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Difference between revisions of "Nekrasov integral equation"

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A non-linear integral equation of the form
 
A non-linear integral equation of the form
  
$$\phi(x)=\lambda\int\limits_a^b[\phi(y)+R(\lambda,y,\phi(y))]K(x,y)dy,\tag{*}$$
+
$$\phi(x)=\lambda\int\limits_a^b[\phi(y)+R(\lambda,y,\phi(y))]K(x,y)\,dy,\label{*}\tag{*}$$
  
where $R$ and $K$ are known functions, $K$ being symmetric, $\phi$ is the unknown function, and $\lambda$ is a numerical parameter. Integral equations of this type were obtained by A.I. Nekrasov (see [[#References|[1]]]) in the solution of problems arising in the theory of waves on the surface of a fluid. Under certain conditions Nekrasov has constructed a solution of \ref{*} in the form of a series in powers of a small parameter; its convergence has been proved by the method of majorants.
+
where $R$ and $K$ are known functions, $K$ being symmetric, $\phi$ is the unknown function, and $\lambda$ is a numerical parameter. Integral equations of this type were obtained by A.I. Nekrasov (see [[#References|[1]]]) in the solution of problems arising in the theory of waves on the surface of a fluid. Under certain conditions Nekrasov has constructed a solution of \eqref{*} in the form of a series in powers of a small parameter; its convergence has been proved by the method of majorants.
  
Sometimes an equation of the type \ref{*} is called a [[Hammerstein equation|Hammerstein equation]], although Nekrasov [[#References|[2]]] published his investigations before A. Hammerstein [[#References|[3]]].
+
Sometimes an equation of the type \eqref{*} is called a [[Hammerstein equation|Hammerstein equation]], although Nekrasov [[#References|[2]]] published his investigations before A. Hammerstein [[#References|[3]]].
  
 
====References====
 
====References====

Latest revision as of 17:24, 14 February 2020

A non-linear integral equation of the form

$$\phi(x)=\lambda\int\limits_a^b[\phi(y)+R(\lambda,y,\phi(y))]K(x,y)\,dy,\label{*}\tag{*}$$

where $R$ and $K$ are known functions, $K$ being symmetric, $\phi$ is the unknown function, and $\lambda$ is a numerical parameter. Integral equations of this type were obtained by A.I. Nekrasov (see [1]) in the solution of problems arising in the theory of waves on the surface of a fluid. Under certain conditions Nekrasov has constructed a solution of \eqref{*} in the form of a series in powers of a small parameter; its convergence has been proved by the method of majorants.

Sometimes an equation of the type \eqref{*} is called a Hammerstein equation, although Nekrasov [2] published his investigations before A. Hammerstein [3].

References

[1] A.I. Nekrasov, "Collected works" , 1 , Moscow (1961) (In Russian)
[2] A.I. Nekrasov, Izv. Ivanovo-Vozn. Politekhn. Inst. , 6 (1922) pp. 155–171
[3] A. Hammerstein, "Nichtlineare Integralgleichungen nebst Anwendungen" Acta Math. , 54 (1930) pp. 117–176


Comments

References

[a1] P.P. Zabreiko (ed.) A.I. Koshelev (ed.) M.A. Krasnoselskii (ed.) S.G. Mikhlin (ed.) L.S. Rakovshchik (ed.) V.Ya. Stet'senko (ed.) T.O. Shaposhnikova (ed.) R.S. Anderssen (ed.) , Integral equations - a reference text , Noordhoff (1975) (Translated from Russian)
How to Cite This Entry:
Nekrasov integral equation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Nekrasov_integral_equation&oldid=44756
This article was adapted from an original article by B.V. Khvedelidze (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article