Decay estimates for fourth-order Schr\"odinger operators in dimension two
Abstract
In this paper we study the decay estimates of the fourth order Schr\"odinger operator H=2+V(x) on R2 with a bounded decaying potential V(x). We first deduce the asymptotic expansions of resolvent of H near the zero threshold in the presence of resonances or eigenvalue, and then use them to establish the L1-L∞ decay estimates of e-itHgenerated by the fourth order Schr\"odinger operator H. Our methods used in the decay estimates depend on Littlewood-Paley decomposition and oscillatory integral theory. Moreover, we classify these zero resonances as the distributional solutions of Hφ=0 in suitable weighted spaces. Due to the degeneracy of 2 at zero threshold and the lower even dimension (i.e. n=2), we remark that the asymptotic expansions of resolvent RV(λ4) and the classifications of resonances are more involved than Schr\"odinger operator -+V in dimension two.
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