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Results on the Eigenspace of weighted elliptic eigenvalue problems

I am considering the following eigenvalue problem in $\Omega$ (open and unbounded domain in $\mathbb{R}^n$) $$-\operatorname{div}(a(x)\nabla \varphi) = \lambda a(x)w(x)\varphi$$ where the weights $a>0$ and $w\in L^{\infty}$ (and is a radial function such that $w>0$), $\lambda>0$ and $\varphi$ lives in the appropriate weighted Sobolev space. I am interested in any results involving the dimension of the second Eigenspace associated with the second smallest eigenvalue to this equation.

Usually, if $a$ was radial I would use Separation of Variables and Sturm-Liouville Theory to arrive at some conclusion but this will not work here. I also tried looking at some papers related to weighted elliptic eigenvalue problems, but most of the papers were concerned with the first eigenvalue of this equation, so I am not sure if I can use the techniques developed in those articles.

Student
  • 537
  • 4
  • 15