STANDING-WAVE STRUCTURES 1 Introduction Basically all
... acceleration would be extremely poor, because half of the accelerator provides no energy transfer to the beam. However, the model developed here has no restriction on the geometrical shape of the adjacent cavities. In fact, the chain may look biperiodic (alternating-periodic structure – APS), as sho ...
... acceleration would be extremely poor, because half of the accelerator provides no energy transfer to the beam. However, the model developed here has no restriction on the geometrical shape of the adjacent cavities. In fact, the chain may look biperiodic (alternating-periodic structure – APS), as sho ...
Rate of energy absorption for a driven chaotic cavity
... overlap integrals of the eigenfunctions (see [14]). We have used all 451 states lying in the range of wavenumbers 398 < k < 402, where the mean level spacing is , ≈ 8.8 × 10−3 in ω units. Note that there are ∼102 de Broglie wavelengths across the system. The stadium was chosen because it enables eff ...
... overlap integrals of the eigenfunctions (see [14]). We have used all 451 states lying in the range of wavenumbers 398 < k < 402, where the mean level spacing is , ≈ 8.8 × 10−3 in ω units. Note that there are ∼102 de Broglie wavelengths across the system. The stadium was chosen because it enables eff ...
Fano resonances in the excitation spectra of semiconductor
... the Fano resonance. In Fig. 3, we display a set of PLE spectra in the presence of a magnetic field applied perpendicularly to the layers. Modification of the PLE spectrum became noticeable at a magnetic field exceeding 0.5 T. The oscillator strength of the 1s-lh exciton is gradually reduced in favor ...
... the Fano resonance. In Fig. 3, we display a set of PLE spectra in the presence of a magnetic field applied perpendicularly to the layers. Modification of the PLE spectrum became noticeable at a magnetic field exceeding 0.5 T. The oscillator strength of the 1s-lh exciton is gradually reduced in favor ...
Experimental Optimal Cloning of Four
... HOM interference between the two photon ququarts impinging on modes ks and ka of BS1. The ancillary photon was prepared in the same quantum state as the signal photon, in order for the interference to occur. The twophoton coincidence counts were measured as a function of the optical path delay betwe ...
... HOM interference between the two photon ququarts impinging on modes ks and ka of BS1. The ancillary photon was prepared in the same quantum state as the signal photon, in order for the interference to occur. The twophoton coincidence counts were measured as a function of the optical path delay betwe ...
Calculation of Dispersion Energies - Psi-k
... ”Dispersion forces” [1], [2] are generally understood in the solid-state physics community to be that part of part of the non-covalent van der Waals (vdW) interaction that cannot be attributed to any permanent electric mono-or multipoles. (In the chemistry community, the whole of the non-chemically- ...
... ”Dispersion forces” [1], [2] are generally understood in the solid-state physics community to be that part of part of the non-covalent van der Waals (vdW) interaction that cannot be attributed to any permanent electric mono-or multipoles. (In the chemistry community, the whole of the non-chemically- ...
Unit 4 Fields and Further Mechanics - complete
... (iii) The material from which the bullet is made has a specific heat capacity of 250 J kg–1 K–1. Assuming that all the lost kinetic energy becomes internal energy in the bullet, calculate its temperature rise during the collision. ...
... (iii) The material from which the bullet is made has a specific heat capacity of 250 J kg–1 K–1. Assuming that all the lost kinetic energy becomes internal energy in the bullet, calculate its temperature rise during the collision. ...
First-order strong-field QED processes in a tightly focused laser beam
... the mentioned experimentally achieved laser intensities we can conclude that present technology allows in principle entering the strong-field QED regime. For the sake of completeness, we have to remind readers that another requirement for entering the strong-field regime is the importance of nonline ...
... the mentioned experimentally achieved laser intensities we can conclude that present technology allows in principle entering the strong-field QED regime. For the sake of completeness, we have to remind readers that another requirement for entering the strong-field regime is the importance of nonline ...
Casimir effect
In quantum field theory, the Casimir effect and the Casimir–Polder force are physical forces arising from a quantized field. They are named after the Dutch physicist Hendrik Casimir.The typical example is of two uncharged metallic plates in a vacuum, placed a few nanometers apart. In a classical description, the lack of an external field means that there is no field between the plates, and no force would be measured between them. When this field is instead studied using the QED vacuum of quantum electrodynamics, it is seen that the plates do affect the virtual photons which constitute the field, and generate a net force—either an attraction or a repulsion depending on the specific arrangement of the two plates. Although the Casimir effect can be expressed in terms of virtual particles interacting with the objects, it is best described and more easily calculated in terms of the zero-point energy of a quantized field in the intervening space between the objects. This force has been measured and is a striking example of an effect captured formally by second quantization. However, the treatment of boundary conditions in these calculations has led to some controversy.In fact, ""Casimir's original goal was to compute the van der Waals force between polarizable molecules"" of the metallic plates. Thus it can be interpreted without any reference to the zero-point energy (vacuum energy) of quantum fields.Dutch physicists Hendrik B. G. Casimir and Dirk Polder at Philips Research Labs proposed the existence of a force between two polarizable atoms and between such an atom and a conducting plate in 1947, and, after a conversation with Niels Bohr who suggested it had something to do with zero-point energy, Casimir alone formulated the theory predicting a force between neutral conducting plates in 1948; the former is called the Casimir–Polder force while the latter is the Casimir effect in the narrow sense. Predictions of the force were later extended to finite-conductivity metals and dielectrics by Lifshitz and his students, and recent calculations have considered more general geometries. It was not until 1997, however, that a direct experiment, by S. Lamoreaux, described above, quantitatively measured the force (to within 15% of the value predicted by the theory), although previous work [e.g. van Blockland and Overbeek (1978)] had observed the force qualitatively, and indirect validation of the predicted Casimir energy had been made by measuring the thickness of liquid helium films by Sabisky and Anderson in 1972. Subsequent experiments approach an accuracy of a few percent.Because the strength of the force falls off rapidly with distance, it is measurable only when the distance between the objects is extremely small. On a submicron scale, this force becomes so strong that it becomes the dominant force between uncharged conductors. In fact, at separations of 10 nm—about 100 times the typical size of an atom—the Casimir effect produces the equivalent of about 1 atmosphere of pressure (the precise value depending on surface geometry and other factors).In modern theoretical physics, the Casimir effect plays an important role in the chiral bag model of the nucleon; in applied physics, it is significant in some aspects of emerging microtechnologies and nanotechnologies.Any medium supporting oscillations has an analogue of the Casimir effect. For example, beads on a string as well as plates submerged in noisy water or gas illustrate the Casimir force.