Open AccessSome Geometric Characterizations of -Curves Associated with a Plane Curve via Vector Fields
Author(s) -
Azeb Alghanemi,
Abeer AlGhawazi
Publication year - 2022
Publication title -
advances in mathematical physics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.283
H-Index - 23
eISSN - 1687-9139
pISSN - 1687-9120
DOI - 10.1155/2022/9881237
Subject(s) - plane curve , differential geometry of curves , frenet–serret formulas , mathematics , tangent , curvature , centripetal force , plane (geometry) , mathematical analysis , torsion of a curve , geometry , center of curvature , ordinary differential equation , physics , mean curvature , differential equation , classical mechanics , differential algebraic equation
The differential geometry of plane curves has many applications in physics especially in mechanics. The curvature of a plane curve plays a role in the centripetal acceleration and the centripetal force of a particle traversing a curved path in a plane. In this paper, we introduce the concept of the f -curves associated with a plane curve which are more general than the well-known curves such as involute, evolute, parallel, symmetry set, and midlocus. In fact, we introduce the f -curves associated with a plane curve via its normal and tangent for both the cases, a Frenet curve and a Legendre curve. Moreover, the curvature of an f -curve has been obtained in several approaches.
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