J.-F. Bony, V. Bruneau, G. D. Raikov, Counting function of characteristic values and magnetic resonances, Commun. PDE. 39 (2014), 274 - 305. 

Cited by:

• 1. D. Sambou, Résonances près de seuils d’opérateurs magnétiques de Pauli et de Dirac, Canad. J. Math. 65 (2013), 1095-1124.

  2. D. Sambou, Accumulation spectrale pour les Hamiltoniens quantiques magnétiques, Thèse de Doctorat, Université de Bordeaux 1, 2013.

  3. J. Sjöstrand, Weyl law for semi-classical resonances with randomly perturbed potentials, Mémoires de la SMF 136 (2014), vi + 144 pp.

  4. D. Sambou, A criterion for the existence of nonreal eigenvalues for a Dirac operator, New York J. Math. 22 (2016), 469-500.

  5. D. Sambou, Counting function of magnetic eigenvalues for non-definite sign perturbations, In: Proceedings of the Conference on Spectral Theory and Mathematical Physics, Santiago de Chile, 2014; Operator Theory: Advances and Applications, 254, 205-221, Springer International Publishing, 2016.

  6. M. Zworski, Mathematical study of scattering resonances, Bull. Math. Sci. 7 (2017), 185.

  7. J. Behrndt, F. Gesztesy, H. Holden, R. Nichols, On the index of meromorphic operator-valued functions and some applications, In: Functional Analysis and Operator Theory for Quantum Physics, Pavel Exner Anniversary Volume, EMS, Z ̈urich, 95-127.

  8. D. Sambou, A simple criterion for the existence of nonreal eigenvalues for a class of 2D and 3D Pauli operators, Linear Algebra Appl. 529 (2017) 51-88.

  9. D. Sambou, A. Taarabt, Eigenvalues behaviours for self-adjoint Pauli operators with unsigned perturbations and admissible magnetic fields, C. R. Acad. Sci. Paris, Ser. I 365 (2017), 553-558.

  10. H. Tamura, Aharonov–Bohm effect in resonances for scattering by three solenoids at large separation, Applied Mathematics Research eXpress, 2017 (2017), 65-117.

  11. D. Sambou, On eigenvalue accumulation for non-self-adjoint magnetic operators, Journal de Mathématiques Pures et Appliquées 108 (2017), 306–332. 

  12. D. Sambou, Spectral non-self-adjoint analysis of complex Dirac, Pauli and Schrödinger operators with constant magnetic fields of full rank, Asymptotic Analysis 111 (2019), 113-136. 

  13. Paul Geniet, Analyse spectrale de quelques opérateurs de Schrödinger magnétiques fibrés, Thèse de doctorat de l'Université de Bordeaux, 2020. 

  14. Olivier Bourget, Diomba Sambou, and Amal Taarabt, On non-selfadjoint operators with finite discrete spectrum, in: Spectral Theory and Mathematical Physics. STMP 2018, Santiago, Chile, P. Miranda, N. Popoff, and G. Raikov (Eds.), Latin American Mathematics Series, Springer Nature, Switzerland AG, 2020. 

  15. Olivier Bourget, Diomba Sambou, Amal Taarabt: On the spectral properties of non-selfadjoint discrete Schrödinger operators, Journal de Mathématiques Pures et Appliquées, 141 (2020), 1-49. 

  16. Marouane Assal, Olivier Bourget, Pablo Miranda, Diomba Sambou, Resonances near spectral thresholds for multichannel discrete Schrödinger operators, Preprint arXiv:2203.01352, 2022. 

  17. M. Assal, O. Bourget, D. Sambou, A. Taarabt, On the singularities of the spectral shift function for some tight-binding models, Letters in Mathematical Physics, 116 (2026), article number 35.

  18. Marouane Assal, Olivier Bourget, Pablo Miranda, Diomba Sambou, Clusters of resonances for a non-self adjoint multichannel discrete Schrödinger operator, J. Math. Phys. 66 (2025), article no. 073504.