Titlebook: Hyperspherical Harmonics; Applications in Quan John Avery Book 1989 Kluwer Academic Publishers 1989 Atom.atoms.hydrogen.quantum theory.symm

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书目名称Hyperspherical Harmonics影响因子(影响力)




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书目名称Hyperspherical Harmonics网络公开度




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书目名称Hyperspherical Harmonics被引频次




书目名称Hyperspherical Harmonics被引频次学科排名




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,Fock’s Treatment of Hydrogenlike Atoms and its Generalization,relationship between the 4-dimensional hyperspherical harmonics and hydrogenlike wave functions. V. Fock (1935) was able to show that such a relationship does indeed exist. His argument is as follows:

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Symmetry-Adapted Hyperspherical Harmonics,al harmonics as a basis for constructing solutions to the many-particle Schrödinger equation, it is desirable to start with a set of harmonics which are eigenfunctions of total orbital angular momentum.

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Many-Dimensional Hydrogenlike Wave Functions in Direct Space,ect space (by means of a slight modification of the method normally used to treat the hydrogen atom), and it is interesting to compare the direct-space solution with the reciprocal-space method discussed above.

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Harmonic Polynomials,p: . We can also define the generalized Laplacian operator Δ by . A homogeneous polynomial of order n in the coordinates x.,x.,……,x.. is defined to be a polynomial of the form: . where A, B, C, etc are constants, and

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