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Cited by:

    1. R. Tiedra de Aldecoa, Asymptotics near ±m of the spectral shift function for Dirac operators with non-constant magnetic fields, Comm. Partial Differential Equations 36 (2011), 10-41.

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

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

    4. D. Sambou, Spectral analysis near the low ground energy of magnetic Pauli operators, C. R. Acad. Sci. Paris, Ser. I 354 (2016), 606-610.

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

    6. S. Richard, An index theorem in scattering theory, In: Proceedings of the Conference on Spectral Theory and Mathematical Physics, Santiago de Chile, 2014; Operator Theory: Advances and Applications, 254, 149-203, Springer International Publishing, 2016.

    7. 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.

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

    11. V. Bruneau, K. Pankrashkin, N. Popoff, Eigenvalue counting function for Robin Laplacians on conical domains, J. Geom. Anal., 28 (2018), 123-151.

    12. V. Bruneau, P. Miranda, Threshold singularities of the spectral shift function for a half-plane magnetic Hamiltonian, J. Funct. Anal. 274 (2018), 2499-2531.

    13. H. Inoue, S. Richard, Topological Levinson’s theorem for inverse square potentials: complex, infinite, but not exceptional, Rev. Roumaine Math. Pures Appl. 64 (2019), no. 2.

    14. Hideki Inoue, Scattering Theory for Half-line Schrödinger Operators:Analytic and Topological Results, Ph.D. thesis, Nagoya University, 2020.