Abstract

We first present the exact solutions of the single ring-shaped Coulomb potential and then realize the visualizations of the space probability distribution for a moving particle within the framework of this potential. We illustrate the two-dimensional (contour) and three-dimensional (isosurface) visualizations for those specifically given quantum numbers (, , ) essentially related to those so-called quasi-quantum numbers (, , ) through changing the single ring-shaped Coulomb potential parameter . We find that the space probability distributions (isosurface) of a moving particle for the special case and the usual case are spherical and circularly ring-shaped, respectively, by considering all variables in spherical coordinates. We also study the features of the relative probability values of the space probability distributions. As an illustration, by studying the special case of the quantum numbers (, , ) = (6, 5, 1), we notice that the space probability distribution for a moving particle will move towards the two poles of the -axis as the relative probability value increases. Moreover, we discuss the series expansion of the deformed spherical harmonics through the orthogonal and complete spherical harmonics and find that the principal component decreases gradually and other components will increase as the potential parameter increases.

1. Introduction

Since the ring-shaped noncentral potentials have potential applications in quantum chemistry and nuclear physics (e.g., they might describe the molecular structure of benzene and interaction between the deformed nucleuses), it is not surprising that their relevant investigations have attracted much attention [120]. Based on a previous study, we have known that this type of ring-shaped noncentral potential can be solved in spherical coordinates and also the Hamiltonian system with the hidden symmetry makes the bound state energy levels possess an “accidental” degeneracy, which arises from the SU() invariance of the Schrödinger Hamiltonian [1]. Generally speaking, the most popular ring-shaped noncentral potentials are identified as the Coulomb or harmonic oscillator plus the ring-shaped part . In this work, we are concerned with only the single ring-shaped Coulomb potential in the limited space.

Many authors have obtained the radial and polar angular differential equations and also got their solutions in recent studies [7, 8, 13, 14, 21], but the whole space probability distributions of the moving particle in the single ring-shaped noncentral fields have never been reported due to the difficult computational skill that is required in the programming. The main contributions mentioned above are concerned either with the radial part in the spherical shell or with the angular parts in volume angle [22, 23]. This means that these studies are only related to one or two of three variables . To illustrate comprehensively the space probability distribution of the moving particle confined in the ring-shaped noncentral Coulomb potential, the aim of this work is to realize their two-dimensional (contour) and three-dimensional (isosurface) visualizations by considering all variables. Such studies have never been done to the best of our knowledge.

The rest of this work is organized as follows. In Section 2, we first present the solutions of the studied quantum system and give the concrete expressions of the angular wave functions in order to perform a comparison with the usual spherical harmonics and also show their distinct properties. In Section 3, we make use of the calculation formula of the space probability distribution to illustrate the visualizations of various cases for different choices of the parameters by overcoming the calculation skills in MATLAB program. In Section 4, we discuss the variation of the space probability distribution with the number of radial nodes and the variations with the relative probability value and those with the negative and positive ring-shaped Coulomb potential parameter . The expansion coefficients of the deformed spherical harmonics are calculated in Section 5. Some concluding remarks are given in Section 6.

2. Exact Solutions to Single Ring-Shaped Coulomb Potential

The single ring-shaped Coulomb potential is given byand the Schrödinger equation is written asTake the wave function of the following form: where . Substitute (3) into (2) and get the respective radial and angular differential equations asTake a new variable transform ; hence, (4a) becomes Its solutions were given by the universal associated Legendre polynomials [22]:whereFor , notice that the differential equation (5) keeps invariant if is replaced by , and thus we know that is also the solution of (5) and its definition is given by [24, 25]

On the other hand, in terms of the spherical harmonics [26, 27],We can define deformed spherical harmonics with the following property: Obviously, is equal to when , and (8), (10), and (11) will reduce to the results in the central field. It is worth pointing out that all states are for a certain value l, but states are 2 (), or 1 (). This arises from the fact that the ring-shaped potential reduces the symmetry of the system and the degeneracy.

In Table 1, we list the analytical expressions of some given deformed spherical harmonics in the special cases of potential parameter and .

Now, let us consider the radial differential equation. Substitute into (4b) and take , , and ; then, (4b) can be rewritten asIts solutions are nothing but the Coulomb case [28]; that is,where , , and is the Bohr radius. Thus, the wave function in the whole space is written as

3. Isosurface and Contour Visualizations of Space Probability Distributions

It is well known that the space probability distributions for a moving particle at the position can be calculated by Obviously, this formula is independent of the azimuth angle and thus symmetric with respect to the -axis. In order to display the space probability distribution, we will transform (15) from original spherical coordinates to the popular Cartesian coordinates through the coordinate transformations and and then obtain the corresponding space probability distribution .

For a given and definite space, we take a series of discrete positions and calculate their respective probability distribution values to realize their numerical calculations. To improve the graphic resolution, we take concrete positions in the whole space () and calculate the density block, say , which is composed of all values for all positions. In this work, we take . For given quasi-quantum numbers , we realize their isosurface (three-dimensional) and contour (two-dimensional) visualizations of the space probability distributions for different states by using MATLAB program (see Tables 2 and 3).

4. Discussions

4.1. Variation of Space Probability Distribution with respect to the Numbers of Radial Nodes

In Table 2, we display the space probability distributions for three different cases: corresponding to the Coulomb potential and and corresponding to ring-shaped potentials. The unit in axis is taken as the Bohr radial . To clearly visualize the internal structure of the graphics, we generate a section plane without considering those numerical values in the regions , , and .

It is found that the graphics become compressed; that is, the space probability distributions elongate along with the - and -axis and also the hole formed in the ring-shaped potentials expands towards the outside as the ring-shaped potential parameter increases. This can be well understood by the relations given in (7). We know that the value of the quasi-quantum number increases relatively for a given quantum number . When , the isosurface of the density distribution is spherical, but for the case , its isosurface is circularly ring-shaped.

In Table 3, the space probability distribution is projected to plane yoz and is shown to be symmetric with respect to the - and -axis. Here, we only plot the graphics in the first quadrant through magnifying proportionally the space probability and making it the maximum value to be 100, while the interval is taken as 10. There exists a corresponding balance among the density distributions in axis directions , , and since the sum of density distributions is equal to unit according to the normalization condition.

4.2. Variation of the Space Probability Distributions with respect to Different Relative Probability Values

In order to display the isosurface of the space probability distributions for different chosen relative probability values , we take the quantum numbers as a typical example in Table 4. We find that, for smaller , the particle is distributed to almost all position spaces, but for larger we notice that the particle moves towards the two poles of the -axis.

4.3. Variations of the Space Probability Distribution with respect to Different Potential Parameters

For fixed quantum numbers and , it is known from (7) that the quasi-quantum number becomes larger with increasing and thus leads to the increment of the quasi-quantum number . In Table 5, we plot the space probability distributions of the quantum state for the case . Due to the change of quasi-quantum number which arises from the potential parameter , the number of radial nodes is changed accordingly. This leads to the extensions of the space probability distributions along with the - and -axis when the parameter increases.

In Table 6, we give the comparison between the special cases for and . Obviously, we find that the space probability distributions for the negative in comparison with the special case are shrunk towards the origin of the graphics. On the contrary, those for the positive case are enlarged towards the outside. This kind of phenomenon can be understood well from analyzing the contributions of the potential parameter to the Coulomb part. The original attractive Coulomb potential becoming bigger or smaller relatively depends on the choice of the negative or positive . As a result, the attractive force acting on the moving particle becomes larger or smaller. Naturally, this causes the space probability distributions to be shrunk or extended.

5. Expansion Coefficients of the Deformed Spherical Harmonics

Since the spherical harmonics (9) are orthogonal and complete, then the deformed spherical harmonics (10) can be expanded by the usual spherical harmonics; that is,where the expansion coefficients can be calculated byIn Figure 1, we plot the variation of the expansion coefficients with different parameters where we take , , and . For , according to the orthogonal normalization condition in the direction, each value of is zero. For , each value of is also equal to zero for the case of odd value . Thus, in Figure 1, we only present the case of even value for . Notice that is always the biggest, but the principal component decreases gradually, and other components will increase as the parameter increases.

6. Concluding Remarks

In this work, we first presented the exact solutions to the single ring-shaped Coulomb potential and then realized the visualization of the space probability distributions for a moving particle within the framework of this potential. We have illustrated the two-dimensional (contour) and three-dimensional (isosurface) visualizations for some given quasi-quantum numbers by taking different ring-shaped potential parameters . We have found that the space probability distributions of the moving particle in the cases of and are spherical and circularly ring-shaped, respectively. Moreover, we have studied the features of the relative values of the space probability distributions. As an illustration, we have discussed the special case, that is, the quantum numbers , and noticed that the space probability distributions for the moving particle will move towards the two poles of the -axis as the relative values increase. We have also studied the series expansion of the deformed spherical harmonics by using the orthogonal and complete spherical harmonics and found that the principal component decreases gradually and other components will increase as the potential parameter increases.

Conflicts of Interest

The authors declare that there are no conflicts of interest regarding the publication of this paper.

Acknowledgments

This work is supported by the National Natural Science Foundation of China under Grant no. 11275165 and partially by 20170938-SIP-IPN, Mexico. Professor Yuan You also acknowledges Jiangsu Overseas Research & Training Program for University Prominent Young & Middle-Aged Teachers and Presidents for the support.