Decay estimates for discrete bi-Laplace operators with potentials on the lattice Z

Abstract

It is known that the discrete Laplace operator on the lattice Z satisfies the following sharp time decay estimate: \|eit\|1→∞|t|-13, t≠0, which is slower than the usual O(|t|-12) decay in the continuous case on R. However, this paper shows that the discrete bi-Laplacian 2 on Z actually exhibits the same sharp decay estimate |t|-14 as its continuous counterpart. In view of the free decay estimate, we further investigate the discrete bi-Schr\"odinger operators of the form H=2+V on the lattice space 2(Z), where V is a class of real-valued decaying potentials on Z. First, we establish the limiting absorption principle for H, and then derive the full asymptotic expansions of the resolvent of H near the thresholds 0 and 16, including resonance cases. In particular, we provide a complete characterizations of the different resonance types in 2-weighted spaces. Based on these results above, we establish the following sharp 1-∞ decay estimates for all different resonances types of H under suitable decay conditions on V: \|e-itHPac(H)\|1→∞|t|-14, t≠0, where Pac(H) denotes the spectral projection onto the absolutely continuous spectrum space of H. Additionally, the decay estimates for the evolution flow of discrete beam equation are also derived: \|(t H)Pac(H)\|1→∞+\|(t H)t HPac(H)\|1→∞|t|-13, t≠0.