A further quantification of the unique continuation properties of eigenfunctions of the magnetic Schr\"odinger operator

Abstract

We prove quantitative unique continuation results for solutions of w - k2 w = V w + W· ∇ w in a neighborhood of infinity, where k > 0, and V and W are complex-valued decaying potentials that satisfy |V(x)| |x|-N and |W(x)| |x|-P for some N, P > 1. For M(R, 4n/k) = ∈f \||w||L2(B4n/k(x0)) : |x0| = R \, we show that if the solution w is non-zero, bounded, and normalized, then M(R, 4n/k) (-kR - G R), where G > n-12 is a constant. An examination of radial solutions to w - k2 w = V w + W· ∇ w shows that this new estimate for M(R, 4n/k) is sharp up to logarithmic terms.