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Riemann–Hilbert : ウィキペディア英語版
Riemann–Hilbert problem

In mathematics, Riemann–Hilbert problems, named after Bernhard Riemann and David Hilbert, are a class of problems that arise in the study of differential equations in the complex plane. Several existence theorems for Riemann–Hilbert problems have been produced by Krein, Gohberg and others (see the book by Clancey and Gohberg (1981)).
==The Riemann problem==
Suppose that Σ is a closed simple contour in the complex plane dividing the plane into two parts denoted by Σ+ (the inside) and Σ (the outside), determined by the index of the contour with respect to a point. The classical problem, considered in Riemann's PhD dissertation (see ), was that of finding a function
:M_+(z) = u(z) + i v(z)\!
analytic inside Σ+ such that the boundary values of ''M''+ along Σ satisfy the equation
:a(z)u(z) - b(z)v(z) = c(z) \!
for all ''z'' ∈ Σ, where ''a'', ''b'', and ''c'' are given real-valued functions .
By the Riemann mapping theorem, it suffices to consider the case when Σ is the unit circle . In this case, one may seek ''M''+(''z'') along with its Schwarz reflection:
:M_-(z) = \overline\right)}.
On the unit circle Σ, one has z = 1/\bar, and so
:M_-(z) = \overline,\quad z\in\Sigma.
Hence the problem reduces to finding a pair of functions ''M''+(''z'') and ''M''(''z'') analytic, respectively, on the inside and the outside of the unit disc, so that on the unit circle
:\fracM_+(z) + \fracM_-(z) = c(z),
and, moreover, so that the condition at infinity holds:
:\lim_M_-(z) = \bar_+(0).

抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)
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