Dispersive estimates for inhomogeneous fourth-order Schr\"odinger operator in 3D with zero energy obstructions

Abstract

We study the L1-L∞ dispersive estimate of the inhomogeneous fourth-order Schr\"odinger operator H=2-+V(x) with zero energy obstructions in R3. For the related propagator e-itH, we prove that for 0<t≤ 1, then e-itHPac(H) satisfies the |t|-3/4-estimate. For t>1, we prove that:\,\, 1) if zero is a regular point of H, then e-itHPac(H) satisfies the |t|-3/2- dispersive estimate.\,\, 2) if zero is a resonance of H, there exists a time dependent operator Ft such that e-itHPac(H)-Ft satisfies the |t|-3/2- dispersive estimate.\,\, 3) if zero is a resonance and~/~or an eigenvalue of H, then there exists a time dependent operator Gt such that e-itHPac(H)-Gt satisfies the |t|-3/2- dispersive estimate. Here Ft and Gt satisfy |t|-1/2-dispersive estimates.