M. B. Sedra scite author profile

Methods developed for the analysis of integrable systems are used to study the problem of hyper-Kähler metrics building as formulated in D=2, N=4 supersymmetric harmonic superspace. We show in particular that the constraint equation [Formula: see text] and its Toda-like generalizations are integrable. Explicit solutions together with the conserved currents generating the symmetry responsible for the integrability of these equations are given. Other features are also discussed.

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Spin-one (1 + 3)-dimensional DKP equation with modified Kratzer potential in the non-commutative space

Saidi

Sedra

2019

Mod. Phys. Lett. A

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In this paper, the spin-one Duffin–Kemmer–Petiau equation in (1 + 3) dimensions with a modified Kratzer potential is considered in the non-commutative space framework. The energy eigenvalue equation and the corresponding eigenfunctions are derived analytically. Furthermore, the energy shift due to the space non-commutativity effect is also obtained using the perturbation theory. In particular, it is shown that the degeneracy of the initial spectral line is broken, where the space non-commutativity plays the role of a magnetic field. This behavior is very similar to the Zeeman effect.

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M. B. Sedra

On Heat Properties of AdS Black Holes in Higher Dimensions

Hyper-Kähler Metrics Building and Integrable Models

Spin-one (1 + 3)-dimensional DKP equation with modified Kratzer potential in the non-commutative space

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