Polynomial solvability of differential equations with coefficients from classes of infinitely differentiable functions (Q759904)

For the elliptic partial differential equations \[ (Au)(x)=- \sum^{n}_{i,j=1}D_ ia_{ij}(x)D_ jG(x)u(x)+a_{00}(x)u(x)=f(x),\quad x\in \Omega \subset {\mathbb{R}}^ n \] degenerating on \(\partial \Omega \in C^{\infty}\) with \(a_{ij},G,f\in C^{\infty}\) and \(a_{00}(x)\geq c_ 0>0\), it can be shown that \(u=\lim_{n\to \infty} P_ n(A)f\) (where \(P_ n\) is a polynomial function and \(A^ j\) is the j-order iteration of the operator A) takes place iff \(a_{ij},G\) and f are quasianalytical functions (it means if the function and all its derivatives are zero in a point, then the function is zero).