loading page

Mathematical Fundamentals of Spherical Kinematics of Plate Tectonics in Terms of Quaternions dedicated to Xavier Le Pichon on the occasion of the 50th anniversary of publication of “Plate Tectonics” (1973) with Jean Francheteau and Jean Bonnin
  • Helmut Schaeben,
  • Uwe Kroner,
  • Tobias Stephan
Helmut Schaeben
TU Bergakademie Freiberg

Corresponding Author:[email protected]

Author Profile
Uwe Kroner
TU Bergakademie Freiberg
Author Profile
Tobias Stephan
University of Calgary Department of Geoscience
Author Profile

Abstract

To be a quantitative and testable tectonic model, plate tectonics requires spherical geometry and spherical kinematics in terms of finite rotations conveniently parametrized by their angle and axis and described by unit quaternions. In treatises on ’Plate Tectonics’ infinitesimal, instantaneous, and finite rotations, absolute and relative rotations are said to be applied to model the motion of tectonic plates. Even though these terms are strictly defined in mathematics, they are often casually used in geosciences. Here their definitions are recalled and clarified as well as the terms rotation, orientation, and location on the sphere. For instance, infinitesimal rotations refer to a mathematical limit, when the angle of rotation converges to zero. Their rules do not apply to finite rotations, no matter how small their finite angles of rotation are. Mathematical approaches applying appropriate and feasible assumptions to model spherical motion of tectonic plates over geological times of hundreds of millions of years are derived including (i) sequences of incremental finite rotations, (ii) sequences of accumulating successive concatenations of finite rotations, (iii) continuous rotations in terms of fully transient quaternions. The incremental and the accumulating approach provide complementary views. While the relative Euler pole appears to migrate in the latter, it appears fixed in the former. Path, mean and instantaneous velocity of the migrating Euler pole are derived as well as the angular and trajectoral velocity of the rotational motion about it. The approaches are illustrated by a geological example with actual data and a numerical yet geologically inspired example with artificial data. The former revisits the three plates scenario with stationary axes of two “absolute” rotations implying transient “relative” rotations about a migrating Euler pole and employs a proper plate circuit argument to determine them numerically without resuming to approximations. The latter applies an involved interplay of incremental and accumulating modeling inducing split-join cycles to approximate sinusoidal trajectories as reported to record plates’ motion during the Gondwana breakup.
13 Apr 2023Submitted to Mathematical Methods in the Applied Sciences
13 Apr 2023Submission Checks Completed
13 Apr 2023Assigned to Editor
14 Apr 2023Review(s) Completed, Editorial Evaluation Pending
15 Apr 2023Reviewer(s) Assigned
15 Aug 2023Editorial Decision: Revise Minor
01 Sep 20231st Revision Received
05 Sep 2023Submission Checks Completed
05 Sep 2023Assigned to Editor
05 Sep 2023Review(s) Completed, Editorial Evaluation Pending
05 Sep 2023Reviewer(s) Assigned
15 Nov 2023Editorial Decision: Accept