Lp boundedness of wave operators for higher order schr\"odinger operators with threshold eigenvalues

Abstract

We consider the higher order Schr\"odinger operator H=(-)m+V(x) in n dimensions with real-valued potential V when n>2m, m∈ N when H has a threshold eigenvalue. We adapt our recent results for m≥ 1 when n>4m to lower dimensions 2m<n≤ 4m to show that when H has a threshold eigenvalue and no resonances, the wave operators are bounded on Lp( Rn) for the natural range 1≤ p<2nn-1 when n is odd and 1≤ p<2nn-2 when n is even. We further show that if the zero energy eigenfunctions are orthogonal to xα V(x) for all |α|<k0, then the wave operators are bounded on 1≤ p<n2m-k0 when k0<2m in all dimensions n>2m. The range is p∈ [1,∞) and p∈[1,∞] when k0=2m and k0>2m respectively. The proofs apply in the classical m=1 case as well and streamlines existing arguments in the eigenvalue only case, in particular the L∞( Rn) boundedness is new when n>3.