Differantial Equations of Motion Objects with an Almost Paracontact Metric Structure

Oguzhan Celik, Zeki Kasap


The geometry of almost paracontact manifolds is a natural extension in the odd dimensional case of almost Hermitian geometry. In additional, the paracontact geometry as symplectic geometry has large and comprehensive applications in physics, geometrical optics, classical mechanics, thermodynamics, geometric quantization, differential geometry and applied mathematics. the Euler-Lagrange differential equations one of the common ways of solving problems in classical and analytical mechanics. In the study, we consider Euler-Lagrange differential equations with almost paracontact metric structure for motion objects. Also, implicit solutions of the differential equations found in this study will be solved by Maple computation program and a graphic example will be drawn.

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