Quantum Computer Simulation Using CUDA
Quantum Computer Simulation Using CUDA

... within the same 512-element block of the vector state array. 512 complex numbers is the largest power of two we can fit into shared memory on the GTX280 graphics cards. This observation suggests a means of using shared memory to improve performance. Each block will copy-in 512 elements from the stat ...
A Quantum Algorithm for Finding a Hamilton Circuit
A Quantum Algorithm for Finding a Hamilton Circuit

The role of the electromagnetic field in the formation of domains in
The role of the electromagnetic field in the formation of domains in

... which is a Jaynes-Cummings-like Hamiltonian, indeed. In eq. (1.2) γ is a coupling constant which is proportional to the atomic dipole moment matrix element and to the inverse of the volume square root V −1/2 , b is the e.m. quantum field operator (associated to the cnumber amplitude u), S ± are the ...
On the Dirac Scattering Problem
On the Dirac Scattering Problem

Stark Effect - Physics
Stark Effect - Physics

... −M ; and (iv.) factor into a product of two simpler functions which are simple look-ups. The Stark effect partly breaks the N 2 -fold degeneracy of the states in the principal quantum level N into one N -fold degenerate multiplet and two multiplets with degeneracies k, where k = 1, 2, · · · , N − 1. ...
Dynamics of a classical Hall system driven by a time-dependent
Dynamics of a classical Hall system driven by a time-dependent

... The motivation to study the dynamics of this classical system is to sharpen our intuition on its quantum counterpart which is, following Laughlin’s13 and Halperin’s11 proposals, widely used for an explanation of the integer quantum Hall effect. Of special interest is how the topology influences on t ...
The Mathematics of M
The Mathematics of M

... 3.5. ‘Stringy’ geometry and T-duality Two-dimensional sigma models give a natural one-parameter deformation of classical geometry. The deformation parameter is Planck’s constant α . In the limit α → 0 we localize on constant loops and recover quantum mechanics or point particle theory. For non-zer ...
(1) Fermat`s last theorem for (2) the area of a Pythagorean triangle
(1) Fermat`s last theorem for (2) the area of a Pythagorean triangle

Propensities in Quantum Mechanics - Philsci
Propensities in Quantum Mechanics - Philsci

On the role of entanglement in quantum information
On the role of entanglement in quantum information

What you always wanted to know about Bohmian mechanics but
What you always wanted to know about Bohmian mechanics but

... de l'onde pilote) by him (Bacciagaluppi/Valentini, 2006). For reasons which are not entirely claried yet the theory fell into oblivion until David Bohm developed it independently in 1951 (Bohm, 1952). However, the reception of this work was unfriendly, to say the least. See e.g. Myrvold (2003) for ...
The Role of Optics and Photonics in a National Initiative in Quantum
The Role of Optics and Photonics in a National Initiative in Quantum

When Alice and Bob disagree - Physics @ The University of
When Alice and Bob disagree - Physics @ The University of

The Emergence and Interpretation of Probability
The Emergence and Interpretation of Probability

Probability in Bohmian Mechanics[1]
Probability in Bohmian Mechanics[1]

A STRAIGHTFORWARD SET UP OF
A STRAIGHTFORWARD SET UP OF

... and E Schr /( m 0 c 02 ) are very small as compared to unity] where V(r0 ) , as usual denote the potential energy  Ze 2 / r0 . Correct, Simple, Relativistic Quantum Mechanical Equation Via taking into account the terms we have neglected in Eq.(25), we arrive at an equation which can be considered ...
Discussion Guide
Discussion Guide

Jan Kriz
Jan Kriz

a case against the first quantization
a case against the first quantization

9 Central Forces and Kepler`s Problem
9 Central Forces and Kepler`s Problem

... Figure 1: The shaded region has area dA = 12 r2 dθ. Since the small remaining region has an area of order O(dθ2 ), dA gives us the area swept out by the radius vector to first order in dθ. The conservation of L gives us 3 independent constants of motion, two of which are effectively specifying the d ...
Fundamental Theories of Physics
Fundamental Theories of Physics

... transformed by respectively different group elements. At this level of extreme abstraction from all hitherto assumed theoretical elements in physics, one can speak neither of particles nor of forces. Therefore such a change of relations between subsets of urs is a first indication of interaction. Thes ...
1 Introduction. Measurable and Nonmea
1 Introduction. Measurable and Nonmea

... of the minimal possible measuring unit lmin . So, trying to frame a theory (QT and GR) correct at all the energy levels using only the measurable quantities, one should realize that then the mathematical formalism of the theory should not involve any infinitesimal spatial-temporal quantities. Beside ...
RANDOM MATRIX THEORY IN PHYSICS
RANDOM MATRIX THEORY IN PHYSICS

Fundamental aspects of quantum Brownian motion
Fundamental aspects of quantum Brownian motion

A Quantum Version of The Spectral Decomposition Theorem of
A Quantum Version of The Spectral Decomposition Theorem of

Path integral formulation