中文

How large are the spectral gaps?

经典分析与常微分方程 2007-05-23 v1

摘要

Let DD be a bounded domain in Rn{\Bbb R}^n whose boundary has a Minkowski dimension α<n\alpha<n. Suppose that EΛ={e2πixλ}λΛE_{\Lambda}= {\{e^{2 \pi i x \cdot \lambda}\}}_{\lambda \in \Lambda}, Λ\Lambda an infinite discrete subset of Rn{\Bbb R}^n, is a frame of exponentials for L2(D)L^2(D), with frame constants A,BA,B, ABA \leq B. Then if RC(BDαAD)1nα, R \ge C{(\frac{{B|\partial D|}_{\alpha}}{A|D|} )}^ {\frac{1}{n-\alpha}}, where CC depends only on the ambient dimension nn and Dα{|\partial D|}_{\alpha} denotes the Minkowski content, then every cube of sidelength RR contains at least one element of Λ\Lambda. We give examples that illustrate the extent to which our estimates are sharp.

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引用

@article{arxiv.math/0104094,
  title  = {How large are the spectral gaps?},
  author = {Alex Iosevich and Steen Pedersen},
  journal= {arXiv preprint arXiv:math/0104094},
  year   = {2007}
}