Global Fuchsian Goursat problem in the class of holomorphic-Gevrey functions (Q2471353)
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| English | Global Fuchsian Goursat problem in the class of holomorphic-Gevrey functions |
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Global Fuchsian Goursat problem in the class of holomorphic-Gevrey functions (English)
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22 February 2008
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The authors consider linear partial differential operators in the operators in two groups of variables: \(x\in\mathbb{C}^n\), \(y\in\Omega\), open neighborhood of the origin in \(\mathbb{R}^q\): \[ P= \sum_{|\alpha|+ d|\beta|\leq m} a_{\alpha,\beta}(x,y) D^\alpha_x D^\beta_y,\quad d\geq 1, \] were the coefficients are analytic with respect to \(x\) and Gevrey with respect to \(y\). The operator \(P\) is assumed to be multi-Fuchsian of order \(\mu\in \mathbb{N}^n\) with respect to the \(x\)-variables, in particular for \(\alpha>\mu\), \[ a_{\alpha,0}(x,y)= x^{\alpha-\mu} b_{\alpha, 0}(x, y). \] Under suitable assumptions on the characteristic polynomial, a precise result of well-posedness is proved for the Goursat problem \(Pu= f\), \(u- w= 0(x^\mu)\). See \textit{D. Gourdin} and \textit{M. Mechab} [J. Funct. Anal. 202, No. 1, 123--146 (2003; Zbl 1035.35002)] for a similar functional frame in the non-characteristic case.
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Fuchsian partial differential operators
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Gevrey classes
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Goursat problem
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