Application of the subdomain method to the approximate solution of singular integral equations on closed integration contours (Q2388022)

The approximation solution of singular integral equations \[ c(t)\varphi(t)+d(t)\frac{1}{\pi i}\int_\Gamma\frac{\varphi(\tau)}{\tau-t}d\tau+\frac{1}{2\pi i}\int_{\Gamma}h(t,\tau) \varphi(\tau)\,d\tau=f(t),\quad t\in\Gamma \] is presented based on the Lozinskii interpolation polynomials using Lozinskii interpolation operator and the subdomain method, where \(c(t), d(t), h(t,\tau)\) and \(f(t)\) are given functions on \(\Gamma\) and \(\varphi(t)\) is the unknown function.