On the Lp boundedness of wave operators for four-dimensional Schr\"odinger Operators with a threshold eigenvalue

Abstract

Let H=-+V be a Schr\"odinger operator on L2( R4) with real-valued potential V, and let H0=-. If V has sufficient pointwise decay, the wave operators W=s-t ∞ eitHe-itH0 are known to be bounded on Lp( R4) for all 1≤ p≤ ∞ if zero is not an eigenvalue or resonance, and on 43<p<4 if zero is an eigenvalue but not a resonance. We show that in the latter case, the wave operators are also bounded on Lp( R4) for 1≤ p≤ 43 by direct examination of the integral kernel of the leading terms. Furthermore, if ∫ R4 xV(x) (x) \, dx=0 for all zero energy eigenfunctions , then the wave operators are bounded on Lp for 1 ≤ p<∞.