Uniform resolvent estimates for magnetic operators
Abstract
We prove Kenig--Ruiz--Sogge type uniform resolvent estimates for selfadjoint magnetic Schr\"odinger operators H=(i∂+A(x))2+V(x) on Rn, n3. Under suitable decay assumptions on the electric and magnetic potentials, and excluding a threshold resonance at zero, we show that for all z ∈ C[0,+∞), equation* \|(H-z)-1φ\|Lq|z|θ(p,q) (1+|z|γ) \|φ\|Lp equation* throughout the full free resolvent range (1p,1q)∈(n), where θ(p,q)= n2(1p-1q)-1. Here γ= 12n-1n+1 under the basic magnetic decay hypothesis, or γ=n-14n under a different decay assumption on A(x); for the second case we use a weak endpoint estimate of Frank--Simon type equation* \|R0(z)φ\| L2nn-1,∞rL2ω |z|-12 \|φ\|L2nn+1,1rL2ω. equation* The result extends the known electromagnetic estimates from fixed frequency and a smaller exponent region to all frequencies and the full Kenig--Ruiz--Sogge range. We also prove a variant with weaker local assumptions in a smaller range 1(n). As applications, we obtain Lp-Lp' restriction type estimates for the density of the spectral measure of magnetic Schr\"odinger operators, and an eigenvalue enclosure result for complex scalar perturbations.
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