中文

A ground state alternative for singular Schr\"odinger operators

偏微分方程分析 2007-05-23 v1 谱理论

摘要

Let a\mathbf{a} be a quadratic form associated with a Schr\"odinger operator L=(A)+VL=-\nabla\cdot(A\nabla)+V on a domain ΩRd\Omega\subset \mathbb{R}^d. If a\mathbf{a} is nonnegative on C0(Ω)C_0^{\infty}(\Omega), then either there is W>0W>0 such that Wu2dxa[u]\int W|u|^2 dx\leq \mathbf{a}[u] for all C0(Ω;R)C_0^{\infty}(\Omega;\mathbb{R}), or there is a sequence ϕkC0(Ω)\phi_k\in C_0^{\infty}(\Omega) and a function ϕ>0\phi>0 satisfying Lϕ=0L\phi=0 such that a[ϕk]0\mathbf{a}[\phi_k]\to 0, ϕkϕ\phi_k\to\phi locally uniformly in Ω{x0}\Omega\setminus\{x_0\}. This dichotomy is equivalent to the dichotomy between LL being subcritical resp. critical in Ω\Omega. In the latter case, one has an inequality of Poincar\'e type: there exists W>0W>0 such that for every ψC0(Ω;R)\psi\in C_0^\infty(\Omega;\mathbb{R}) satisfying ψϕdx0\int \psi \phi dx \neq 0 there exists a constant C>0C>0 such that C1Wu2dxa[u]+Cuψdx2C^{-1}\int W|u|^2 dx\le \mathbf{a}[u]+C|\int u \psi dx|^2 for all uC0(Ω;R)u\in C_0^\infty(\Omega;\mathbb{R}).

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引用

@article{arxiv.math/0411658,
  title  = {A ground state alternative for singular Schr\"odinger operators},
  author = {Yehuda Pinchover and Kyril Tintarev},
  journal= {arXiv preprint arXiv:math/0411658},
  year   = {2007}
}

备注

14 pages