Related papers: An analogue of the Pöschl-Teller anharmonic oscillator on an $N$-dimensional sphere

An analogue of the Pöschl-Teller anharmonic oscillator on an $N$-dimensional sphere

URL: http://arxiv.org/abs/2408.10860v1
Date: Tue, 20 Aug 2024 13:51:45 GMT
Title: An analogue of the Pöschl-Teller anharmonic oscillator on an $N$-dimensional sphere
Authors: Radosław Szmytkowski,
Abstract summary: A Schr"odinger particle on an $N$-dimensional ($Ngeqslant2$) hypersphere of radius $R$ is considered. The particle is subjected to the action of a force characterized by the potential $V(theta)=2momega_12R2tan2(theta/2)+2momega_22R2cot2(theta/2)$, where $0leqslantthetaleqslantpi$ is
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License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: A Schr\"odinger particle on an $N$-dimensional ($N\geqslant2$) hypersphere of radius $R$ is considered. The particle is subjected to the action of a force characterized by the potential $V(\theta)=2m\omega_{1}^{2}R^{2}\tan^{2}(\theta/2)+2m\omega_{2}^{2}R^{2}\cot^{2}(\theta/2)$, where $0\leqslant\theta\leqslant\pi$ is the hyperlatitude angular coordinate. In the general case when $\omega_{1}\neq\omega_{2}$, this is a model of a hyperspherical analogue of the P\"oschl-Teller anharmonic oscillator. Energy eigenvalues and normalized eigenfunctions for this system are found in closed analytical forms. For $N=2$, our results reproduce those obtained by Kazaryan et al. [Physica E 52 (2013) 122]. For $N\geqslant2$ arbitrary and for $\omega_{2}=0$, the results of Mardoyan and Petrosyan [J. Contemp. Phys. 48 (2013) 70] for their model of an isotropic hyperspherical harmonic oscillator are recovered. The Euclidean limit for the anharmonic oscillator in question is also discussed.

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