The asymptotic limits of zero modes of massless Dirac operators

Abstract

Asymptotic behaviors of zero modes of the massless Dirac operator H=α· D + Q(x) are discussed, where α= (α1, α2, α3) is the triple of 4 × 4 Dirac matrices, D=1i ∇x, and Q(x)=(qjk (x) ) is a 4× 4 Hermitian matrix-valued function with | qjk(x) | C < x >- , >1. We shall show that for every zero mode f, the asymptotic limit of |x|2f(x) as |x| +∞ exists. The limit is expressed in terms of an integral of Q(x)f(x).