Some Key Properties of Eigenfunctions Linked to Degenerate Elliptic Differential Operators

Abstract

In this study, we address the eigenvalue problem given by: equation* cases - (w∇ ui)=iui &in ⊂ Rn,\\ ui=0 &on , cases equation* where w > 0 within and w = 0 on part of ∂ . We establish Courant's nodal domain theorem for the corresponding degenerate elliptic differential operator A. Unlike uniformly elliptic operators, degenerate cases often result in the loss of many advantageous properties. Despite this, we show that the essential property that the set \ ∈ L∞() A + has simple eigenvalues\ forms a residual subset within (L∞(), |·|∞) still holds for the degenerate elliptic differential operator A.