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Publications in Math-Net.Ru |
Citations |
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2019 |
1. |
S. Fassari, F. Rinaldi, “Exact calculation of the trace of the Birman–Schwinger operator of the one-dimensional harmonic oscillator perturbed by an attractive Gaussian potential”, Nanosystems: Physics, Chemistry, Mathematics, 10:6 (2019), 608–615 |
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2018 |
2. |
S. Fassari, M. Gadella, M. L. Glasser, L. M. Nieto, F. Rinaldi, “Level crossings of eigenvalues of the Schrödinger Hamiltonian of the isotropic harmonic oscillator perturbed by a central point interaction in different dimensions”, Nanosystems: Physics, Chemistry, Mathematics, 9:2 (2018), 179–186 |
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2017 |
3. |
S. Albeverio, S. Fassari, F. Rinaldi, “The behaviour of the three-dimensional Hamiltonian $-\Delta+\lambda[\delta(x+x_0)+\delta(x-x_0)]$ as the distance between the two centres vanishes”, Nanosystems: Physics, Chemistry, Mathematics, 8:2 (2017), 153–159 |
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2016 |
4. |
S. Albeverio, S. Fassari, F. Rinaldi, “Spectral properties of a symmetric three-dimensional quantum dot with a pair of identical attractive $\delta$-impurities symmetrically situated around the origin II”, Nanosystems: Physics, Chemistry, Mathematics, 7:5 (2016), 803–815 |
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5. |
S. Albeverio, S. Fassari, F. Rinaldi, “Spectral properties of a symmetric three-dimensional quantum dot with a pair of identical attractive $\delta$-impurities symmetrically situated around the origin”, Nanosystems: Physics, Chemistry, Mathematics, 7:2 (2016), 268–289 |
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