Green-Rvachev's quasi-function method for constructing two-sided approximations to positive solution of nonlinear boundary value problems

Authors

https://doi.org/10.15330/cmp.10.2.360-375

Keywords:

positive solution, semilinear elliptic boundary value problem, heterotone operator, two-sided approach, Green-Rvachev's quasi-function
Published online: 2018-12-31

Abstract

A homogeneous Dirichlet problem for a semilinear elliptic equations with the Laplace operator and Helmholtz operator is investigated. To construct the two-sided approximations to a positive solution of this boundary value problem the transition to an equivalent nonlinear integral equation (with the help of the Green-Rvachev's quasi-function) with its subsequent analysis by methods of the theory of semi-ordered spaces is used. The work and efficiency of the developed method are demonstrated by a computational experiment for a test problem with exponential nonlinearity.
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How to Cite
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Sidorov, M. Green-Rvachev’s Quasi-Function Method for Constructing Two-Sided Approximations to Positive Solution of Nonlinear Boundary Value Problems. Carpathian Math. Publ. 2018, 10, 360-375.