N. R. Ikonomov, R. K. Kovacheva, S. P. Suetin
Published 2015-01-28Version 1
We introduce and analyze some numerical results obtained by the authors experimentally. These experiments are related to the well known problem about the distribution of the zeros of Hermite--Pad\'e polynomials for a collection of three functions $[f_0 \equiv 1,f_1,f_2]$. The numerical results refer to two cases: a pair of functions $f_1,f_2$ forms an Angelesco system and a pair of functions $f_1=f,f_2=f^2$ forms a (generalized) Nikishin system. The authors hope that the obtained numerical results will set up a new conjectures about the limiting distribution of the zeros of Hermite--Pad\'e polynomials.
Comments: Bibliography: 71 titles; 79 pictures
On a new approach to the problem of the zero distribution of Hermite-Padé polynomials for a Nikishin system
High order recurrence relation, Hermite-Padé approximation, and Nikishin systems
Mixed type multiple orthogonal polynomials for two Nikishin systems
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