A finite difference method for quasi-linear and nonlinear differential functional parabolic equations with Neumann’s condition

Lucjan Sapa

Commentationes Mathematicae (2009)

  • Volume: 49, Issue: 1
  • ISSN: 2080-1211

Abstract

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Classical solutions of nonlinear second-order partial differential functional equations of parabolic type with Neumann’s condition are approximated in the paper by solutions of associated explicit difference functional equations. The functional dependence is of the Volterra type. Nonlinear estimates of the generalized Perron type for given functions are assumed. The convergence and stability results are proved with the use of the comparison technique. These theorems in particular cover quasi-linear equations, but such equations are also treated separately. The known results on similar difference methods can be obtained as particular cases of our simple result.

How to cite

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Lucjan Sapa. "A finite difference method for quasi-linear and nonlinear differential functional parabolic equations with Neumann’s condition." Commentationes Mathematicae 49.1 (2009): null. <http://eudml.org/doc/292345>.

@article{LucjanSapa2009,
abstract = {Classical solutions of nonlinear second-order partial differential functional equations of parabolic type with Neumann’s condition are approximated in the paper by solutions of associated explicit difference functional equations. The functional dependence is of the Volterra type. Nonlinear estimates of the generalized Perron type for given functions are assumed. The convergence and stability results are proved with the use of the comparison technique. These theorems in particular cover quasi-linear equations, but such equations are also treated separately. The known results on similar difference methods can be obtained as particular cases of our simple result.},
author = {Lucjan Sapa},
journal = {Commentationes Mathematicae},
keywords = {parabolic differential functional equations; difference methods; nonlinear estimates of the generalized Perron type},
language = {eng},
number = {1},
pages = {null},
title = {A finite difference method for quasi-linear and nonlinear differential functional parabolic equations with Neumann’s condition},
url = {http://eudml.org/doc/292345},
volume = {49},
year = {2009},
}

TY - JOUR
AU - Lucjan Sapa
TI - A finite difference method for quasi-linear and nonlinear differential functional parabolic equations with Neumann’s condition
JO - Commentationes Mathematicae
PY - 2009
VL - 49
IS - 1
SP - null
AB - Classical solutions of nonlinear second-order partial differential functional equations of parabolic type with Neumann’s condition are approximated in the paper by solutions of associated explicit difference functional equations. The functional dependence is of the Volterra type. Nonlinear estimates of the generalized Perron type for given functions are assumed. The convergence and stability results are proved with the use of the comparison technique. These theorems in particular cover quasi-linear equations, but such equations are also treated separately. The known results on similar difference methods can be obtained as particular cases of our simple result.
LA - eng
KW - parabolic differential functional equations; difference methods; nonlinear estimates of the generalized Perron type
UR - http://eudml.org/doc/292345
ER -

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