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Zhurnal Srednevolzhskogo Matematicheskogo Obshchestva, 2021, Volume 23, Number 2, Pages 185–192
DOI: https://doi.org/10.15507/2079-6900.23.202102.185-192
(Mi svmo796)
 

Mathematics

Simplification method for nonlinear equations of monotone type in Banach space

I. P. Ryazantseva

Nizhny Novgorod State Technical University
References:
Abstract: In a Banach space, we study an operator equation with a monotone operator $T.$ The operator is an operator from a Banach space to its conjugate, and $T=AC,$ where $A$ and $C$ are operators of some classes. The considered problem belongs to the class of ill-posed problems. For this reason, an operator regularization method is proposed to solve it. This method is constructed using not the operator $T$ of the original equation, but a more simple operator $A,$ which is $B$-monotone, $B=C^{-1}.$ The existence of the operator $B$ is assumed. In addition, when constructing the operator regularization method, we use a dual mapping with some gauge function. In this case, the operators of the equation and the right-hand side of the given equation are assumed to be perturbed. The requirements on the geometry of the Banach space and on the agreement conditions for the perturbation levels of the data and of the regularization parameter are established, which provide a strong convergence of the constructed approximations to some solution of the original equation. An example of a problem in Lebesgue space is given for which the proposed method is applicable.
Keywords: Banach space, conjugate space, strictly convex space, $E$-space, monotone operator, $B$-monotone operator, dual map with gauge function, operator regularization method, perturbed data, convergence.
Document Type: Article
UDC: 519.624
MSC: 65J15
Language: Russian
Citation: I. P. Ryazantseva, “Simplification method for nonlinear equations of monotone type in Banach space”, Zhurnal SVMO, 23:2 (2021), 185–192
Citation in format AMSBIB
\Bibitem{Rya21}
\by I.~P.~Ryazantseva
\paper Simplification method for nonlinear equations of monotone type in Banach space
\jour Zhurnal SVMO
\yr 2021
\vol 23
\issue 2
\pages 185--192
\mathnet{http://mi.mathnet.ru/svmo796}
\crossref{https://doi.org/10.15507/2079-6900.23.202102.185-192}
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    Zhurnal Srednevolzhskogo Matematicheskogo Obshchestva
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