Solving the hammerstein integral equation in the irregular case by successive approximations

N. A. Sidorov; D. N. Sidorov

doi:10.1007/s11202-010-0033-4

Solving the hammerstein integral equation in the irregular case by successive approximations

N. A. Sidorov
, D. N. Sidorov

Research output: Contribution to journal › Article › peer-review

14 Scopus citations

Abstract

The branches of a solution of the nonlinear integral equation where and λ is a parameter, are constructed by successive approximations. Under consideration is the case when unity is a characteristic number of the kernel K(x, s) of rank n ≥ 1, and λ = 0 is a bifurcation point. The principal term of the asymptotic expansion constructed is used as an initial approximation. The uniform convergence is established in some neighborhood about the bifurcation point on using the implicit function theorem and the Schmidt lemma.

Original language	English
Pages (from-to)	325-329
Number of pages	5
Journal	Siberian Mathematical Journal
Volume	51
Issue number	2
DOIs	https://doi.org/10.1007/s11202-010-0033-4
State	Published - 2010
Externally published	Yes

Keywords

Bifurcation
Hammerstein equation
Successive approximation

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10.1007/s11202-010-0033-4

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title = "Solving the hammerstein integral equation in the irregular case by successive approximations",

abstract = "The branches of a solution of the nonlinear integral equation where and λ is a parameter, are constructed by successive approximations. Under consideration is the case when unity is a characteristic number of the kernel K(x, s) of rank n ≥ 1, and λ = 0 is a bifurcation point. The principal term of the asymptotic expansion constructed is used as an initial approximation. The uniform convergence is established in some neighborhood about the bifurcation point on using the implicit function theorem and the Schmidt lemma.",

keywords = "Bifurcation, Hammerstein equation, Successive approximation",

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doi = "10.1007/s11202-010-0033-4",

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AU - Sidorov, N. A.

AU - Sidorov, D. N.

PY - 2010

Y1 - 2010

N2 - The branches of a solution of the nonlinear integral equation where and λ is a parameter, are constructed by successive approximations. Under consideration is the case when unity is a characteristic number of the kernel K(x, s) of rank n ≥ 1, and λ = 0 is a bifurcation point. The principal term of the asymptotic expansion constructed is used as an initial approximation. The uniform convergence is established in some neighborhood about the bifurcation point on using the implicit function theorem and the Schmidt lemma.

AB - The branches of a solution of the nonlinear integral equation where and λ is a parameter, are constructed by successive approximations. Under consideration is the case when unity is a characteristic number of the kernel K(x, s) of rank n ≥ 1, and λ = 0 is a bifurcation point. The principal term of the asymptotic expansion constructed is used as an initial approximation. The uniform convergence is established in some neighborhood about the bifurcation point on using the implicit function theorem and the Schmidt lemma.

KW - Bifurcation

KW - Hammerstein equation

KW - Successive approximation

UR - https://www.scopus.com/pages/publications/77952055332

U2 - 10.1007/s11202-010-0033-4

DO - 10.1007/s11202-010-0033-4

M3 - 文章

AN - SCOPUS:77952055332

SN - 0037-4466

VL - 51

SP - 325

EP - 329

JO - Siberian Mathematical Journal

JF - Siberian Mathematical Journal

IS - 2

ER -

Solving the hammerstein integral equation in the irregular case by successive approximations

Abstract

Keywords

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