Abstract
Given a vector function \(\mathbf F =(F_1,\ldots ,F_d),\) analytic on a neighborhood of some compact subset E of the complex plane with simply connected complement, we define a sequence of vector rational functions with common denominator in terms of the expansions of the components \(F_k, k=1,\ldots ,d,\) with respect to the sequence of Faber polynomials associated with E. Such sequences of vector rational functions are analogous to row sequences of type II Hermite–Padé approximation. We give necessary and sufficient conditions for the convergence with geometric rate of the common denominators of the sequence of vector rational functions so constructed. The exact rate of convergence of these denominators is provided and the rate of convergence of the approximants is estimated. It is shown that the common denominators of the approximants detect the poles of the system of functions “closest” to E and their order.
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References
Andrievski, V.V., Blatt, H.P.: On the distribution of zeros of Faber polynomials. Comput. Methods Funct. Theory 11, 263–282 (2011)
Bosuwan, N.: Convergence of row sequences of simultaneous Padé-Faber approximants. Math. Notes 103, 683–693 (2018)
Bosuwan, N., López Lagomasino, G.: Inverse theorem on row sequences of linear Padé-orthogonal approximants. Comput. Methods Funct. Theory 15, 529–554 (2015)
Bosuwan, N., López Lagomasino, G.: Determining system poles using row sequences of orthogonal Hermite–Padé approximants. J. Approx. Theory 231, 14–40 (2018)
Buslaev, V.I.: An analogue of Fabry’s theorem for generalized Padé approximants. Sb. Math. 200, 39–106 (2009)
Cacoq, J., de la Calle Ysern, B., López Lagomasino, G.: Incomplete Padé approximation and convergence of row sequences of Hermite–Padé approximants. J. Approx. Theory 170, 59–77 (2013)
Cacoq, J., de la Calle Ysern, B., López Lagomasino, G.: Direct and inverse results on row sequences of Hermite–Padé approximants. Constr. Approx. 38, 133–160 (2013)
Curtiss, J.H.: Faber polynomials and the Faber series. Am. Math. Mon. 78, 577–596 (1971)
Gonchar, A.A.: Poles of rows of the Padé table and meromorphic continuation of functions. Sb. Math. 43, 527–546 (1981)
Mina-Diaz, E.: On the asymptotic behavior of Faber polynomials for domains with piecewise analytic boundary. Constr. Approx. 29, 421–448 (2009)
Graves-Morris, P.R., Saff, E.B.: A de Montessus Theorem for Vector-Valued Rational Interpolants. Lecture Notes in Mathematics, vol. 1105, pp. 227–242. Springer, Berlin (1984)
Papamichael, N., Soares, M.J., Stylianopoulos, N.S.: A numerical method for the computation of Faber polynomials for starlike domains. IMA J. Numer. Anal. 13, 182–193 (1993)
Suetin, P.K.: Series of Faber Polynomials. Gordon and Breach, Amsterdam (1998)
Suetin, S.P.: On the convergence of rational approximations to polynomial expansions in domains of meromorphy of a given function. Math USSR Sb. 34, 367–381 (1978)
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Nattapong Bosuwan was supported by the Strengthen Research Grant for New Lecturer from the Thailand Research Fund and the Office of the Higher Education Commission (MRG6080133) and Faculty of Science, Mahidol University. Guillermo López Lagomasino was supported by research Grant MTM2015-65888-C4-2-P from Ministerio de Economía, Industria y Competitividad.
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Bosuwan, N., López Lagomasino, G. Direct and Inverse Results on Row Sequences of Simultaneous Padé–Faber Approximants. Mediterr. J. Math. 16, 36 (2019). https://doi.org/10.1007/s00009-019-1307-0
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DOI: https://doi.org/10.1007/s00009-019-1307-0
Keywords
- Montessus de Ballore’s theorem
- Faber polynomials
- simultaneous approximation
- Hermite–Padé approximation
- rate of convergence
- inverse results