Browsing by Author "Rabei, Eqab. M."
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Article Citation Count: Al-Masaeed, Mohamed...et al. (2021). "Quantization of fractional harmonic oscillator using creation and annihilation operators", Open Physics, Vol. 19, No. 1, pp. 395-401.Quantization of fractional harmonic oscillator using creation and annihilation operators(2021) Al-Masaeed, Mohamed; Rabei, Eqab. M.; Al-Jamel, Ahmed; Baleanu, Dumitru; 56389In this article, the Hamiltonian for the conformable harmonic oscillator used in the previous study [Chung WS, Zare S, Hassanabadi H, Maghsoodi E. The effect of fractional calculus on the formation of quantum-mechanical operators. Math Method Appl Sci. 2020;43(11):6950-67.] is written in terms of fractional operators that we called α \alpha -creation and α \alpha -annihilation operators. It is found that these operators have the following influence on the energy states. For a given order α \alpha, the α \alpha -creation operator promotes the state while the α \alpha -annihilation operator demotes the state. The system is then quantized using these creation and annihilation operators and the energy eigenvalues and eigenfunctions are obtained. The eigenfunctions are expressed in terms of the conformable Hermite functions. The results for the traditional quantum harmonic oscillator are found to be recovered by setting α = 1 \alpha =1.Article Citation Count: Al-Jamel, Ahmed...et.al. (2022). "The effect of deformation of special relativity by conformable derivative", Revista Mexicana de Fisica, Vol.68, No.5, pp.1-9.The effect of deformation of special relativity by conformable derivative(2022) Al-Jamel, Ahmed; Al-Masaeed, Mohamed; Rabei, Eqab. M.; Baleanu, Dumitru; 56389In this paper, the deformation of special relativity within the frame of conformable derivative is formulated. Within this context, the two postulates of the theory are re-stated. Then, the addition of velocity laws are derived and used to verify the constancy of the speed of light. The invariance principle of the laws of physics is demonstrated for some typical illustrative examples, namely, the conformable wave equation, the conformable Schrodinger equation, the conformable Klein-Gordon equation, and conformable Dirac equation. The current formalism may be applicable when using special relativity in a nonlinear or dispersive medium.