Spectral asymptotics for Dirichlet to Neumann operator

We consider eigenvalues of the Dirichlet-to-Neumann operator for Laplacian in the domain (or manifold) with edges and establish the asymptotics of the eigenvalue counting function \begin{equation*} \mathsf{N}(\lambda)= \kappa_0\lambda^d +O(\lambda^{d-1})\qquad \text{as}\ \ \lambda\to+\infty, \end{equation*} where $d$ is dimension of the boundary. Further, in certain cases we establish two-term asymptotics \begin{equation*} \mathsf{N}(\lambda)= \kappa_0\lambda^d+\kappa_1\lambda^{d-1}+o(\lambda^{d-1})\qquad \text{as}\ \ \lambda\to+\infty. \end{equation*} We also establish improved asymptotics for Riesz means.