On the existence of compacta of minimal capacity in the theory of rational approximation of multi-valued analytic functions
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Publication:268419
DOI10.1016/j.jat.2015.08.002zbMath1347.41014arXiv1505.06120OpenAlexW1505883570MaRDI QIDQ268419
Sergey P. Suetin, Viktor I. Buslaev
Publication date: 15 April 2016
Published in: Journal of Approximation Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1505.06120
rational approximantsorthogonal polynomialsPadé approximationconvergence in capacitydistribution of poles
Related Items (7)
An analog of Gonchar's theorem for the \(m\)-point version of Leighton's conjecture ⋮ Continued fractions with limit periodic coefficients ⋮ The Gonchar-Stahl $ \rho^2$-theorem and associated directions in the theory of rational approximations of analytic functions ⋮ On the Van Vleck theorem for limit-periodic continued fractions of general form ⋮ The capacity of the rational preimage of a compact set ⋮ On singular points of meromorphic functions determined by continued fractions ⋮ On a new approach to the problem of distribution of zeros of Hermite-Padé polynomials for a Nikishin system
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