A Regularized $(XP)^2$ Model
- URL: http://arxiv.org/abs/2308.11648v2
- Date: Tue, 6 Feb 2024 06:57:16 GMT
- Title: A Regularized $(XP)^2$ Model
- Authors: Yu-Qi Chen and Zhao-Feng Ge
- Abstract summary: We investigate a dynamic model described by the classical Hamiltonian $H(x,p)=(x2+a2)(p2+a2)$, where $a2>0$, in classical, semi-classical, and quantum mechanics.
We present three different forms of quantized Hamiltonians, and reformulate them into the standard Schr" odinger equation with $cosh 2x$-like potentials.
- Score: 0.5729101515196013
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: We investigate a dynamic model described by the classical Hamiltonian
$H(x,p)=(x^2+a^2)(p^2+a^2)$, where $a^2>0$, in classical, semi-classical, and
quantum mechanics. In the high-energy $E$ limit, the phase path resembles that
of the $(XP)^2$ model. However, the non-zero value of $a$ acts as a regulator,
removing the singularities that appear in the region where $x, p \sim 0$,
resulting in a discrete spectrum characterized by a logarithmic increase in
state density. Classical solutions are described by elliptic functions, with
the period being determined by elliptic integrals. In semi-classical
approximation, we speculate that the asymptotic Riemann-Siegel formula may be
interpreted as summing over contributions from multiply phase paths. We present
three different forms of quantized Hamiltonians, and reformulate them into the
standard Schr\" odinger equation with $\cosh 2x$-like potentials. Numerical
evaluations of the spectra for these forms are carried out and reveal minor
differences in energy levels. Among them, one interesting form possesses
Hamiltonian in the Schr\" odinger equation that is identical to its classical
version. In such scenarios, the eigenvalue equations can be expressed as the
vanishing of the Mathieu functions' value at $i\infty$ points, and furthermore,
the Mathieu functions can be represented as the wave functions.
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