What is meaning of quantization of energy? The quantization of energy means that the energy lives in discrete spaces. This means that a wave can only have certain energies, and this property leads to electron orbitals. What is the cause of quantization of energy?
In language tasks, a few words/tokens in a sentence exhibit more importance than words to understand the overall meaning of a sentence better, leading to different patterns of self-attention applied to different parts of the input. In vision applications, a few regions in the input image may ...
The physical meaning of these operators, the algebra as well as the connections with the one-electron density matrix and with the projector on the Fermi sea in the one-electron approximation, follow directly from these expressions. The generalization for a nonorthogonal basis and the algebra for ...
Planck's Contribution.Energy is quantized in some systems, meaning that the system can have only certain energies and not a continuum of energies, unlike the classical case. ... Some of the earliest clues about the necessity of quantum mechanics over classical physics came from the quantization ...
Two results, obtained by different methods, are given for the nonlinear interaction of two electromagnetic waves of different polarizations in a population... A Dienes - 《Quantum Electronics IEEE Journal of》 被引量: 9发表: 1968年 Some considerations on the physical meaning of static seismic coe...
The beauty and symmetry of this proper rule come from its meaning—whenever the number of the nodes of ${phi(x)}$ or the number of the nodes of the wave function ψ(x) increases by one, the momentum integral ${int_{x_A}^{x_B} k(x)dx}$ will increase by π. Based on this ...
The beauty and symmetry of this proper rule come from its meaning—whenever the number of the nodes of f(x){\\phi(x)} or the number of the nodes of the wave function ψ(x) increases by one, the momentum integral òxAxB k(x)dx{\\int_{x_A}^{x_B} k(x)dx} will increase by...
Both the spectrum of those observables (41), (49), and their eigenfunctions (37), (48) acquire a physical meaning in the asymptotic limit of large average angular momentum. The proposed method can be directly applied to the problem of quantization of a rigid rotor, which in spite of ...