On a class of nonlinear singular integral equations with shift on a closed contour

“…There is a literature on the successful development of the nonlinear singular integral equations with shift (NSIES) [1,3,4,15,18,20]. The Noether theory of singular integral operators with shift (SIOS) is developed for a closed and open contour ( [2,10,13,14,16,18] and others). The theory of singular integral equations with shift (SIES) is an important part of integral equations because of its recent applications in many fields of physics and engineering, [6,14,16].…”

On the Application of New Convergence Criteria for Kantorovich Method to Nonlinear Singular Integral Equation with Shift

“…There is a literature on the successful development of the nonlinear singular integral equations with shift (NSIES) [1,3,4,15,18,20]. The Noether theory of singular integral operators with shift (SIOS) is developed for a closed and open contour ( [2,10,13,14,16,18] and others). The theory of singular integral equations with shift (SIES) is an important part of integral equations because of its recent applications in many fields of physics and engineering, [6,14,16].…”

On the Application of New Convergence Criteria for Kantorovich Method to Nonlinear Singular Integral Equation with Shift

The method of Kantorovich majorants to nonlinear singular integral equation with shift

Newton–Kantorovich approximations to nonlinear singular integral equation with shift