1. Introduction

So-called deformed spheres with deformation parameter $\lambda <1/3$ were introduced in [1] as an alternative to spheroids (ellipsoids of revolution) in a dynamical context for the easy description of geodesics on these surfaces. It turns out that they can also serve as an alternative for the actual shape of the Earth that is defined through the geoid (the equipotential surface that has the same sum of gravitational and centrifugal potential energies which would coincide with the mean sea level over the oceans if only gravity and rotational acceleration were at work [2]).

The main difference between the proposed new reference model for the geoid and the traditional ellipsoidal one is that the geodesics on the $\lambda$-spheres are expressed through well-known analytical functions (see, e.g., [3]), whereas the geodesics on the rotational ellipsoids are described through the complete set of the incomplete elliptic integrals (see, e.g., [4]). In the present article, we show that the same is true for the calculation of azimuths and arc lengths for the loxodromes (or rhumb lines) on the $\lambda$-spheres. From the other side, for the $\lambda$-spheres, the incomplete elliptic integrals (of all three kinds) will only appear when we must embed these surfaces (or the corresponding solutions for geodesics or loxodromes on them) into the three-dimensional Euclidean space (see Section 2 for details).

The above-described features of the newly proposed reference model for the geoid simplify all the calculations that have to be done in local coordinates in geodesy and navigation (see Section 3 and Section 4), even though the geometrical definition of the $\lambda$-spheres is more complicated in comparison to the rotational ellipsoids. Finally, in Section 5, we have compared the results obtained with the use of the newly proposed reference model for the geoid with the corresponding results for the ellipsoidal (WGS 84 [5]) reference model, which is used currently and is the simplest possible spherical one [6].

2. Geometrical Description of $\mathbf{\lambda }$-Spheres

Let us consider a deformed sphere with a deformation parameter $\lambda \in \left(0,1/3\right)$ (the case when $\lambda =0$ corresponds to the usual, non-deformed sphere). The chosen range of the deformation parameter ensures that the Gaussian curvature K for $\lambda$-spheres under consideration is strictly positive, and simultaneously the shape of the corresponding surface of revolution is oblate (i.e., it is slightly flattened in the direction of its axis of symmetry, as it should be for the reference model for the geoid describing the actual shape of the Earth). Then, the parametrization of the $\lambda$-sphere’s surface, which is embedded into the three-dimensional Euclidean space, can be written as [3,7]

(1)$x\left(u,v\right)=\kappa rucosv,y\left(u,v\right)=\kappa rusinv,z_{\pm }\left(u\right)=\pm \frac{\kappa }{\sqrt{\lambda k}}\left(\left(k-1\right)F\left(\theta ,k\right)+E\left(\theta ,k\right)-\lambda k\mathsf{\Pi }\left(\left(1-\lambda \right)k,\theta ,k\right)\right),$

(2)$F\left(\theta ,k\right)={\int }_0^{\theta }\frac{\mathrm{d}\vartheta }{\sqrt{1-k^2{sin}^2\vartheta }},E\left(\theta ,k\right)={\int }_0^{\theta }\sqrt{1-k^2{sin}^2\vartheta }\mathrm{d}\vartheta ,\mathsf{\Pi }\left(n,\theta ,k\right)={\int }_0^{\theta }\frac{\mathrm{d}\vartheta }{(1-n{sin}^2\vartheta )\sqrt{1-k^2{sin}^2\vartheta }}·$

(3)$\theta =arcsin\sqrt{\frac{\lambda \left(1-u^2\right)}{\left(1-\lambda \right)k}},k=\sqrt{\frac{1+r^2-\sqrt{\left(r^2-1\right)\left(r^2+3\right)}}{1+r^2+\sqrt{\left(r^2-1\right)\left(r^2+3\right)}}},n=\left(1-\lambda \right)k.$

(4)$\mathrm{d}{s}^2={\kappa }^2{r}^2\left(\frac{\mathrm{d}{u}^2}{{\beta }^2\left(u\right)}+u^2\mathrm{d}{v}^2\right)={\kappa }^2{r}^2{u}^2\left(\mathrm{d}{q}^2+\mathrm{d}{v}^2\right),\mathrm{d}q=\frac{\mathrm{d}u}{\beta \left(u\right)u},$

(5)$q_{\pm }\left(u\right)=\pm \mathrm{arctanh}\left(\sqrt{1-u^2}\right)\mp \sqrt{\lambda }\mathrm{arctanh}\left(\sqrt{\lambda }\sqrt{1-u^2}\right)\in \left(-\infty ,\infty \right).$

Apart from the isometric latitude $q\left(u_P\right)$ defined by (5), we can also introduce the geocentric latitude ${\psi }_P$ (i.e., the angle between the radius-vector to the point $P\left(u_P,v_P\right)$ and the equatorial plane) for the $\lambda$-sphere’s reference model for the geoid. It is expressed through the incomplete elliptic integrals of the first, second, and third kind, i.e.,

(6)${\psi }_P=arctan\frac{z\left(u_P\right)}{\kappa r{u}_p}$

(7)${\varphi }_P=-arctan\frac{\kappa r}{z^{\prime }\left(u_P\right)},$

(8)$z^{\prime }\left(u\right)=-\frac{\kappa ru}{\sqrt{1-u^2}}\frac{\sqrt{k}}{\sqrt{\left(1-\lambda \right)k-\lambda \left(1-u^2\right)}}\frac{{\left(1-\lambda -\lambda \left(1-u^2\right)\right)}^2-{\lambda }^2\left(1-u^2\right)}{\left(1-\lambda \left(1-u^2\right)\right)\sqrt{1-\lambda -\lambda k\left(1-u^2\right)}}·$

Therefore, when the geodetic latitude ${\varphi }_P$ is known, to find the corresponding local latitude $u_P$ on the $\lambda$-sphere’s reference model for the geoid, we need only to solve the algebraic equation

(9)$F\left(u\right)=z^{\prime }\left(u\right)+\frac{\kappa r}{tan{\varphi }_P}=0$

3. Loxodromes (Rhumb Lines) on $\mathit{\lambda }$-Spheres

Although the loxodromes and rhumb lines are basically synonyms (loxodrome is a Latin word for rhumb), in the literature they are mainly used in different contexts, i.e., loxodrome describes a geometrical curve on the corresponding surface of revolution that intersects all the meridians at the same angle, whereas rhumb describes a practically realized course on the Earth of constant bearing (see, e.g., [9]). Although such a course of constant bearing is not generally the shortest route between two points on the Earth (see, e.g., Figure 3 (right), where the loxodrome connecting two points on the $\lambda$-sphere is compared to the corresponding geodesic), it is extremely easy to realize during the navigation, even for the beginner sailors or airplane pilots.

Relying on the metric specified in (4), the differential equation defining the loxodromes can be written in the form (see, e.g., [10,11])

(10)$\mathrm{d}v=tan\alpha \mathrm{d}q,$

(11)${\alpha }_{12}=arctan\frac{v_2-v_1}{q_2-q_1}·$

(12)$\mathrm{d}m=\kappa ru\mathrm{d}q=\frac{\kappa r}{\beta \left(u\right)}\mathrm{d}u.$

(13)$s\left(\alpha ,u_i\right)=\frac{m\left(u_i\right)}{cos\alpha }=\frac{\kappa r}{cos\alpha }\underset{u_i}{\overset{1}{\int }}\frac{\mathrm{d}u}{\beta \left(u\right)}=\frac{\kappa }{cos\alpha }\left(\frac{\pi }{2}-arctan\frac{r{u}_i}{\sqrt{1-u_i^2}}\right).$

Finally, for any two points with the local latitudes $u_1$ and $u_2$ (or equivalently, the isometric latitudes $q_1$ and $q_2$) in the same hemisphere (Northern or Southern) and longitudes $v_1$ and $v_2$, the distance $s_{12}$ along the loxodrome with the azimuth ${\alpha }_{12}$ given by (11) is expressed as

(14)$s_{12}=s\left({\alpha }_{12},u_2\right)-s\left({\alpha }_{12},u_1\right)=\frac{m\left(u_2\right)-m\left(u_1\right)}{cos{\alpha }_{12}}=\frac{\kappa }{cos{\alpha }_{12}}\left(arctan\frac{r{u}_1}{\sqrt{1-u_1^2}}-arctan\frac{r{u}_2}{\sqrt{1-u_2^2}}\right).$

(15)$s_{12}=s\left({\alpha }_{12},u_1\right)+s\left({\alpha }_{12},u_2\right)=\frac{m\left(u_1\right)+m\left(u_2\right)}{cos{\alpha }_{12}}=\frac{\kappa }{cos{\alpha }_{12}}\left(\pi -arctan\frac{r{u}_1}{\sqrt{1-u_1^2}}-arctan\frac{r{u}_2}{\sqrt{1-u_2^2}}\right).$

4. Direct and Inverse Problems for Loxodromes on $\mathit{\lambda }$-Spheres

The direct geodetic problem is defined as follows (cf., e.g., [6,13]). Given the latitude $u_1$ and the longitude $v_1$ of the starting point $P_1$ on the $\lambda$-sphere, the azimuth ${\alpha }_{12}$ of the loxodrome passing through $P_1$, and the arc length $s_{12}$ along it, we need to find out the latitude $u_2$ and the longitude $v_2$ of the destination point $P_2$ as well as the reverse azimuth ${\alpha }_{21}$.

To solve this problem we need to perform the following computational steps (for illustration purposes, let us suppose that the point $P_1$ is taken from the Northern Hemisphere, i.e., the isometric latitude $q\left(u_1\right)\ge 0$, the azimuth ${\alpha }_{12}\in \left[-\pi /2,\pi /2\right]$, and the meridional distance between the points $P_1$ and $P_2$ is such that $s_{12}cos{\alpha }_{12}+m\left(u_1\right)\le \pi /2$):

• (1). Using (13) we can obtain the meridional distance from the starting point $P_1\left(u_1,v_1\right)$ to the Equator, i.e.,

  (16)$m\left(u_1\right)=\kappa \left(\frac{\pi }{2}-arctan\frac{r{u}_1}{\sqrt{1-u_1^2}}\right).$

• (2). Relying on (14), we can obtain the meridional distance from the ending point $P_2\left(u_2,v_2\right)$ to the Equator, i.e.,

  (17)$m\left(u_2\right)=s_{12}cos{\alpha }_{12}+m\left(u_1\right)=s_{12}cos{\alpha }_{12}+\kappa \left(\frac{\pi }{2}-arctan\frac{r{u}_1}{\sqrt{1-u_1^2}}\right).$

• (3). By solving (13) with respect to the local latitude $u_2$ of the ending point $P_2$, we obtain that

  (18)$u_2=\frac{tan\delta }{\sqrt{r^2+{tan}^2\delta }},\delta =\frac{\pi }{2}-\frac{m\left(u_2\right)}{\kappa }=arctan\frac{r{u}_1}{\sqrt{1-u_1^2}}-\frac{s_{12}cos{\alpha }_{12}}{\kappa }·$

• (4). Then, by means of Equations (5) and (18), we can find the difference between the isometric latitudes of the ending and starting points, i.e.,

  (19)$q\left(u_2\right)-q\left(u_1\right)=\mathrm{arctanh}\left(\sqrt{1-u_2^2}\right)-\mathrm{arctanh}\left(\sqrt{1-u_1^2}\right)-\sqrt{\lambda }\left(\mathrm{arctanh}\left(\sqrt{\lambda }\sqrt{1-u_2^2}\right)-\mathrm{arctanh}\left(\sqrt{\lambda }\sqrt{1-u_1^2}\right)\right).$

• (5). Next, using Equation (11), we can obtain the local longitude $v_2$ of the destination point $P_2$, i.e.,

  (20)$v_2=v_1+tan\left({\alpha }_{12}\left(q\left(u_2\right)-q\left(u_1\right)\right)\right)=v_1+\frac{tan\left({\alpha }_{12}q\left(u_2\right)\right)-tan\left({\alpha }_{12}q\left(u_1\right)\right)}{1+tan\left({\alpha }_{12}q\left(u_1\right)\right)tan\left({\alpha }_{12}q\left(u_2\right)\right)}·$

• (6). Finally, the reverse azimuth ${\alpha }_{21}$ is given as

  (21)${\alpha }_{21}={\alpha }_{12}\pm \pi .$

Analogously, the inverse problem is defined as follows. Given the latitudes $u_1$, $u_2$ and the longitudes $v_1$, $v_2$ of the starting and ending points $P_1$, $P_2$ on the $\lambda$-sphere, we need to find out the azimuth ${\alpha }_{12}$ of the shortest loxodrome that connects these two points, the arc length $s_{12}$ along it as well as the reverse azimuth ${\alpha }_{21}$ (see, e.g., Figure 3 (right) for the exemplary solution of the inverse problem for loxodromes on the $\lambda$-sphere in comparison to the corresponding geodesic).

To solve the inverse problem, we need to perform the following computational steps (the same assumptions):

• (1). Using Equation (5), we obtain the difference between the isometric latitudes of the destination and starting points, i.e.,

  (22)$q\left(u_2\right)-q\left(u_1\right)=\mathrm{arctanh}\left(\sqrt{1-u_2^2}\right)-\mathrm{arctanh}\left(\sqrt{1-u_1^2}\right)-\sqrt{\lambda }\left(\mathrm{arctanh}\left(\sqrt{\lambda }\sqrt{1-u_2^2}\right)-\mathrm{arctanh}\left(\sqrt{\lambda }\sqrt{1-u_1^2}\right)\right).$

• (2). Using Equations (11) and (14), we obtain the azimuth ${\alpha }_{12}$ and the arc length $s_{12}$ of the loxodrome connecting the points $P_1$ and $P_2$, i.e.,

  (23)${\alpha }_{12}=arctan\frac{v_2-v_1}{q\left(u_2\right)-q\left(u_1\right)},s_{12}=\frac{\kappa }{cos{\alpha }_{12}}\left(arctan\frac{r{u}_1}{\sqrt{1-u_1^2}}-arctan\frac{r{u}_2}{\sqrt{1-u_2^2}}\right).$

• (3). As before, the reverse azimuth ${\alpha }_{21}$ is given by the formula

  (24)${\alpha }_{21}={\alpha }_{12}\pm \pi .$

Let us also note that inverse problems are generally considered more difficult because they start with the results (observations) and then calculate the causes that produced those results (observations), in contrast to the direct problems that start with the causes and then calculate the results (observations) using some models. We can distinguish two main reasons for the above-mentioned difficulties: (1) non-uniqueness, i.e., different causes (values of the model parameters) may be consistent with the observations, (2) lack of stability, i.e., small noise or uncertainty in observations may be tremendously amplified in the calculated causes. This means that the second and/or third of three conditions for well-posed problems in mathematical modeling suggested by Jacques Hadamard (i.e., existence, uniqueness, and stability of the solution) are most often violated in the inverse problems (as in calculating images in X-ray computed tomography or reconstructing parameters in heat conduction models with fractional derivatives).

In the case considered in this paper, the solution of the inverse problem for loxodromes on $\lambda$-spheres given by the Formulas (22)–(24) is unique due to the fact that it is described through the one-to-one elementary functions arctan and $\mathrm{arctanh}$ (see, e.g., Figure 1). However, in the above formulas, we suppose that the input data are perfect (i.e., there is no noise or uncertainty in them), and further analysis of the stability of the obtained solution of the inverse problem can be performed, e.g., making some assumptions about the specific form of the noise (Gaussian, non-Gaussian, etc.).

5. Comparison with the Ellipsoidal and Spherical Reference Models

To compare our reference model for the geoid with the best ellipsoidal reference model for the current moment (i.e., WGS 84), we need to assess the possible value of the deformation parameter for the $\lambda$-sphere’s reference model. Elsewhere [3], we have obtained that the deformation parameter $\lambda$ should take values in the interval [$0.003335,0.003385$]. To further assess its value, let us use Formula (13) and calculate the quarter-meridian (the distance between the Equator and the North or South Pole) of the $\lambda$-sphere’s, i.e.,

(25)$m_p=s\left(\alpha =0,u=0\right)=\frac{\pi \kappa }{2}=\frac{\pi a}{2r}=\frac{\pi a}{2}\sqrt{1-\lambda },$

Therefore, relationship (25) provides us with a quite simple analytic formula for assessing the value of the deformation parameter for the $\lambda$-sphere’s reference model for the geoid based on the data for the ellipsoidal reference model WGS 84, i.e.,

(26)${\lambda }_{\mathrm{geoid}}=1-{\left(\frac{2m_p}{\pi a}\right)}^2=1-\frac{4}{{\pi }^2}{\left(\frac{10001965.729}{6378137.0}\right)}^2\approx 0.003348595\dots$

Next, using the above value of the deformation parameter ${\lambda }_{\mathrm{geoid}}$, we have solved the inverse problems for loxodromes (described in Section 4) to obtain the azimuths ${\alpha }_{12}$ and arc lengths $s_{12}$ given by (22) and (23) for several selected cities on important air routes on the Earth’s surface. Their geodetic longitudes v and latitudes $\varphi$ (that were taken from [6]) are presented in Table 1. Additionally, we have numerically solved relationship (9) to obtain the corresponding local latitudes u (see the last column in Table 1).

For the selected routes (presented in Table 2 and Table 3), we have calculated azimuths ${\alpha }_{\lambda }$ and arc lengths $s_{\lambda }$ connecting the chosen cities using the newly proposed $\lambda$-sphere’s reference model for the geoid. Next, we have compared them with the corresponding values obtained using the current best WGS 84 ellipsoidal reference model and the simplest possible spherical one (see [6]).

In Table 2 and Table 3, we have also added the columns that describe the differences $\delta {\alpha }_{\lambda -\mathrm{ell}}={\alpha }_{\lambda }-{\alpha }_{\mathrm{ell}}$ and $\delta s_{\lambda -\mathrm{ell}}=s_{\lambda }-s_{\mathrm{ell}}$ between the $\lambda$-sphere’s and WGS 84 ellipsoidal reference models. The largest (by absolute value) difference in azimuths $|\delta {\alpha }_{\lambda -\mathrm{ell}}|$ is equal to $0.{89}^{″}$ which corresponds to the route from New York to London, whereas the smallest (by absolute value) difference is equal to $0.{25}^{″}$ which corresponds to the route from Buenos Aires to Sydney. Similarly, the largest (by absolute value) difference in arc lengths $|\delta s_{\lambda -\mathrm{ell}}|$ is equal to $26.420$ m which corresponds to the route from London to Seattle (of the total length of about $8314.6$ km), whereas the smallest (by absolute value) difference is equal to $0.422$ m which corresponds to the route from Hong Kong to Taipei (of the total length of around $821.2$ km).

Let us end with an interesting observation: it appears that the smallest (by absolute values) differences in azimuths and arc lengths between the $\lambda$-spheres and WGS 84 ellipsoidal reference models are realized for the same routes as the smallest (by absolute values) differences in azimuths and arc lengths between the WGS 84 ellipsoidal and spherical reference models, i.e., $\delta {\alpha }_{\mathrm{ell}-\mathrm{sph}}={\alpha }_{\mathrm{ell}}-{\alpha }_{\mathrm{sph}}=4^{″}$ for the route from Buenos Aires to Sydney and $\delta s_{\mathrm{ell}-\mathrm{sph}}=s_{\mathrm{ell}}-s_{\mathrm{sph}}=718.621$ m ($0.09\%$) for the route from Hong Kong to Taipei (see [6]).

6. Conclusions

It is well known that spheres are among the most perfect forms in nature. The book by Hilbert and Cohn-Vossen [15] highlights the 11 properties that are responsible for the uniqueness of this shape. In geometrical terms, this can be spelled out by saying that spheres can be described by elementary functions and that this applies also to their geodesics. Nevertheless, when a small deviation from this form is taken to obtain spheroids (i.e., rotational ellipsoids), the new surfaces do not share these nice properties, since for the description of their geodesics (orthodromes), one needs to employ elliptic functions and elliptic integrals. On the other hand, the $\lambda$-spheres that are considered here can be viewed as mirror objects to ellipsoids of revolution in the sense that their extrinsic geometry is described by the elliptic functions and elliptic integrals, but their intrinsic geometry (geodesics) relies entirely on the elementary analytical functions. This is extremely important for navigation purposes, where the shape is clear in advance but parametric lines (e.g., geodesics or loxodromes) on the surface must be found and described in the easiest possible way. Hence, we really hope that the new reference model for the geoid presented here will receive due attention from the navigation community.

Apart from the above-described obvious application in geodesy and navigation areas, some applications are also possible in material science and engineering, e.g., for description of the twisting behavior of spindle-shaped polymer liquid crystalline microparticles (see, e.g., [16,17]). Those polymeric particles are considered to be candidates for designing artificial materials capable of emulating the complex twisting-based functionality observed in biological systems. Using geometrical modeling, the bulk-twisting structures in such polymer nematic systems can be approximated on general surfaces of revolution by twisted loxodromes whose twist angle is determined by the corresponding length-constraint condition. We expect that the use of $\lambda$-spheres with deformation parameter $\lambda <0$ (which corresponds to the spindle-like shapes) together with the description of the loxodromes on them presented in the current article will also be quite advantageous for the geometrical description of the above-mentioned chiral polymer nematics.

Publisher’s Note: MDPI stays neutral with regard to jurisdictional claims in published maps and institutional affiliations.

Enlarge this image.

Figure 1. Dependencies [Forumla omitted. See PDF.] given by (5) calculated for the Northern Hemisphere and [Forumla omitted. See PDF.] given by (13) with [Forumla omitted. See PDF.] and [Forumla omitted. See PDF.] calculated for the chosen values of the azimuth [Forumla omitted. See PDF.], i.e., [Forumla omitted. See PDF.] (blue line), [Forumla omitted. See PDF.] (green line), [Forumla omitted. See PDF.] (red line), and [Forumla omitted. See PDF.] (orange line).

Enlarge this image.

Figure 2. Dependency of [Forumla omitted. See PDF.] given by (8) with [Forumla omitted. See PDF.] and [Forumla omitted. See PDF.] = [Forumla omitted. See PDF.].

Enlarge this image.

Figure 3. Loxodromes (green lines) of the azimuths [Forumla omitted. See PDF.] (left), [Forumla omitted. See PDF.] (middle) on the [Forumla omitted. See PDF.]-sphere with the deformation parameter [Forumla omitted. See PDF.][Forumla omitted. See PDF.] together with the meridians (red lines) and the Equator (blue lines). On the right, the comparison between the loxodrome and geodesic solving the corresponding inverse problems is shown when [Forumla omitted. See PDF.], [Forumla omitted. See PDF.], [Forumla omitted. See PDF.], [Forumla omitted. See PDF.].

References

1. Faridi, A.M.; Schucking, E.L. Geodesics and deformed spheres. Proc. Am. Math. Soc.; 1987; 100, pp. 522-525. [DOI: https://dx.doi.org/10.1090/S0002-9939-1987-0891157-0]

2. Li, X.; Götze, H.-J. Ellipsoid, geoid, gravity, geodesy, and geophysics. Geophysics; 2001; 66, pp. 1660-1668. [DOI: https://dx.doi.org/10.1190/1.1487109]

3. Kovalchuk, V.; Mladenov, I.M. λ-spheres as a new refernce model for the geoid. Math. Methods Appl. Sci.; 2022; submitted

4. Karney, C.F.F. Geodesics on an ellipsoid of revolution. arXiv; 2011; arXiv: 1102.1215

5. National Geospatial-Intelligence Agency (NGA). World Geodetic System 1984. Its Definition and Relationships with Local Geodetic Systems; Standardization Document, NGA.STND.0036-1.0.0-WGS84; Department of Defence—Office of Geomatics: Springfield, VA, USA, 2014.

6. Meyer, T.H.; Rollins, C. The direct and indirect problem for loxodromes. J. Inst. Navig.; 2011; 58, pp. 1-6. [DOI: https://dx.doi.org/10.1002/j.2161-4296.2011.tb01787.x]

7. Kovalchuk, V.; Mladenov, I.M. Mechanics of incompressible test bodies moving on λ-spheres. Math. Methods Appl. Sci.; 2022; 45, pp. 5559-5572. [DOI: https://dx.doi.org/10.1002/mma.8126]

8. Gradstein, I.S.; Ryzhik, I.M. Tables of Integrals, Series, and Products; 7th ed. Jeffrey, A.; Zwillinger, D. Academic Press: Oxford, UK, 2007.

9. Alexander, J. Loxodromes: A rhumb way to go. Math. Mag.; 2004; 77, pp. 349-356. [DOI: https://dx.doi.org/10.1080/0025570X.2004.11953279]

10. Kos, S.; Vranić, D.; Zec, D. Differential equation of a loxodrome on a sphere. J. Navig.; 1999; 52, pp. 418-420. [DOI: https://dx.doi.org/10.1017/S0373463399008395]

11. Petrović, R.E. Differential equation of a loxodrome on the spheroid. Naše More; 2007; 54, pp. 87-89.

12. Erdös, P. Spiraling the Earth with C. G. J. Jacobi. Am. J. Phys.; 2000; 68, pp. 888-895. [DOI: https://dx.doi.org/10.1119/1.1285882]

13. Deakin, R.E. The loxodrome on an ellipsoid. Geometric Geodesy. Part B; Deakin, R.E.; Hunter, M.N. School of Mathematical and Geospatial Science, RMIT University: Melbourne, Australia, 2010; pp. 193-212.

14. Weintrit, A. So, what is actually the distance from the equator to the pole?—Overview of the meridian distance approximations. Int. J. Mar. Navig. Saf. Sea Transp.; 2013; 7, pp. 259-272. [DOI: https://dx.doi.org/10.12716/1001.07.02.14]

15. Hilbert, D.; Cohn-Vossen, S. Geometry and the Imagination; AMS, Chelsea: New York, NY, USA, 1952.

16. Ansell, H.S.; Kim, D.S.; Kamien, R.D.; Katifori, E.; Lopez-Leon, T. Threading the spindle: A geometrical study of chiral liquid crystal polymer microparticles. Phys. Rev. Lett.; 2019; 123, 157801. [DOI: https://dx.doi.org/10.1103/PhysRevLett.123.157801] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/31702311]

17. Ansell, H.S.; Kamien, R.D. Twisted loxodromes in spindle-shaped polymer nematics. Soft Matter; 2021; 17, pp. 7076-7085. [DOI: https://dx.doi.org/10.1039/D1SM00772F] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/34235531]