Abstract
In this paper, we give some geometric approach for magnetic curves according to quasi model in ordinary space. Firstly, we compute conformable derivatives of \(\Theta \left( {\textbf{t}}_{{\textbf{q}} }\right) ,\) \(\Theta \left( {\textbf{n}}_{{\textbf{q}}}\right) ,\) \(\Theta \left( {\textbf{b}}_{{\textbf{q}}}\right)\) Lorentz forces. Moreover, we present recursion and normalization operators of magnetic fields according to the quasi model. Then, we give conformable derivatives for these operators. Finally, we construct conformable F–W derivatives for these curves according to the quasi model in space.
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Körpinar, T., Körpinar, Z. & Özdemir, H. Optical quantum conformable derivatives of recursion according to quasi model. Opt Quant Electron 56, 253 (2024). https://doi.org/10.1007/s11082-023-05832-3
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DOI: https://doi.org/10.1007/s11082-023-05832-3