Domains for Dirac-Coulomb min-max levels

Abstract

We consider a Dirac operator in three space dimensions, with an electrostatic (i.e. real-valued) potential V(x), having a strong Coulomb-type singularity at the origin. This operator is not always essentially self-adjoint but admits a distinguished self-adjoint extension D\V. In a first part we obtain new results on the domain of this extension, complementing previous works of Esteban and Loss. Then we prove the validity of min-max formulas for the eigenvalues in the spectral gap of D\V, in a range of simple function spaces independent of V. Our results include the critical case \x 0 |x| V(x)= -1, with units such that =mc2=1, and they are the first ones in this situation. We also give the corresponding results in two dimensions.