A reliable treatment to solve nonlinear Fredholm integral equations with non-separable kernel

[EN] This work is devoted to solve integral equations formulated in terms of the kernel functions and Nemytskii operators. This type of equations appear in different applied problems such as electrostatics and radiative heat transfer problems. We deal with both cases separable and non-separable kern...

ver descrição completa

Detalhes bibliográficos
Autores: Hernández-Verón, M. A., Singh, Sukhjit, Martínez Molada, Eulalia|||0000-0003-2869-4334
Tipo de documento: artigo
Data de publicação:2022
País:España
Recursos:Universitat Politècnica de València (UPV)
Repositório:RiuNet. Repositorio Institucional de la Universitat Politécnica de Valéncia
Idioma:inglês
OAI Identifier:oai:riunet.upv.es:10251/192056
Acesso em linha:https://riunet.upv.es/handle/10251/192056
Access Level:Acceso aberto
Palavra-chave:Nemytskii operator
Non-separable kernel
Two-steps Newton iterative scheme
Domain of existence of solution
Domain of uniqueness of solution
MATEMATICA APLICADA
Descrição
Resumo:[EN] This work is devoted to solve integral equations formulated in terms of the kernel functions and Nemytskii operators. This type of equations appear in different applied problems such as electrostatics and radiative heat transfer problems. We deal with both cases separable and non-separable kernels by setting the theoretical semilocal convergence results for an adequate iterative scheme that can be useful for approximating the solution of the infinite dimensional problem. We pay special attention to non-separable kernels avoiding the solution given in previous works where the original nonlinear integral equation has been approximated by means of an equation with separable kernel. However, in this case, we introduce an approximation of the derivative operator that it is needed for applying the iterative scheme considered. Moreover, we study the localization and separation of possible solutions of nonlinear integral equation by means of a result of semilocal convergence for the iterative scheme considered. The theoretical results obtained have been tested with some applied problems showing competitive results. (c) 2020 Elsevier B.V. All rights reserved.