Short Pulse Evolution Equation
... has both a real and imaginary part, which in (5) is manifested by the Burgers’ like second derivative on the left-hand side. The effects of plasma induced diffraction and absorption can and will be added later. Because ...
... has both a real and imaginary part, which in (5) is manifested by the Burgers’ like second derivative on the left-hand side. The effects of plasma induced diffraction and absorption can and will be added later. Because ...
Process, System, Causality, and Quantum Mechanics, A
... multiply the generator of a self-adjoint continuous Markov chain by i. Now Markov processes belong entirely to the theory of probability—there’s no physics in them at all. Could it be that quantum mechanics does for mechanics what statistical mechanics did for the theory of heat? Can mechanics, and ...
... multiply the generator of a self-adjoint continuous Markov chain by i. Now Markov processes belong entirely to the theory of probability—there’s no physics in them at all. Could it be that quantum mechanics does for mechanics what statistical mechanics did for the theory of heat? Can mechanics, and ...
One-way quantum computing with arbitrarily large time
... FIG. 1. Experimental setup to generate a bilayer square-lattice (BSL) CV cluster state (see text for details). Abbreviations: HWP@θ = half-wave plate at angle θ to the horizontal principal axis of the crystal (rotates polarization by 2θ); (P)BS = (polarizing) beamsplitter; MZI = Mach-Zehnder interfe ...
... FIG. 1. Experimental setup to generate a bilayer square-lattice (BSL) CV cluster state (see text for details). Abbreviations: HWP@θ = half-wave plate at angle θ to the horizontal principal axis of the crystal (rotates polarization by 2θ); (P)BS = (polarizing) beamsplitter; MZI = Mach-Zehnder interfe ...
Axiomatic and constructive quantum field theory Thesis for the
... mathematical model that will be used for the description of spacetime. In the remainder of the section we will investigate the properties of this mathematical model, including a detailed discussion of the Poincaré group and its universal covering. In the second section, on quantum theory, we define ...
... mathematical model that will be used for the description of spacetime. In the remainder of the section we will investigate the properties of this mathematical model, including a detailed discussion of the Poincaré group and its universal covering. In the second section, on quantum theory, we define ...
Deconvolutions of Gaussian kernels
... mainly deal here with inverse problems of equation (6), which have not yet been elaborated at the present state-of-art, we should point out that in many problems of deconvolutions, fast Fourier transform (FFT) together with Wiener filters is applied. A very concise paper on the Fourier-based deconvo ...
... mainly deal here with inverse problems of equation (6), which have not yet been elaborated at the present state-of-art, we should point out that in many problems of deconvolutions, fast Fourier transform (FFT) together with Wiener filters is applied. A very concise paper on the Fourier-based deconvo ...
Tensorial spacetime geometries and background
... The GBF was developed in [54–72] because of the necessity in non-perturbative quantum gravity to overcome the conceptual restrictions imposed by the metric [54, 68, 73]: In standard quantum theory, one needs a 3 + 1-split of the spacetime which can only be defined from the background metric. If the ...
... The GBF was developed in [54–72] because of the necessity in non-perturbative quantum gravity to overcome the conceptual restrictions imposed by the metric [54, 68, 73]: In standard quantum theory, one needs a 3 + 1-split of the spacetime which can only be defined from the background metric. If the ...
View the full paper here
... square, we build upon shared knowledge of geometry. Bit is a contraction for “binary digit.” (In another context, it is the cutting edge of a tool.) As a qualifier for data, it describes a variable that, with equal probability, can be zero or one. Once a value is established, we gain information reg ...
... square, we build upon shared knowledge of geometry. Bit is a contraction for “binary digit.” (In another context, it is the cutting edge of a tool.) As a qualifier for data, it describes a variable that, with equal probability, can be zero or one. Once a value is established, we gain information reg ...
LECTURE NOTES ON STATISTICAL MECHANICS Scott Pratt Department of Physics and Astronomy
... The principle of maximizing entropy is related to the Ergodic theorem, which provides the way to understand why all states are equally populated from the perspective of dynamics. The Ergodic theorem is built on the symmetry of time-reversal, i.e., the rate at which one changes from state i to state ...
... The principle of maximizing entropy is related to the Ergodic theorem, which provides the way to understand why all states are equally populated from the perspective of dynamics. The Ergodic theorem is built on the symmetry of time-reversal, i.e., the rate at which one changes from state i to state ...
Thermodynamics of van der Waals Fluids with Quantum Statistics
... unstable. Thus, in the van der Waals fluid with Bose–Einstain’s condensate, one expects the appearance of the two separated phases. The above discussion is not enough to conclude whether the two, wellseparated phases will be formed in the system, or one of the phases will be dispersed in the form of ...
... unstable. Thus, in the van der Waals fluid with Bose–Einstain’s condensate, one expects the appearance of the two separated phases. The above discussion is not enough to conclude whether the two, wellseparated phases will be formed in the system, or one of the phases will be dispersed in the form of ...
Master Thesis
... Physics consists in the effort to reduce and translate natural phenomena to the language of mathematics through the observation of empirical evidence. To achieve that, we build mathematical models, with which we are able to predict, describe and understand nature. And then, in order to corroborate t ...
... Physics consists in the effort to reduce and translate natural phenomena to the language of mathematics through the observation of empirical evidence. To achieve that, we build mathematical models, with which we are able to predict, describe and understand nature. And then, in order to corroborate t ...
REDUCED AND EXTENDED WEAK COUPLING LIMIT
... discussed in the literature, is relevant for the construction of quantum Langevin dynamics and the weak coupling limit. C.p. semigroups that arise in the weak coupling limit have an additional property— they commute with the unitary dynamics generated by the Hamiltonian K of the small system—for bre ...
... discussed in the literature, is relevant for the construction of quantum Langevin dynamics and the weak coupling limit. C.p. semigroups that arise in the weak coupling limit have an additional property— they commute with the unitary dynamics generated by the Hamiltonian K of the small system—for bre ...
Computing prime factors with a Josephson phase qubit quantum
... Here we show coherent interactions for up to four qubits with a resonator and verify genuine bi- and tripartite entanglement including Bell [9] and |Wi-states [10] with quantum state tomography (QST). This QuP has the further advantage of creating entanglement at a rate more than twice that of previ ...
... Here we show coherent interactions for up to four qubits with a resonator and verify genuine bi- and tripartite entanglement including Bell [9] and |Wi-states [10] with quantum state tomography (QST). This QuP has the further advantage of creating entanglement at a rate more than twice that of previ ...