Geodesic equations and their numerical solution in Cartesian coordinates on a triaxial ellipsoid

IF 0.9 Q4 REMOTE SENSING
G. Panou, R. Korakitis
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引用次数: 9

Abstract

Abstract In this work, the geodesic equations and their numerical solution in Cartesian coordinates on an oblate spheroid, presented by Panou and Korakitis (2017), are generalized on a triaxial ellipsoid. A new exact analytical method and a new numerical method of converting Cartesian to ellipsoidal coordinates of a point on a triaxial ellipsoid are presented. An extensive test set for the coordinate conversion is used, in order to evaluate the performance of the two methods. The direct geodesic problem on a triaxial ellipsoid is described as an initial value problem and is solved numerically in Cartesian coordinates. The solution provides the Cartesian coordinates and the angle between the line of constant λ and the geodesic, at any point along the geodesic. Also, the Liouville constant is computed at any point along the geodesic, allowing to check the precision of the method. An extensive data set of geodesics is used, in order to demonstrate the validity of the numerical method for the geodesic problem. We conclude that a complete, stable and precise solution of the problem is accomplished.
三轴椭球上直角坐标系下的测地线方程及其数值解
本文将Panou和Korakitis(2017)提出的椭球面上的测地线方程及其在直角坐标系下的数值解推广到三轴椭球面上。提出了一种新的精确解析方法和一种新的将三轴椭球体上一点的笛卡尔坐标转换为椭球坐标的数值方法。为了评估这两种方法的性能,我们使用了一个广泛的坐标转换测试集。将三轴椭球体上的直接测地线问题描述为初值问题,并在直角坐标系下进行数值求解。该解提供了沿测地线任意点的笛卡尔坐标和常数λ线与测地线之间的夹角。此外,刘维尔常数沿测地线的任意点计算,允许检查方法的精度。为了证明数值方法对测地线问题的有效性,我们使用了大量的测地线数据集。得到了问题的完整、稳定和精确的解。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Journal of Geodetic Science
Journal of Geodetic Science REMOTE SENSING-
CiteScore
1.90
自引率
7.70%
发文量
3
审稿时长
14 weeks
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