The Riemann boundary problem with a plus-infinite index of logarithmic order for a complicated contour (Q1925156)

Let \(L=\bigcup^m_{j=1} L_j\), where \(L_j=\{z\in\mathbb{C}:\arg z=\beta_j\}\), \(0<\beta_1<\beta_2<\cdots< \beta_m<2\pi\). The author considers on \(L\backslash(0,\infty)\) the Riemann boundary value problem \(\Phi^+=G\Phi^-+g\), where the coefficient \(G\) has a multilateral vorticity of the logarithmic order at the point \(t=\infty\). The solutions are in a class of bounded functions.