scientific article; zbMATH DE number 7829890
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Publication:6126904
Nattapong Bosuwan, Unnamed Author
Publication date: 10 April 2024
Full work available at URL: https://thaijmath2.in.cmu.ac.th/index.php/thaijmath/article/view/1476
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Approximation in the complex plane (30E10) Padé approximation (41A21) Inverse theorems in approximation theory (41A27)
Cites Work
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- Direct and inverse results on row sequences of Hermite-Padé approximants
- Inverse theorem on row sequences of linear Padé-orthogonal approximation
- Determining radii of meromorphy via orthogonal polynomials on the unit circle.
- Asymptotics of the denominators of the diagonal Padé approximations of orthogonal expansions
- Convergence of row sequences of simultaneous Padé-Faber approximants
- Convergence of row sequences of simultaneous Padé-orthogonal approximants
- On the boundedness of poles of generalized Padé approximants
- On Montessus de Ballore's theorem for simultaneous Padé-Faber approximants
- Determining system poles using row sequences of orthogonal Hermite-Padé approximants
- On the Fabry ratio theorem for orthogonal series
- Direct and inverse results on row sequences of simultaneous Padé-Faber approximants
- Direct and inverse results on row sequences of generalized Padé approximants to polynomial expansions
- An analogue of Fabry's theorem for generalized Padé approximants
- Convergence of Linear and Nonlinear Pade Approximants from Series of Orthogonal Polynomials
- INVERSE THEOREMS ON GENERALIZED PADÉ APPROXIMANTS
- ON THE CONVERGENCE OF RATIONAL APPROXIMATIONS TO POLYNOMIAL EXPANSIONS IN DOMAINS OF MEROMORPHY OF A GIVEN FUNCTION
- Convergence of row sequences of simultaneous Fourier-Pad\'e approximation
- Faber Polynomials and the Faber Series
- Asymptotics of orthogonal polynomials inside the unit circle and Szegő-Padé approximants
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