Unique continuation properties for one dimensional higher order Schr\"odinger equations

Abstract

We study two types of unique continuation properties for the higher order Schr\"odinger equation with potential i∂tu=(-x)mu+V(t,x)u,(t,x)∈R1+n,\,2≤ m∈N+. The first one says if u has certain exponential decay at two times, then u0, and this result is sharp by constructing critical non-trivial solutions. The second one says if u0 in an arbitrary half-space of R1+n, then u0 identically. The uniqueness theorems are given when n=1, but we also prove partial results when n∈N+ for their own interests. Possibility or obstacles to proving these unique continuation properties in higher spatial dimensions are also discussed.