Boundary-value problems for systems of differential equations with operator coefficients (Q807839)

Let G be a bounded domain in \({\mathbb{R}}^ n\) with piecewise smooth boundary \(\partial G\). Further, let u and f(x,y,z) denote m-dimensional vector functions and let \(A,A_ 1,B\) denote some parabolic or hyperbolic operators. The author studies several boundary value problems for the systems \[ (1)\quad Au_{xx}-Bu_ y=f(x,y,z),\quad (2)\quad A_ 1u_{xx}-bu_{yy}=f(x,y,z). \] We quote the following as a typical one: Find solution(s) of the system (1) in the \(domain\) Q\(=\{(x,y,z):\) \(0<x<X\), \(0<y<Y\), \(z\in G\}\) satisfying \(u(0,y,z)=u(x,y,z)=u(x,0,z)=u_{| \Gamma_ 1}=0\) where \(\Gamma_ 1=\{(x,y,z)\in \Gamma:\) \(z\in \partial G\}\) and \(\Gamma\) is the boundary of the domain Q. Existence and uniqueness of certain generalized solutions (as defined in the paper) are proved.