A New Moving Frame for Trajectories with Non-Vanishing Angular Momentum

Authors : Kahraman Esen ÖZEN, Murat TOSUN
Pages : 7-18
Doi:10.33187/jmsm.869698
View : 27 | Download : 10
Publication Date : 2021-04-30
Article Type : Research Paper
Abstract :The theory of curves has a very long history. Moving frames defined on curves are important parts of this theory. They have never lost their importance. A point particle of constant mass moving along a trajectory in space may be seen as a point of the trajectory. Therefore, there is a very close relationship between the differential geometry of the trajectory and the kinematics of the particle moving on it. One of the most important elements of the particle kinematics is the jerk vector of the moving particle. Recently, a new resolution of the jerk vector, along the tangential direction and two special radial directions, has been presented by \`Ozen et al. insert ignore into journalissuearticles values(JTAM 57insert ignore into journalissuearticles values(2);insert ignore into journalissuearticles values(2019););. By means of these two special radial directions, we introduce a new moving frame for the trajectory of a moving particle with non vanishing angular momentum in this study. Then, according to this frame, some characterizations for the trajectory to be a rectifying curve, an osculating curve, a normal curve, a planar curve and a general helix are given. Also, slant helical trajectories are defined with respect to this frame. Afterwards, the necessary and sufficient conditions for the trajectory to be a slant helical trajectory insert ignore into journalissuearticles values(according to this frame); are obtained and some special cases of these trajectories are investigated. Moreover, we provide an illustrative numerical example to explain how this frame is constructed. This frame is a new contribution to the field and it may be useful in some specific applications of differential geometry, kinematics and robotics in the future.
Keywords : Kinematics of a particle, Plane and space curves, Moving frame, Angular momentum, Slant helices

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