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 Mark Krein, Israel Gohberg and others.
Suppose that
\Sigma
z
\Sigma+
\Sigma-
M+(t)=u(t)+iv(t),
analytic inside
\Sigma+
M+
\Sigma
a(t)u(t)-b(t)v(t)=c(t),
t\in\Sigma
a(t)
b(t)
c(t)
a=1,b=0
\Sigma
By the Riemann mapping theorem, it suffices to consider the case when
\Sigma
M+(z)
M-(z)=
| -1 | |
| \overline{M | |
| +\left(\bar{z} |
\right)}.
For
z\inT
z=1/\bar{z}
M-(z)=\overline{M+(z)}.
Hence the problem reduces to finding a pair of analytic functions
M+(z)
M-(z)
| a(z)+ib(z) | |
| 2 |
M+(z)+
| a(z)-ib(z) | |
| 2 |
M-(z)=c(z),
and, moreover, so that the condition at infinity holds:
\limz\toinftyM-(z)=\overline{{M}+(0)}.
See also: Wiener-Hopf method. Hilbert's generalization of the problem attempted to find a pair of analytic functions
M+(t)
M-(t)
\Sigma
t\in\Sigma
\alpha(t)M+(t)+\beta(t)M-(t)=\gamma(t)
where
\alpha(t)
\beta(t)
\gamma(t)
In the Riemann problem as well as Hilbert's generalization, the contour
\Sigma
\Sigma
M+(t)
M-(t)
\Sigma
t\in\Sigma
\alpha(t)M+(t)+\beta(z)M-(t)=\gamma(t).
\alpha(t)
\beta(t)
\gamma(t)
Given an oriented contour
\Sigma
Given a matrix function
G(t)
\Sigma
M(z)
\Sigma
M+
M-
M
\Sigma
M+(t)=G(t)M-(t)
\Sigma
M(z)
IN
z\toinfty
\Sigma
In the simplest case
G(t)
M+
M-
L2
\Sigma
M
Suppose
G=2
\Sigma=[-1,1]
M
M
To solve this, let's take the logarithm of equation
M+=GM-
logM+(z)=logM-(z)+log2.
Since
M(z)
1
logM\to0
z\toinfty
A standard fact about the Cauchy transform is that
C+-C-=I
C+
C-
\Sigma
| 1 | |
| 2\pii |
| \int | |
| \Sigma+ |
| log2 | |
| \zeta-z |
d\zeta-
| 1 | |
| 2\pii |
| \int | |
| \Sigma- |
| log{2 | |
z\in\Sigma
logM=
| 1 | |
| 2\pii |
\int\Sigma
| log{2 | |
and therefore
M(z)=\left(
| z-1 | |
| z+1 |
| ||||
| \right) |
{2\pii}},
which has a branch cut at contour
\Sigma
Check:
\begin{align} M+(0)&=(ei\pi
| ||||
| ) |
=
| ||||
| e |
\ M-(0)&=(e-i\pi
| ||||
| ) |
=
| ||||
| e |
\end{align}
therefore,
M+(0)=M
| log{2 | |
| -(0)e |
CAVEAT 1: If the problem is not scalar one cannot easily take logarithms. In general explicit solutions are very rare.
CAVEAT 2: The boundedness (or at least a constraint on the blow-up) of
M
1
-1
M(z)=\left(
| z-1 | |
| z+1 |
| ||||
| \right) |
{2\pii}}+
| a | |
| z-1 |
+
| b | |
| z+1 |
See main article: DBAR problem. Suppose
D
z
| \partialM(z,\bar{z | |
| )}{\partial |
\bar{z}}=f(z,\bar{z}), z\inD,
\overline{\partial}
M=u+iv, f=
| g+ih | |
| 2 |
, z=x+iy,
u(x,y)
v(x,y)
g(x,y)
h(x,y)
x
y
| \partial | |
| \partial\bar{z |
| \partialu | - | |
| \partialx |
| \partialv | |
| \partialy |
=g(x,y),
| \partialu | |
| \partialy |
+
| \partialv | |
| \partialx |
=h(x,y).
M
z\inD
In case
M\to1
z\toinfty
D:=C
M(z,\bar{z})=1+
| 1 | |
| 2\pii |
| \iint | |
| R2 |
| f(\zeta,\bar{\zeta | |
| )}{\zeta |
-z}d\zeta\wedged\bar{\zeta},
R2
d\zeta\wedged\bar{\zeta}=(d\xi+idη)\wedge(d\xi-idη)=-2id\xidη.
If a function
M(z)
R
| \partialM | |
| \partial\bar{z |
R
| \partialM | |
| \partial\bar{z |
R
\overline{M}
M
A(z,\bar{z})
B(z,\bar{z})
z
\bar{z}
Generalized analytic functions have applications in differential geometry, in solving certain type of multidimensional nonlinear partial differential equations and multidimensional inverse scattering.
Riemann–Hilbert problems have applications to several related classes of problems.
The numerical analysis of Riemann–Hilbert problems can provide an effective way for numerically solving integrable PDEs (see e.g.).
In particular, Riemann–Hilbert factorization problems are used to extract asymptotic values for the three problems above (say, as time goes to infinity, or as the dispersion coefficient goes to zero, or as the polynomial degree goes to infinity, or as the size of the permutation goes to infinity). There exists a method for extracting the asymptotic behavior of solutions of Riemann–Hilbert problems, analogous to the method of stationary phase and the method of steepest descent applicable to exponential integrals.
By analogy with the classical asymptotic methods, one "deforms" Riemann–Hilbert problems which are not explicitly solvable to problems that are. The so-called "nonlinear" method of stationary phase is due to, expanding on a previous idea by and and using technical background results from and . A crucial ingredient of the Deift–Zhou analysis is the asymptotic analysis of singular integrals on contours. The relevant kernel is the standard Cauchy kernel (see ; also cf. the scalar example below).
An essential extension of the nonlinear method of stationary phase has been the introduction of the so-called finite gap g-function transformation by, which has been crucial in most applications. This was inspired by work of Lax, Levermore and Venakides, who reduced the analysis of the small dispersion limit of the KdV equation to the analysis of a maximization problem for a logarithmic potential under some external field: a variational problem of "electrostatic" type (see). The g-function is the logarithmic transform of the maximizing "equilibrium" measure. The analysis of the small dispersion limit of KdV equation has in fact provided the basis for the analysis of most of the work concerning "real" orthogonal polynomials (i.e. with the orthogonality condition defined on the real line) and Hermitian random matrices. Perhaps the most sophisticated extension of the theory so far is the one applied to the "non self-adjoint" case, i.e. when the underlying Lax operator (the first component of the Lax pair) is not self-adjoint, by . In that case, actual "steepest descent contours" are defined and computed. The corresponding variational problem is a max-min problem: one looks for a contour that minimizes the "equilibrium" measure. The study of the variational problem and the proof of existence of a regular solution, under some conditions on the external field, was done in ; the contour arising is an "S-curve", as defined and studied in the 1980s by Herbert R. Stahl, Andrei A. Gonchar and Evguenii A Rakhmanov.
An alternative asymptotic analysis of Riemann–Hilbert factorization problems is provided in, especially convenient when jump matrices do not have analytic extensions. Their method is based on the analysis of d-bar problems, rather than the asymptotic analysis of singular integrals on contours. An alternative way of dealing with jump matrices with no analytic extensions was introduced in .
Another extension of the theory appears in where the underlying space of the Riemann–Hilbert problem is a compact hyperelliptic Riemann surface. The correct factorization problem is no more holomorphic, but rather meromorphic, by reason of the Riemann–Roch theorem. The related singular kernel is not the usual Cauchy kernel, but rather a more general kernel involving meromorphic differentials defined naturally on the surface (see e.g. the appendix in). The Riemann–Hilbert problem deformation theory is applied to the problem of stability of the infinite periodic Toda lattice under a "short range" perturbation (for example a perturbation of a finite number of particles).
Most Riemann–Hilbert factorization problems studied in the literature are 2-dimensional, i.e., the unknown matrices are of dimension 2. Higher-dimensional problems have been studied by Arno Kuijlaars and collaborators, see e.g. .