Let $\Omega$ be a Lipschitz domain in $\mathbb{R}^n$, and let $N(\lambda)$ be the number of Dirichlet Laplacian eigenvalues less than or equal to $\lambda$. The famous Weyl's law says that as $\lambda$ goes to infinity, the asymptotic growth of $N(\lambda)$ is like $C(n)|\Omega|\lambda^{\frac{n}{2}}$, where $C(n)=(2\pi)^{-n}\omega_n$, $\omega_n$ is the volume of the unit ball in $\mathbb{R}^n$.
Note that in the definition of $N(\lambda)$, the multiplicity of Dirichlet eigenvalues have been considered. How about Weyl's law for the number of distinct eigenvalues? More precisely, let $N_d(\lambda)$ be the number of distict Dirichlet Laplacian eigenvalues less than or equal to $\lambda$. What is the growth rate of $N_d(\lambda)$? Are there any references?
