The Riemann-Hilbert Problem - A Publication from the Steklov Institute of Mathematics Adviser: Armen Sergeev

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This book is devoted to Hilbert's 21st problem (the Riemann-Hilbert problem) which belongs to the theory of linear systems of ordinary differential equations in the complex domain. The problem concems the existence of a Fuchsian system with prescribed singularities and monodromy. Hilbert was convinced that such a system always exists. However, this tumed out to be a rare case of a wrong forecast made by hirn. In 1989 the second author (A.B.) discovered a counterexample, thus 1 obtaining a negative solution to Hilbert's 21st problem. After we recognized that some "data" (singularities and monodromy) can be obtai ned from a Fuchsian system and some others cannot, we are enforced to change our point of view. To make the terminology more precise, we shaII caII the foIIowing problem the Riemann-Hilbert problem for such and such data: does there exist a Fuchsian system having these singularities and monodromy? The contemporary version of the 21 st Hilbert problem is to find conditions implying a positive or negative solution to the Riemann-Hilbert problem.

Table des matières

1 Introduction.- 2 Counterexample to Hilbert's 21st problem.- 3 The Plemelj theorem.- 4 Irreducible representations.- 5 Miscellaneous topics.- 6 The case p = 3.- 7 Fuchsian equations.

A propos de l'auteur

Prof. Anosov und Prof. Bolibrukh sind beide am Steklov Institut in Moskau tätig.