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On geometric interpretations of split quaternions

İskender Öztürk, Mustafa Özdemir

2022Mathematical Methods in the Applied Sciences13 citationsDOI

Abstract

Quaternions are an important tool that provides a convenient and effective mathematical method for representing reflections and rotations in three‐dimensional space. A unit timelike split quaternion represents a rotation in the Lorentzian space. In this paper, we give some geometric interpretations of split quaternions for lines and planes in the Minkowski 3‐space with the help of mutual pseudo orthogonal planes. We classified mutual planes with respect to the casual character of the normals of the plane as follows; if the normal is timelike, then the mutual plane is isomorphic to the complex plane; if the normal is spacelike, then the plane is isomorphic to the hyperbolic number plane (Lorentzian plane); if the normal is lightlike, then the plane is isomorphic to the dual number plane (Galilean plane).

Topics & Concepts

QuaternionMathematicsPlane (geometry)Minkowski spaceDual quaternionRotation (mathematics)Upper half-planeMathematical analysisGeometryPure mathematicsAlgebraic and Geometric AnalysisAdvanced Differential Geometry ResearchMathematics and Applications
On geometric interpretations of split quaternions | Litcius