Some estimates of Schrödinger-type operators with certain nonnegative potentials (Q1008544)

Summary: We consider the Schrödinger-type operator \(H=(-\Delta)^2+V^2\), where the nonnegative potential \(V\) belongs to the reverse Hölder class \(B_{q_1}\) for \(q_1\geq n/2\), \(n\geq 5\). The \(L^p\) estimates of the operator \(\nabla^4H^{-1}\) related to \(H\) are obtained when \(V\in B_{q_1}\) and \(1<p\leq q_1/2\). We also obtain the weak-type estimates of the operator \(\nabla^4H^{-1}\) under the same condition of \(V\).