The $L^p$-boundedness of wave operators for two dimensional Schrödinger operators with threshold singularities (2008.07906v2)

Abstract: We generalize the recent result of Erdo{\u g}an, Goldberg and Green on the $L^p$-boundedness of wave operators for two dimensional Schr\"odinger operators and prove that they are bounded in $L^p(\R^2)$ for all $1<p<\infty$ if and only if the Schr\"odinger operator possesses no $p$-wave threshold resonances, viz. Schr\"odinger equation $(-\lap + V(x))u(x)=0$ possesses no solutions which satisfy $u(x)= (a_1x_1+a_2 x_2)|x|^{-2}+ o(|x|^{-1})$ as $|x|\to \infty$ for an $(a_1, a_2) \in \R^2\setminus {(0,0)}$ and, otherwise, they are bounded in $L^p(\R^2)$ for $1<p\leq 2$ and unbounded for $2<p<\infty$. We present also a new proof for the known part of the result.