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Earth section paths. Solution to the inverse and direct problems, and waypoints without iterations

Abstract

The use of central elliptical sections in the calculation of air and sea routes and normal sections in Geodesy is common. Elliptic sections do not represent the shortest path between two points, although are often used in navigation to replace the geodesic lines. All developments include some kind of iteration to solve one of the problems, direct or inverse. When using vector algebra methods and perturbed series, the problems can be solved using an equidistant circle that represents the path of the elliptical section. This is possible because the flattening of the elliptical section is less than or equal to the Earth’s flattening, which implies that the series calculated for the terrestrial ellipsoid, used in the section, always converge. Three direct methods are described in order to calculate: the distance, the azimuth, the coordinates of a point and intermediate positions of an elliptical section. Those algorithms provide solutions to the inverse and direct algorithms with a consistency of the order of truncation error of double-type numbers.

Keyword : elliptical sections, routes, waypoints, great ellipse, direct formula, rectified angle, elliptic arc

How to Cite
Orihuela, S. (2022). Earth section paths. Solution to the inverse and direct problems, and waypoints without iterations. Geodesy and Cartography, 48(1), 1–10. https://doi.org/10.3846/gac.2022.13337
Published in Issue
Mar 24, 2022
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This work is licensed under a Creative Commons Attribution 4.0 International License.

References

Deakin, R. E. (2009). The normal section curve on an ellipsoid. http://www.mygeodesy.id.au/documents/Normal%20Section.pdf

Gilbertson, C. P. (2012). Earth section paths. Navigation, 59(1), 1–7. https://doi.org/10.1002/navi.2

Karney, C. (2013). Algorithms for geodesics. Journal of Geodesy, 87(1), 43–55. https://doi.org/10.1007/s00190-012-0578-z

Karney, C. F. F. (2017). Geographiclib v1.49. http://geographiclib.sf.net

Orihuela, S. (2013). Funciones de latitud. https://sites.google.com/site/geodesiafich/funciones_latitud.pdf

Sjöberg, L. E. (2012). Solutions to the direct and inverse navigation problems on the great ellipse. Journal of Geodetic Science, 2(3), 200–205. https://doi.org/10.2478/v10156-011-0040-9

Tseng, W. K., Guo, J. L., & Liu, C. P. (2013). A comparison of great circle, great ellipse, and geodesic sailing. Journal of Marine Science and Technology, 21(3), 287–299. https://doi.org/10.6119/JMST-012-0430-5