On the strong unique continuation property for the Dirac operator

Abstract

In [DO99,KY99], the strong unique continuation property from the origin is established for Hloc1-solutions to the massless Dirac differential inequality |Dn u | ≤ C|x||u|, in dimension n≥ 2 and with C<12. We show that 12 is the largest possibile constant in this result, providing an example in R2 of a (non-trivial) solution of the inequality. Also, we show properties of unique continuation from the origin for solutions to the inequality |Dn u | ≤ C |x|γ|u|, for γ>1, C>0. Finally, we establish the strong unique continuation property for the Dirac operator from the point at infinity.