It is perfectly clear that in the special case g = 0 there are always exactly two paths (x0 , t0 ) −→ (x1 , t1 ): a direct path and a “reflected” p ...
... that the expressions on the right sides of (15) and (16) become singular in the limit g ↓ 0, and that this makes physical good sense. single -bounce path It is perfectly clear that in the special case g = 0 there are always exactly two paths (x0 , t0 ) −→ (x1 , t1 ): a direct path and a “reflected” p ...
review of Quantum Fields and Strings
... A classical field is a function defined on space-time whose values are scalars or vectors or some other geometrical objects. A quantum field, then, should be a field described by quantum mechanics rather than by classical mechanics. If the world is described by quantum fields, then one would think t ...
... A classical field is a function defined on space-time whose values are scalars or vectors or some other geometrical objects. A quantum field, then, should be a field described by quantum mechanics rather than by classical mechanics. If the world is described by quantum fields, then one would think t ...
An Effective Quantum Potential for Particle
... is the direct particle simulation of the dynamics of wave-packets on highly unstructured meshes [9, 10]. The effective quantum potential we use here does not depend on parameters that are hard to estimate and is also generally smoother than the classical potential by two degrees, i.e., two more clas ...
... is the direct particle simulation of the dynamics of wave-packets on highly unstructured meshes [9, 10]. The effective quantum potential we use here does not depend on parameters that are hard to estimate and is also generally smoother than the classical potential by two degrees, i.e., two more clas ...
Angular momenta dynamics in magnetic and electric
... momentum are often easier to solve. This makes it possible to treat a whole class of problems, which, from a quantum theory viewpoint, are extremely complicated. For example, one such problem is the interaction of intense laser radiation with molecules in an external electric or magnetic field; see, ...
... momentum are often easier to solve. This makes it possible to treat a whole class of problems, which, from a quantum theory viewpoint, are extremely complicated. For example, one such problem is the interaction of intense laser radiation with molecules in an external electric or magnetic field; see, ...
Quantum and Ecosystem Entropies
... The microstate description specifies the number of particles in each cell. Now the cells can be grouped by zones of approximately the same energy or some other appropriate macro-property. The distribution of particles in each zone is the macrostate description. Considering the large number of partic ...
... The microstate description specifies the number of particles in each cell. Now the cells can be grouped by zones of approximately the same energy or some other appropriate macro-property. The distribution of particles in each zone is the macrostate description. Considering the large number of partic ...
Section 7.5 Quantum Mechanics and the Atom
... began to suggest a wave nature for particles • The most significant of the observations was atomic spectroscopy – the study of ...
... began to suggest a wave nature for particles • The most significant of the observations was atomic spectroscopy – the study of ...
Quantum error correcting codes and Weyl commutation relations
... for all ρ̂ of the form (1.1). Then the pair (C, R) is called a quantum N -correcting code. If a subspace C admits a recovery operation R so that (C, R) is a quantum N -correcting code we then say that C, or equivalently, the orthogonal projection P on C is a quantum N -correcting code. The dimension ...
... for all ρ̂ of the form (1.1). Then the pair (C, R) is called a quantum N -correcting code. If a subspace C admits a recovery operation R so that (C, R) is a quantum N -correcting code we then say that C, or equivalently, the orthogonal projection P on C is a quantum N -correcting code. The dimension ...
Physics
... including the hydrogen atom, the harmonic oscillator, and the Born approximation for two body collisions. Prerequisite: PHYS 2164. IV PHYS 4102 Senior Research in Physics A capstone laboratory course involving independent research in atomic and molecular collisions. Students will typically modify ex ...
... including the hydrogen atom, the harmonic oscillator, and the Born approximation for two body collisions. Prerequisite: PHYS 2164. IV PHYS 4102 Senior Research in Physics A capstone laboratory course involving independent research in atomic and molecular collisions. Students will typically modify ex ...
