Removable singularity of the polyharmonic equation
偏微分方程分析
2007-05-23 v1
摘要
Let x0∈Ω⊂Rn, n≥2, be a domain and let m≥2. We will prove that a solution u of the polyharmonic equation Δmu=0 in Ω∖{x0} has a removable singularity at x0 if and only if ∣Δku(x)∣=o(∣x−x0∣2−n)∀k=0,1,2,...,m−1 as ∣x−x0∣→0 for n≥3 and =o(log(∣x−x0∣−1))∀k=0,1,2,...,m−1 as ∣x−x0∣→0 for n=2. For m≥2 we will also prove that u has a removable singularity at x0 if ∣u(x)∣=o(∣x−x0∣2m−n) as ∣x−x0∣→0 for n≥3 and ∣u(x)∣=o(∣x−x0∣2m−2log(∣x−x0∣−1)) as ∣x−x0∣→0 for n=2.
引用
@article{arxiv.math/0702171,
title = {Removable singularity of the polyharmonic equation},
author = {Shu-Yu Hsu},
journal= {arXiv preprint arXiv:math/0702171},
year = {2007}
}
备注
6 pages