The relativistic mean-field equations of the atomic nucleus
Résumé
In nuclear physics, the relativistic mean-field theory describes the nucleus as a system of Dirac nucleons which interact via meson fields. In a static case and without nonlinear self-coupling of the $\sigma$ meson, the relativistic mean-field equations become a system of Dirac equations where the potential is given by the meson and photon fields. The aim of this work is to prove the existence of solutions of these equations. We consider a minimization problem with constraints that involve negative spectral projectors and we apply the concentration-compactness lemma to find a minimizer of this problem. We show that this minimizer is a solution of the relativistic mean-field equations considered.
Fichier principal
Relativistic_Mean_field_of_the_atomic_nucleus_V2.pdf (322.39 Ko)
Télécharger le fichier
Origine : Fichiers produits par l'(les) auteur(s)