Let $\Omega$ be a bounded smooth domain, $Lu = D_i \left( a^{ij} (x) D_ju \right)$, and two constants $\lambda, \Lambda > 0$. Suppose the coefficient $a$ is measurable, symmetric, and satisfies $$ a^{ij} \xi_i \xi_j \ge \lambda \vert{\xi} \vert^2 \quad \text{ and} \quad \sum_{i,j}^{} \vert{a^{ij}(x)}\vert \le \Lambda^2, $$ for all $x \in \Omega, \xi \in \mathbb{R}^n$. However, $a$ can be discontinuous and not belong to any $VMO$ or $BMO$ spaces.
Let $u \in W^{1,2}(\Omega)$ be a weak solution of $Lu = g$ for $g \in L^{q/2},~ q > n$. Denote by $\mathtt{data} = (\lambda,\Lambda,n,q)$. Then Theorem 8.15 in Gilbarg-Trudinger, Elliptic Partial Differential Equations of Second Order, says that $$ \Vert u \Vert_{L^{\infty}(\Omega)} \le C (\mathtt{data}) \left( \Vert u \Vert_{L^2(\Omega)} + \Vert g \Vert_{L^{q/2}(\Omega)} \right), $$ and Theorem 8.24 in the same book says that for any $\Omega' \subset \Omega$, $$ \Vert u \Vert_{C^{\alpha} \left( \Omega' \right)} \le K (\mathtt{data}, \text{dist}(\Omega',\Omega)) \left( \Vert u \Vert_{L^2(\Omega)} + \Vert g \Vert_{L^{q/2}(\Omega)}\right). $$
On page 214, after Theorem 8.37, the authors claim that solutions $w \in W^{1,2}_0(\Omega)$ of the eigenvalue problem $$ Lw + \sigma w = 0, $$ belong to $L^{\infty} (\Omega) \cap C^{\alpha}(\Omega)$, thanks to the above theorems 8.15 and 8.24.
My question: If $2 \le n \le 4$, then by Sobolev embedding, we have $w \in W^{1,2}_0 \hookrightarrow L^{q/2}$ for some $q > n$. Therefore, we can apply theorems 8.15 and 8.24. What about the case $n \ge 5$?
Any insights or references are appreciated! Thank you.
