1996
DOI: 10.1088/0953-8984/8/42/005
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Exact solutions of two electrons in a quantum dot

Abstract: Making use of the expansion in a power series, the exact eigensolutions of two electrons in a parabolic quantum dot are obtained. The quantum-size effects on the energy spectra of two electrons are shown for the first time.

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Cited by 39 publications
(29 citation statements)
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“…For the circular symmetry, the problem of relative motion becomes separable in polar coordinates. Although a closedform solution for the eigenfunctions was obtained with the aid of power series methods [336], the exact energies were calculated numerically. The separability in the case of ω x : ω y = 2 [337] provided a basis for algebraic solutions for certain values of ω x [338].…”
Section: Two-electron Quantum Dot: a New Paradigm In Mesoscopic Physicsmentioning
confidence: 99%
“…For the circular symmetry, the problem of relative motion becomes separable in polar coordinates. Although a closedform solution for the eigenfunctions was obtained with the aid of power series methods [336], the exact energies were calculated numerically. The separability in the case of ω x : ω y = 2 [337] provided a basis for algebraic solutions for certain values of ω x [338].…”
Section: Two-electron Quantum Dot: a New Paradigm In Mesoscopic Physicsmentioning
confidence: 99%
“…For general values of this quantity a numerical treatment is required. As mentioned above, the most straightforward one is an integration of the radial equation 7,15 but, nevertheless, other methods such as diagonalization in a basis 16,17 and the Monte Carlo method 18,19 have also been applied. One of us has used the so-called oscillator representation method, perturbatively treating the residual interaction, to derive analytical expressions for the energy levels.…”
Section: Introductionmentioning
confidence: 99%
“…In order to extract the cusp condition, we extrapolate the wave function at the closer I's using the analytically known behavior for a parabolic confinement. 42 Therefore, this method is reliable for smooth potentials that can be approximated by parabolas at a local scale. We have systematically checked the stability of the results by using finer grids in the calculations.…”
Section: Exact Solution For the Two-electron Quantum Ringmentioning
confidence: 99%