Superconducting Circuits and Quantum Computation
... The FQLGA is the quantum version of classical lattice-gases (CLG)[3]. CLG are an extension of classical cellular automata with the goal of simulating fluid dynamics without reference to specific microscopic interactions. The binary nature of the CLG lattice variables is replaced for the FQLGA by the ...
... The FQLGA is the quantum version of classical lattice-gases (CLG)[3]. CLG are an extension of classical cellular automata with the goal of simulating fluid dynamics without reference to specific microscopic interactions. The binary nature of the CLG lattice variables is replaced for the FQLGA by the ...
discrete bose-einstein systems in a box with low adiabatic invariant
... The Bose-Einstein systems are described usually by continuous thermodynamic functions, which are dependent on kinetic energy, temperature and chemical potential, but is independent on the container size and shape (considering the quantum gas with a very large number of identical particles and stored ...
... The Bose-Einstein systems are described usually by continuous thermodynamic functions, which are dependent on kinetic energy, temperature and chemical potential, but is independent on the container size and shape (considering the quantum gas with a very large number of identical particles and stored ...
s 1
... Orthohelium states are lower in energy than the parahelium states. Explanation for this is: 1. Parallel spins make the spin part of the wavefunction symmetric. 2. Total wavefunction for electrons must be antisymmetric since electrons are fermions. 3. This forces space part of wavefunction to be anti ...
... Orthohelium states are lower in energy than the parahelium states. Explanation for this is: 1. Parallel spins make the spin part of the wavefunction symmetric. 2. Total wavefunction for electrons must be antisymmetric since electrons are fermions. 3. This forces space part of wavefunction to be anti ...
Lecture 3
... Last year there was a similar result for positive muons; am+ = 11,659,204(7)(5)×10-10 ...
... Last year there was a similar result for positive muons; am+ = 11,659,204(7)(5)×10-10 ...
Acrobat PDF - Electronic Journal of Theoretical Physics
... constants which characterize the effective action of the theory. The price paid is the introduction of a set of never-ending higher order derivative couplings into the theory, unless using the approach of Shiekh [29]. The effective action contains all terms consistent with the underlying symmetries of ...
... constants which characterize the effective action of the theory. The price paid is the introduction of a set of never-ending higher order derivative couplings into the theory, unless using the approach of Shiekh [29]. The effective action contains all terms consistent with the underlying symmetries of ...
Ergodic Semigroups of Positivity Preserving Self
... Glimm and Jaffe [4] that the semigroup generated by the Hamiltonian is ergodic (see also [lo, 111). For the free Hamiltonian in a finite number of degrees of freedom, it was known that the semigroup was positivity improving-it was, thus, natural to try to prove this in general. Of course, Theorem 1 ...
... Glimm and Jaffe [4] that the semigroup generated by the Hamiltonian is ergodic (see also [lo, 111). For the free Hamiltonian in a finite number of degrees of freedom, it was known that the semigroup was positivity improving-it was, thus, natural to try to prove this in general. Of course, Theorem 1 ...
Theoretical and empirical reasons for considering the application of
... at each moment in time. Strictly speaking, being in an inde…nite or superposition state means that the model cannot assume that you have a de…nite value with respect to some judgment scale at each moment in time. You can be in an inde…nite state that allows all of these de…nite states to have potent ...
... at each moment in time. Strictly speaking, being in an inde…nite or superposition state means that the model cannot assume that you have a de…nite value with respect to some judgment scale at each moment in time. You can be in an inde…nite state that allows all of these de…nite states to have potent ...
Spin, or actually: Spin and Quantum Statistics∗
... been deduced directly from the Schrödinger-Pauli equation with full mathematical rigour2. Hund’s 1st Rule in atomic physics, which says that the total spin of the electrons in an only partially filled p-, d-, . . . shell of an atom tends to be as large as possible, is poorly understood, mathematica ...
... been deduced directly from the Schrödinger-Pauli equation with full mathematical rigour2. Hund’s 1st Rule in atomic physics, which says that the total spin of the electrons in an only partially filled p-, d-, . . . shell of an atom tends to be as large as possible, is poorly understood, mathematica ...
Momentum Transfer to a Free Floating Double Slit
... equivalent to a spatial interference pattern because the helium is propagated to macroscopic distances during the process of measurement. The horizontal axis of the coordinate frame is defined by the fragmentation direction of the molecule with the H directed to the right. We select two different re ...
... equivalent to a spatial interference pattern because the helium is propagated to macroscopic distances during the process of measurement. The horizontal axis of the coordinate frame is defined by the fragmentation direction of the molecule with the H directed to the right. We select two different re ...
White Paper
... The quantum dot laser is the newly developed semiconductor laser with the ensemble of nano-sized quantum dots inside the laser cavity as light emitters, in order to revolutionize optical transmitters for optical communications with its robustness to environments. It includes all of the ingredients f ...
... The quantum dot laser is the newly developed semiconductor laser with the ensemble of nano-sized quantum dots inside the laser cavity as light emitters, in order to revolutionize optical transmitters for optical communications with its robustness to environments. It includes all of the ingredients f ...
Chapter 9 – Many Electron Atoms
... Slater determinants easily fold in antisymmetry. If we consider ϕa (1) as a spin-‐orbital, then in the determinant we flip spin-‐orbitals (i.e. labels a,b, etc.) by permutations, or we should flip space ...
... Slater determinants easily fold in antisymmetry. If we consider ϕa (1) as a spin-‐orbital, then in the determinant we flip spin-‐orbitals (i.e. labels a,b, etc.) by permutations, or we should flip space ...
Operator Imprecision and Scaling of Shor’s Algorithm
... the quantum state of the system that realizes the computation (decoherence), and (2) imprecision of the physical operations that are carried out to implement the computational algorithm [1, 2]. Errors due to environmental disturbances have been the main focus of analysis in the quantum computing lit ...
... the quantum state of the system that realizes the computation (decoherence), and (2) imprecision of the physical operations that are carried out to implement the computational algorithm [1, 2]. Errors due to environmental disturbances have been the main focus of analysis in the quantum computing lit ...
Local density of states in quantum Hall systems with a smooth
... Disorder averaging is questioned (at microscopic scale) question of origin of irreversibility and dissipation (crucial for transport) We are in a nonperturbative regime at high magnetic fields (kinetic energy frozen + degeneracy of Landau levels) Smooth disorder (finite correlation length) Complexit ...
... Disorder averaging is questioned (at microscopic scale) question of origin of irreversibility and dissipation (crucial for transport) We are in a nonperturbative regime at high magnetic fields (kinetic energy frozen + degeneracy of Landau levels) Smooth disorder (finite correlation length) Complexit ...
Lecture - Computer Science - University of Central Florida
... Quantum mechanics mathematical model of the physical world. Quantum concepts such as: – Uncertainty, – Superposition, – Entanglement, – No-cloning, do not have a correspondent in classical physics. ...
... Quantum mechanics mathematical model of the physical world. Quantum concepts such as: – Uncertainty, – Superposition, – Entanglement, – No-cloning, do not have a correspondent in classical physics. ...