Quantitative Landis-type result for Dirac operators
Abstract
We study quantitative unique continuation at infinity for Dirac equations with bounded matrix-valued potentials. For the massless Dirac operator in , we establish a Landis-type estimate showing that the vanishing order of any nontrivial bounded solution of satisfies a lower bound of order as ; the quadratic growth in the exponent is sharp, in view of previous known results. Our proof follows a Bourgain--Kenig type approach based on a Carleman inequality for Dirac operators which relies on a local H\"older regularity result, which we also prove. In two dimension, we obtain improved quantitative estimates under symmetry assumptions on the potential and for real-valued solutions. Finally, we also derive qualitative Landis-type results for Dirac equations with decaying potentials, including critical decay rates.
Cite
@article{arxiv.2602.16049,
title = {Quantitative Landis-type result for Dirac operators},
author = {Ujjal Das and Luca Fanelli and Luz Roncal},
journal= {arXiv preprint arXiv:2602.16049},
year = {2026}
}
Comments
17 pages