PPT - Louisiana State University
PPT - Louisiana State University

Chapter 3 Notes
Chapter 3 Notes

Poincaré group
Poincaré group

ppt - damtp
ppt - damtp

Slide 1
Slide 1

... f:{0,1}n{0,1}n, immediately finds a fixed point of f— that is, an x such that f(x)=x Admittedly, not every f has a fixed point But there’s always a distribution D such that f(D)=D Probabilistic Resolution of the Grandfather Paradox ...
3.1 Fock spaces
3.1 Fock spaces

Semiclassical Origins of Density Functionals
Semiclassical Origins of Density Functionals

... been to find an accurate kinetic energy functional TS n bypassing the construction of KS orbitals. Almost all approaches begin from a semilocal expression, sometimes enhanced by nonlocality based on linear response. This study shows that, if one is interested in total energies, a vital feature is ...
Large Quantum Superpositions and Interference of Massive
Large Quantum Superpositions and Interference of Massive

Some Aspects of Quantum Mechanics of Particle Motion in
Some Aspects of Quantum Mechanics of Particle Motion in

... potentials U  r  in Schrödinger relativistic one-dimensional equations derived from the appropriate systems of Dirac equations for radial functions. The Hilbert causality condition and the analysis U  r  were applied to the metrics of the Schwarzschild centrally symmetric uncharged fields in sph ...
PPT - Fernando Brandao
PPT - Fernando Brandao

... For topologically trivial systems (AKLT, Heisenberg models): entanglement spectrum matches the energies of a local Hamiltonian on boundary For topological systems (Toric code): needs non-local Hamiltonian ...
Entanglement Spectrum MIT 2016
Entanglement Spectrum MIT 2016

The Power of Quantum Advice
The Power of Quantum Advice

... consistent with C, if f(x)=C(x) whenever C(x){0,1}. The size of C is the number of inputs x such that C(x){0,1}. Lemma: Let S be a set of Boolean functions f:{0,1}n{0,1}, and let f*S. Then there exist m=O(n) certificates C1,…,Cm, each of size k=O(log|S|), such that ...
Properties, Statistics and the Identity of Quantum Particles
Properties, Statistics and the Identity of Quantum Particles

Symplectic Geometry and Geometric Quantization
Symplectic Geometry and Geometric Quantization

Monday, Apr. 4, 2005
Monday, Apr. 4, 2005

Optical properties - Outline
Optical properties - Outline

16-3 NV pages mx - Quantum Optics and Spectroscopy
16-3 NV pages mx - Quantum Optics and Spectroscopy

... Small Schrödinger-cat states of the spatial wavefunctions of a single trapped ion have been prepared7 and the states of two ions in a trap can be entangled8. In all these experiments, entanglement is studied with two or three subsystems — that is, with photons, ions or an atom and a cavity. Only ver ...
Quantum Computer
Quantum Computer

Testing the Dimension of Hilbert Spaces
Testing the Dimension of Hilbert Spaces

... scenario. When dealing with fundamental issues, for instance, it can be relevant to estimate the dimension of a quantum system without any distinction between classical and quantum resources. The motivation is that if nature is indeed described by quantum theory, classical degrees of freedom have al ...
Optically dressed magnetic atoms
Optically dressed magnetic atoms

Higher-derivative Lagrangians, nonlocality, problems, and solutions
Higher-derivative Lagrangians, nonlocality, problems, and solutions

... are already implicitly present if it is demanded that the equations of motion converge. For finite series expansions, where convergence of the series is not an issue, the constraints play an extremely important perturbative role. The finite series expansion, with perturbative constraints imposed, de ...
1 Uncertainty principle and position operator in standard theory
1 Uncertainty principle and position operator in standard theory

Hidden heat of a particle - Neo
Hidden heat of a particle - Neo

Iizuka-11-11-09
Iizuka-11-11-09

...  We would like to find simple enough toy model where resumming Feynman diagrams is systematic enough so that we can see the full planner physics non-perturbatively  If we can resum all diagrams, unitarity is guaranteed at finite N  Our toy model is kind of reduction of D0-brane black hole with a ...
Variation of Fundamental Constants
Variation of Fundamental Constants

... .Lemonde,M.Takamoto,F.-L.Hong,H.Katori ...

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 (+, −, −, −).