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引用次数: 36
摘要
针对一类低正则性跳跃轮廓和跳跃矩阵,建立了n × n矩阵黎曼-希尔伯特问题理论。我们的基本假设是轮廓Γ是黎曼球中简单封闭Carleson曲线的有限并。特别地,允许有顶点、角和非横交点的无界轮廓。引入了L - p -Riemann-Hilbert问题的概念,建立了基本唯一性结果和Fredholm性质。我们还研究了Fredholmness对唯一可解性的意义,并证明了一个关于轮廓变形的定理。
Matrix Riemann-Hilbert problems with jumps across Carleson contours.
We develop a theory of -matrix Riemann-Hilbert problems for a class of jump contours and jump matrices of low regularity. Our basic assumption is that the contour is a finite union of simple closed Carleson curves in the Riemann sphere. In particular, unbounded contours with cusps, corners, and nontransversal intersections are allowed. We introduce a notion of -Riemann-Hilbert problem and establish basic uniqueness results and Fredholm properties. We also investigate the implications of Fredholmness for the unique solvability and prove a theorem on contour deformation.
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