Résonances près de seuils d'opérateurs magnétiques de Pauli et de Dirac

SAMBOU, Diomba

The system will be going down for regular maintenance. Please save your work and logout.

Metadata

Show full item record

License

SAMBOU, Diomba
Institut de Mathématiques de Bordeaux [IMB]

Language

Document de travail - Pré-publication

English Abstract

We consider the perturbations $H := H_{0} + V$ and $D := D_{0} + V$ of the free $3$D Hamiltonians $H_{0}$ of Pauli and $D_{0}$ of Dirac with non-constant magnetic field, and $V$ is a electric potential which decays super-exponentially with respect to the variable along the magnetic field. We show that in appropriate Banach spaces, the resolvents of $H$ and $D$ defined on the upper half-plane admit meromorphic extensions. We define the resonances of $H$ and $D$ as the poles of these meromorphic extensions. We study the distribution of resonances of $H$ close to the origin $0$ and that of $D$ close to $\pm m$, where $m$ is the mass of a particle. In both cases, we first obtain an upper bound of the number of resonances in small domains in a vicinity of $0$ and $\pm m$. Moreover, under additional assumptions, we establish asymptotic expansions of the number of resonances which imply their accumulation near the thresholds $0$ and $\pm m$. In particular, for a perturbation $V$ of definite sign, we obtain information on the distribution of eigenvalues of $H$ and $D$ near $0$ and $\pm m$ respectively.Read less <

Keywords

Opérateurs magnétiques de Pauli et de Dirac

résonances.

résonances

Metadata

Share this item!

License