Resolvent estimates for one-dimensional Dirac operators with imaginary potentials

Abstract

We investigate massive one-dimensional Dirac operators perturbed by diagonal matrix potentials of the form i V where the function V is real-valued and unbounded at infinity. For such operators we find an L2-realization with non-empty resolvent set using generalized coercivity and Schur complement dominance techniques. In the prototypical Airy-Dirac case V(x)=x, x ∈ R, we derive the precise asymptotic behavior of the resolvent as the spectral parameter tends to infinity and also as the mass m tends to 0. Finally, we find the asymptotics of the resolvent norm for general potentials V in terms of the Airy-Dirac resolvent, which in particular yields an asymptotic shape of -pseudospectral curves and establishes the optimality of the pseudospectral region found in [32].