The Riemann-Hilbert boundary value problem for Carleman-Vekua equation with polar singularities (Q2827508)

The Riemann-Hilbert boundary value problem is investigated for the Carleman-Vekua equation \(w_{\overline{z}}=Aw+B\overline{w}=0\) in multiply connected plane domains \(G\) having finitely many polar singularities. While \(B\) is assumed to belong to \(L_p(G)\), \(2<p\), the coefficient \(A\) has certain poles in \(G\).NEWLINENEWLINEConditions are given under which the homogeneous problem has finitely many or infinitely many linearly independent solutions in function classes with a certain local behavior at the poles. Also for the inhomogeneous problem, necessary and sufficient solvability conditions are given. The results are sharp in the sense that if the conditions given are violated no solutions exist in the prescribed function classes.