To the question on the breakdown of uniqueness solution of the Dirichlet problem for the differential equations with partial derivatives of the fourth order (Q2720902)

The paper deals with the following homogeneous Dirichlet problem in a bounded domain \(\Omega\) with smooth boundary for a differential equation of the fourth order with constant complex coefficients and homogeneous nondegenerated symbol: NEWLINE\[NEWLINEa_0\frac{\partial^4 u}{\partial x_1^4}+a_1\frac{\partial^4 u} {\partial x_1^3\partial x_2}+a_2\frac{\partial^4 u}{\partial x_1^2 \partial x_2^2}+a_3\frac{\partial^4 u}{\partial x_1\partial x_2^3} +a_4\frac{\partial^4 u}{\partial x_2^4}=0,NEWLINE\]NEWLINE NEWLINE\[NEWLINEu|_{\partial\Omega}=u_{\nu}''|_{\partial\Omega}=0.NEWLINE\]NEWLINE Necessary conditions for the breakdown of uniqueness of solutions of this problem in the space \(W_2^m(\Omega), m>3\) are obtained by the author. Besides, under assumption of ellipticity of the equation, these conditions are sufficient. NEWLINENEWLINENEWLINEWhen the domain \(\Omega\) is a unit disk the mentioned above conditions take the other form as a condition on the angles of slope of characteristics. But for the proving of sufficiency of this condition the author does not use the ellipticity of the equation.