Sharp exponential localization for solutions of the Perturbed Dirac Equation

Abstract

We determine the largest non-trivial rate of exponential decay at infinity for solutions to the Dirac equation equation* Dn + V = 0 in Rn, equation* being Dn the massless Dirac operator in dimension n≥ 2 and V a (possibly non-Hermitian) matrix-valued perturbation such that |V(x)| |x|-ε at infinity, for -∞ < ε < 1. Moreover, we show that our results are sharp for n =2,3, providing explicit examples of solutions that have the prescripted decay, in presence of a potential with the related behaviour at infinity.