Lp-continuity of wave operators for higher order Schr\"odinger operators with threshold eigenvalues in high dimensions
Abstract
We consider the higher order Schr\"odinger operator H=(-)m+V(x) in n dimensions with real-valued potential V when n>4m, m∈ N. We adapt our recent results for m>1 to show that when H has a threshold eigenvalue the wave operators are bounded on Lp( Rn) for the natural range 1≤ p<n2m in both even and odd dimensions. The approach used works without distinguishing even and odd cases, and matches the range of boundedness in the classical case when m=1. The proof applies in the classical m=1 case as well and simplifies the argument.
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