Spectral properties of non- self-adjoint elliptic differential operators in the Hilbert space

Abstract: ‎Let $\Omega$ be a bounded domain in $R^{n}$ with smooth boundary‎ ‎$\partial\Omega$‎. ‎In this article‎, ‎we will investigate the spectral‎ ‎properties of a non-self adjoint elliptic differential operator\\‎ ‎$(Au)(x)=-\sum^{n}_{i,j=1}\left(\omega^{2\alpha}(x)a_{ij}(x)‎ ‎\mu(x)u'_{x_{i}}(x)\right)'_{x_{j}}$‎, ‎acting in the Hilbert space ‎$H=L^{2}{(\Omega)}$. with Dirichlet-type boundary conditions‎. ‎Here‎ ‎$a_{ij}(x)= \overline{a_{ji}(x)}\;\;\;(i,j=1,\ldots,n),\;\;\;‎ ‎a_{ij}(x)\in C^{2}(\overline{\Omega})$… Show more