Convergence in Hausdorff Content of Generalized Simultaneous Pade Approximants
Methawee Wajasat, Nattapong Bosuwan
Keywords:
Hermite-Pad´e approximation, simultaneous Pad´e approximation, Faber polynomials, orthogonal polynomials, Montessus de Ballore’s theorem, Hausdorff contentAbstract
Given a vector of the approximated functions analytic on a neighborhood of some compact subset of the complex plane with simply connected complement in the extended complex plane, we prove convergences in Hausdorff content of the corresponding two generalizations of type II Hermite-Pade approximants on some certain sequences. These two generalizations are based on orthogonal and Faber polynomial expansions. As consequences of these convergence results, we give alternate proofs of Montessus de Ballore type theorems for these generalizations.
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Published
2020-03-05
How to Cite
Team, S. (2020). Convergence in Hausdorff Content of Generalized Simultaneous Pade Approximants: Methawee Wajasat, Nattapong Bosuwan. Thai Journal of Mathematics, 1–23. Retrieved from https://thaijmath2.in.cmu.ac.th/index.php/thaijmath/article/view/952
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