On the semiclassical spectrum of the Dirichlet-Pauli operator

Jean-Marie Barbaroux; Loïc Le Treust; Nicolas Raymond; Edgardo Stockmeyer

doi:10.4171/JEMS/1085

Journal articles

On the semiclassical spectrum of the Dirichlet-Pauli operator

Jean-Marie Barbaroux ^{1, 2} Loïc Le Treust ³ Nicolas Raymond ⁴ Edgardo Stockmeyer ⁵

1 CPT - Centre de Physique Théorique - UMR 7332

2 CPT - E8 Dynamique quantique et analyse spectrale

CPT - Centre de Physique Théorique - UMR 7332

3 I2M - Institut de Mathématiques de Marseille

4 LAREMA - Laboratoire Angevin de Recherche en Mathématiques

5 UC - Pontificia Universidad Católica de Chile

Abstract : This paper is devoted to semiclassical estimates of the eigenvalues of the Pauli operator on a bounded open set whose boundary carries Dirichlet conditions. Assuming that the magnetic field is positive and a few generic conditions, we establish the simplicity of the eigenvalues and provide accurate asymptotic estimates involving Segal-Bargmann and Hardy spaces associated with the magnetic field.

Document type :

Journal articles

Domain :

Mathematics [math] / Mathematical Physics [math-ph]

Mathematics [math] / Spectral Theory [math.SP]

Complete list of metadata

Cited literature [19 references] Display Hide Download

https://hal.archives-ouvertes.fr/hal-01889492
Contributor : Loïc Le Treust Connect in order to contact the contributor
Submitted on : Wednesday, January 22, 2020 - 4:44:53 PM
Last modification on : Friday, April 1, 2022 - 3:57:41 AM

On the semiclassical spectrum of the Dirichlet-Pauli operator

Files

Identifiers

Collections

Citation

Export

Metrics

524

247

On the semiclassical spectrum of the Dirichlet-Pauli operator

Files

Identifiers

Collections

Citation

Export

Share

Metrics

524

247