Differential operators that determine the solution of a certain class of equations of elliptic type (Q913093)

The author constructs the differential operators \(Lg(z)\) and \(N\overline{f(z)}\) which transfer arbitrary holomorphic functions in a simple connected domain \({\mathcal D}\) of the plane \(z=x+iy\) into regular solutions of the equation \[ W_{z\bar z}+(n-m)\phi'(z)(\phi(z)+ \overline{\psi(z)})^{-1} W_{\bar z}- n(m+1)\phi'(z)\overline{\psi'(z)}(\phi(z)+\overline{\psi (z)})^{-2} W=0. \] Here \(\phi(z)\), \(\psi(z)\) are holomorphic function satisfying the condition \((\phi(z)+\overline{\psi(z)})\phi'(z)\psi'(z)\neq 0\); \(n,m\in N\cup \{0\}\). The author applies these results to solve certain boundary value problems in a half-plane \(x>0\).