English

Dispersive Estimates for higher dimensional Schr\"odinger Operators with threshold eigenvalues I: The odd dimensional case

Analysis of PDEs 2016-08-31 v3

Abstract

We investigate L1(Rn)L(Rn)L^1(\mathbb R^n)\to L^\infty(\mathbb R^n) dispersive estimates for the Schr\"odinger operator H=Δ+VH=-\Delta+V when there is an eigenvalue at zero energy and n5n\geq 5 is odd. In particular, we show that if there is an eigenvalue at zero energy then there is a time dependent, rank one operator FtF_t satisfying FtL1Lt2n2\|F_t\|_{L^1\to L^\infty} \lesssim |t|^{2-\frac{n}{2}} for t>1|t|>1 such that eitHPacFtL1Lt1n2, for t>1.\|e^{itH}P_{ac}-F_t\|_{L^1\to L^\infty} \lesssim |t|^{1-\frac{n}{2}},\qquad\textrm{ for } |t|>1. With stronger decay conditions on the potential it is possible to generate an operator-valued expansion for the evolution, taking the form eitHPac(H)=t2n2A2+t1n2A1+tn2A0, e^{itH} P_{ac}(H)=|t|^{2-\frac{n}{2}}A_{-2}+ |t|^{1-\frac{n}{2}} A_{-1}+|t|^{-\frac{n}{2}}A_0, with A2A_{-2} and A1A_{-1} finite rank operators mapping L1(Rn)L^1(\mathbb R^n) to L(Rn)L^\infty(\mathbb R^n) while A0A_0 maps weighted L1L^1 spaces to weighted LL^\infty spaces. The leading order terms A2A_{-2} and A1A_{-1} vanish when certain orthogonality conditions between the potential VV and the zero energy eigenfunctions are satisfied. We show that under the same orthogonality conditions, the remaining tn2A0|t|^{-\frac{n}{2}}A_0 term also exists as a map from L1(Rn)L^1(\mathbb R^n) to L(Rn)L^\infty(\mathbb R^n), hence eitHPac(H)e^{itH}P_{ac}(H) satisfies the same dispersive bounds as the free evolution despite the eigenvalue at zero.

Keywords

Cite

@article{arxiv.1409.6323,
  title  = {Dispersive Estimates for higher dimensional Schr\"odinger Operators with threshold eigenvalues I: The odd dimensional case},
  author = {Michael Goldberg and William R. Green},
  journal= {arXiv preprint arXiv:1409.6323},
  year   = {2016}
}

Comments

To appear in J. Funct. Anal

R2 v1 2026-06-22T06:02:49.259Z