Chapter 1
Chapter 1

... superposed states can be represented as points on a ball (sphere) called Bloch Sphere. The basis states |0 and |1 are just two points on the Bloch Sphere. Superposition is of the form |0 + |1 where  and  are complex numbers called quantum amplitudes. These values  and  are so constrained ...
Interpreting Quantum Mechanics in Terms of - Philsci
Interpreting Quantum Mechanics in Terms of - Philsci

2-dimensional “particle-in-a-box” problems
2-dimensional “particle-in-a-box” problems

HCSS-June09-partA - Indico
HCSS-June09-partA - Indico

Solving the quantum many-body problem via
Solving the quantum many-body problem via

... In quantum physics, fully understanding and characterising complex systems, comprising a large (often macroscopic) number of interacting particles, is an extremely challenging problem. Solutions within the standard framework of (first-quantised) quantum mechanics generally require the knowledge of t ...
URL - StealthSkater
URL - StealthSkater

Quantum distributed computing - Technion
Quantum distributed computing - Technion

Time-Space Efficient Simulations of Quantum Computations
Time-Space Efficient Simulations of Quantum Computations

Frontiers in Quantum Methods and Applications in Chemistry and
Frontiers in Quantum Methods and Applications in Chemistry and

The Age of Entanglement Quantum Computing the (Formerly) Uncomputable
The Age of Entanglement Quantum Computing the (Formerly) Uncomputable

Edge state transport - Penn Physics
Edge state transport - Penn Physics

Helium atom - ChaosBook.org
Helium atom - ChaosBook.org

Helium atom - ChaosBook.org
Helium atom - ChaosBook.org

Quantum Physics (UCSD Physics 130)
Quantum Physics (UCSD Physics 130)

... 1.11 Piecewise Constant Potentials in One Dimension . . . . . . . . . . . . . . 1.12 The Harmonic Oscillator in One Dimension . . . . . . . . . . . . . . . . . 1.13 Delta Function Potentials in One Dimension . . . . . . . . . . . . . . . . 1.14 Harmonic Oscillator Solution with Operators . . . . . . ...
diatomic molecular spectroscopy with standard and anomalous
diatomic molecular spectroscopy with standard and anomalous

Breakdown of NRQCD Factorization
Breakdown of NRQCD Factorization

... A close look at gluon fragmentation (GF): In the standard definition of GF function in any H there is a gauge link U determined by the moving direction of H. Even in the rest frame of H, U is always there. That is why the formation of a quark pair into a quarkonium will depend on the direction. ...
The UNBELIEVABLE similarities between Sean Carroll`s idea (2016
The UNBELIEVABLE similarities between Sean Carroll`s idea (2016

Interpreting Heisenberg Interpreting Quantum States - Philsci
Interpreting Heisenberg Interpreting Quantum States - Philsci

The general theory of first-order spatio-temporal
The general theory of first-order spatio-temporal

Lectures on Quantum Mechanics (nonlinear PDE point of view)
Lectures on Quantum Mechanics (nonlinear PDE point of view)

Realism, rationalism and scientific method
Realism, rationalism and scientific method

... science, and it has been applied to the theatre by Diderot and Brecht. 1 Criticism means that we do not simply accept the phenomena, processes, institutions that surround us but we examine them and try to change them. Criticism is facilitated by proliferation (vol. 1, ch. 8): we do not work with a s ...
Born−Oppenheimer Time-Dependent Systems
Born−Oppenheimer Time-Dependent Systems

Experimental Primer on the Trapped Ion Quantum
Experimental Primer on the Trapped Ion Quantum

... as follows: For simplicity, we assume the atom is confined by a 1-D harmonic well of vibration frequency wz. We use an optical transition whose radiative linewidth g is relatively narrow, g  wz (Doppler laser cooling applies when g  wz ). If a laser beam (frequency wL ) is incident along the direc ...
acta physica slovaca vol. 50 No. 1, 1 – 198 February 2000
acta physica slovaca vol. 50 No. 1, 1 – 198 February 2000

... We present in this work a straightforward, and a “very natural” theoretical extension of traditional (linear) quantum mechanics (QM), providing a general framework of several physical theories. It contains QM itself, its (almost all up to now published) nonlinear modifications and extensions, and al ...
Here - Fifth Quantum Thermodynamics Conference
Here - Fifth Quantum Thermodynamics Conference

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 (+, −, −, −).