Classical limit and quantum logic - Philsci
Classical limit and quantum logic - Philsci

Quantum Mechanics: what is it and why is it interesting? Dr. Neil Shenvi
Quantum Mechanics: what is it and why is it interesting? Dr. Neil Shenvi

... Wavefunction….wavefunction…wavefunction…………particle! time “The very study of the physical world leads to the conclusion that the concept of consciousness is an ultimate reality” “it follows that the being with a consciousness must have a different role in quantum mechanics than the inanimate object” ...
Symmetry in Electron-Atom Collisions and Photoionization Process
Symmetry in Electron-Atom Collisions and Photoionization Process

... electric dipole moment (EDM). It is the observable signature of simultaneous violations of parity and time-reversal symmetries. Among the two, a proper understanding of time-reversal violation is of paramount importance to resolve the preponderance of matter in the Universe. Another observable of eq ...
Two-dimensional quantum gravity may be formulated as a
Two-dimensional quantum gravity may be formulated as a

... and were shown to exhibit critical points where a continuum limit could be de­ fined.' More recently those continuum limits were shown to agree with results obtained from continuum formulations of 2d gravity, based on conformal field theory techniques' Most of those results were however restricted t ...
Quantum steam tables. Free energy calculations for H2O, D2O, H2S
Quantum steam tables. Free energy calculations for H2O, D2O, H2S

Critical parameters for the heliumlike atoms: A phenomenological
Critical parameters for the heliumlike atoms: A phenomenological

PDF
PDF

The Schrödinger equation Combining the classical Hamilton
The Schrödinger equation Combining the classical Hamilton

Mutually exclusive and exhaustive quantum states
Mutually exclusive and exhaustive quantum states

1 DEPARTMENT OF PHYSICS JAHANGIRNAGAR UNIVERSITY
1 DEPARTMENT OF PHYSICS JAHANGIRNAGAR UNIVERSITY

Introduction to ”Topological Geometrodynamics: an Overview
Introduction to ”Topological Geometrodynamics: an Overview

... 4. Induced gauge potentials are expressible in terms of imbedding space coordinates and their gradients and general coordinate invariance implies that there are only 4 field like variables locally. Situation is thus extremely simple mathematically. The objection is that one loses linear superpositio ...
What Has Quantum Mechanics to Do With Factoring?
What Has Quantum Mechanics to Do With Factoring?

Berry Phase effects on quantum transport
Berry Phase effects on quantum transport

Topological Quantum Computing
Topological Quantum Computing

Aran Sivaguru Dissertation
Aran Sivaguru Dissertation

John S. Bell`s concept of local causality
John S. Bell`s concept of local causality

... But length considerations and the desire to keep the paper selfcontained do not allow any extensive polemical discussions. The paper is organized as follows. In Sec. II, we jump quickly from some of Bell’s preliminary, qualitative statements to his quantitative formulation of relativistic local caus ...
Holographic Entanglement Entropy - Crete Center for Theoretical
Holographic Entanglement Entropy - Crete Center for Theoretical

Noncollinear Spin-Orbit Magnetic Fields in a Carbon Nanotube
Noncollinear Spin-Orbit Magnetic Fields in a Carbon Nanotube

... negative (positive) V BG starting with “a” (“A”) at the band gap. Thus, the filling in, e.g., shell N in the right side is 53–56 electrons within the uncertainty of the band gap position. We determine the electronic structure of a specific shell by inelastic cotunneling spectroscopy as sketched in F ...
On the conundrum of deriving exact solutions from approximate
On the conundrum of deriving exact solutions from approximate

Quantum Wires and Quantum Point Contacts
Quantum Wires and Quantum Point Contacts

Black-Body Radiation for Twist-Deformed Space
Black-Body Radiation for Twist-Deformed Space

... DOI: 10.6122/CJP.20150930 ...
Perturbation Theory and Atomic Resonances Since Schrödinger`s
Perturbation Theory and Atomic Resonances Since Schrödinger`s

...  on a real parameter θ such that x ∈ Rν → eθ x, hence [U (θ)f ] (x) := eνθ/2 f eθ x . For suitable potentials one can treat θ as a complex variable and regard Hθ := U ∗ (θ)HU (θ) as an analytic family of operators. An easy calculation shows that if θ is continued off the real axis, the essential sp ...
Quantum mechanics near closed timelike lines
Quantum mechanics near closed timelike lines

the square root of not - bit
the square root of not - bit

... happens, offer a guarantee of discreteness without any engineering effort at all. When you measure the spin orientation of an electron, for example, it is always either “up” or “down,” never in between. Likewise an atom gains or loses energy by making a “quantum jump” between specific energy states, ...
Lecture 5: Physics Beyond the Standard Model and Supersymmetry
Lecture 5: Physics Beyond the Standard Model and Supersymmetry

Scalar field theory

In theoretical physics, scalar field theory can refer to a classical or quantum theory of scalar fields. A scalar field is invariant under any Lorentz transformation.The only fundamental scalar quantum field that has been observed in nature is the Higgs field. However, scalar quantum fields feature in the effective field theory descriptions of many physical phenomena. An example is the pion, which is actually a pseudoscalar.Since they do not involve polarization complications, scalar fields are often the easiest to appreciate second quantization through. For this reason, scalar field theories are often used for purposes of introduction of novel concepts and techniques.The signature of the metric employed below is (+, −, −, −).