Lower bounds on the moduli of three-dimensional Coulomb-Dirac operators via fractional Laplacians with applications

Abstract

For ∈[0, 1] let D be the distinguished self-adjoint realisation of the three-dimensional Coulomb-Dirac operator - iα·∇ -|·|-1. For ∈[0, 1) we prove the lower bound of the form |D| ≥slant C-, where C is found explicitly and is better then in all previous works on the topic. In the critical case =1 we prove that for every λ∈ [0, 1) there exists Kλ >0 such that the estimate |D1| ≥slant Kλ aλ -1(-)λ/2 -a-1 holds for all a >0. As applications we extend the range of coupling constants in the proof of the stability of the relativistic electron-positron field and obtain Cwickel-Lieb-Rozenblum and Lieb-Thirring type estimates on the negative eigenvalues of perturbed projected massless Coulomb-Dirac operators in the Furry picture. We also study the existence of a virtual level at zero for such projected operators.