Abstract:
For an integral equation on the unit circle $\Gamma$ of the form $(aI+bS+K)f=g$, where $a$ and $b$ are Hölder functions, $S$ is a singular integration operator, and $K$ is an integral operator with Hölder kernel, we consider a method of solution based on the discretization of integral operators using the rectangle rule. This method is justified under the assumption that the equation is solvable in $L_2(\Gamma)$ and the coefficients $a$ and $b$ satisfy the strong ellipticity condition.
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