Pointwise estimates for the fundamental solutions of higher order Schr\"odinger equations in odd dimensions II: high dimensional case

Abstract

In this paper, for any odd n and any integer m≥1 with n>4m, we study the fundamental solution of the higher order Schr\"odinger equation equation* i∂tu(x,t)=((-)m+V(x))u(x,t), t∈ R,\,\,x∈ Rn, equation* where V is a real-valued Cn+12-2m potential with certain decay. Let Pac(H) denote the projection onto the absolutely continuous spectrum space of H=(-)m+V, and assume that H has no positive embedded eigenvalue. Our main result says that e-itHPac(H) has integral kernel K(t,x,y) satisfying equation* |K(t, x,y)| C(1+|t|)-(n2m-σ)(1+|t|-n2 m)(1+|t|-12 m|x-y|)-n(m-1)2 m-1, t≠0,\,x,y∈Rn, equation* where σ=2 if 0 is an eigenvalue of H, and σ=0 otherwise. A similar result for smoothing operators Hα2me-itHPac(H) is also given. The regularity condition V∈ Cn+12-2m is optimal in the second order case, and it also seems optimal when m>1.