This talk deals with the numerical treatment of systems of Cauchy Singular integral equations with constant coefficients. A quadrature type method is proposed and its stability and convergence are proved in weighted $L^2$ spaces. Moreover it is shown that the procedure leads to solve a determined and well conditioned linear system.
A quadrature method for systems of Cauchy Singular Integral Equations
DE BONIS, Maria Carmela;LAURITA, Concetta
2010-01-01
Abstract
This talk deals with the numerical treatment of systems of Cauchy Singular integral equations with constant coefficients. A quadrature type method is proposed and its stability and convergence are proved in weighted $L^2$ spaces. Moreover it is shown that the procedure leads to solve a determined and well conditioned linear system.File in questo prodotto:
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