Equivalence of a Scalar and a Vector Equilibrium Problem for a Pair of Functions Forming a Nikishin System

Suetin, Sergey Pavlovich

doi:10.1134/s0001434619110336

Cited by 3 publications

(16 citation statements)

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“…1.1. The present paper continues the studies initiated by the second author in [28] and [33]. In these papers, a new scalar approach to the problem on the limit distribution of the zeros of Hermite-Padé polynomials for a pair of functions forming a Nikishin system was proposed and shown to be equivalent to the traditional vector approach (see [33], Theorem 1).…”

Section: Introduction and Statement Of The Problemmentioning

confidence: 57%

“…The present paper continues the studies initiated by the second author in [28] and [33]. In these papers, a new scalar approach to the problem on the limit distribution of the zeros of Hermite-Padé polynomials for a pair of functions forming a Nikishin system was proposed and shown to be equivalent to the traditional vector approach (see [33], Theorem 1). We recall that the traditional approach to this problem is based on the solution of a vector equilibrium problem in potential theory with a 2 × 2-matrix (known as the Nikishin matrix); see, first of all, [21], [22], [9], and [10], and also [1], [4], [17], and [18], and the references given therein.…”

Section: Introduction and Statement Of The Problemmentioning

confidence: 57%

“…In [28] it was shown that the limit distribution of the zeros of Hermite-Padé polynomials of type I coincides with the measure λ = π 2 (λ), where π 2 is the canonical projection (a two-sheeted covering) of the Riemann surface under consideration to the Riemann sphere. In the present paper, the scalar equilibrium measure λ is used to characterize the limit distribution of the zeros of Hermite-Padé polynomials of type II for the same pair of functions f 1 and f 2 as in the papers [28] and [33] (see Section 1.2 below). As was already pointed out, on an example of two Markov functions f 1 and f 2 considered here (see formula (1.1) below) it was shown in [33] that these two approaches (the vector and scalar ones) are equivalent.…”

Section: Introduction and Statement Of The Problemmentioning

confidence: 99%

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Scalar equilibrium problem and the limit distribution of the zeros of Hermite-Padé polynomials of type II

Ikonomov¹,

Suetin²

2019

Preprint

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The existence of the limit distribution of the zeros of Hermite-Padé polynomials of type II for a pair of functions forming a Nikishin system is proved using the scalar equilibrium problem posed on the two-sheeted Riemann surface.The relation of the results obtained here to some results of H. Stahl (1988) is discussed. Results of numerical experiments are presented. The results of the present paper and those obtained in the earlier paper of the second author [28], [32], [33] are shown to be in good accordance with both H. Stahl's results and with results of numerical experiments. Bibliography: [35] titles. 4 figures.

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Section: Introduction and Statement Of The Problemmentioning

confidence: 57%

Section: Introduction and Statement Of The Problemmentioning

confidence: 57%

Section: Introduction and Statement Of The Problemmentioning

confidence: 99%

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Scalar equilibrium problem and the limit distribution of the zeros of Hermite-Padé polynomials of type II

Ikonomov¹,

Suetin²

2019

Preprint

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“…Thus, in the present paper, we further extend the new approach (which was proposed by the author in [30]) to the study of asymptotic properties of Hermite-Padé polynomials for multivalued functions. This approach is based on the extremal equilibrium problem posed not on the Riemann sphere, but instead on the Riemann surface R 2 (w) (further advances in this problem were made in [33], [12]).…”

Section: Introduction and The Statement Of The Main Resultsmentioning

confidence: 99%

“…(26) The facts that in (26) the identity holds on the entire compact set K and supp λ K = K were proved in [33].…”

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confidence: 99%

Structure of the Nuttall partition for some class of four-sheeted Riemann surfaces

Ikonomov¹,

Suetin²

2021

Preprint

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The structure of a Nuttall partition into sheets of some class of four-sheeted Riemann surfaces is studied. The corresponding class of multivalued analytic functions is a special class of algebraic functions of fourth order generated by the function inverse to the Zhukovskii function. We show that in this class of four-sheeted Riemann surfaces, the boundary between the second and third sheets of the Nuttall partition of the Riemann surface, is completely characterized in terms of an extremal problem posed on the two-sheeted Riemann surface of the function w defined by the equation w 2 = z 2 − 1. In particular, we show that in this class of functions the boundary between the second and third sheets does not intersect both the boundary between the first and second sheets and the boundary between the third and fourth sheets.Bibliography: [34] titles.

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Алгоритм Висковатова Для Полиномов Эрмита-Паде

Ikonomov

Suetin²

2021

Математический сборник

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Предлагается и обосновывается алгоритм нахождения полиномов Эрмита-Паде 1-го типа для произвольного набора из $m+1$ формальных степенных рядов $[f_0,…,f_m]$, $m\geq1$, заданных в точке $z=0$ ($f_j\in\mathbb C[[z]]$) в предположении, что эти ряды обладают определенным свойством невырожденности (находятся "в общем положении"). Предложенный алгоритм является непосредственным обобщением классического алгоритма Висковатова для нахождения полиномов Паде (т.е. при $m=1$ совпадает с этим алгоритмом). Алгоритм основан на рекуррентных соотношениях, и к моменту нахождения полиномов Эрмита-Паде, соответствующих мультииндексу $(k+1,k+1,k+1,…,k+1,k+1)$, оказываются найденными все полиномы Эрмита-Паде, соответствующие мультиндексам $(k,k,k,…,k,k)$, $(k+1,k,k,…,k,k)$, $(k+1,k+1,k,…,k,k)$, …, $(k+1,k+1,k+1,…,k+1,k)$. Показано, каким образом можно, изменив начальные условия, вычислять с помощью этого алгоритма рекуррентным образом и полиномы Эрмита-Паде, соответствующие мультииндексам другого вида. Алгоритм устроен таким образом, что на каждом $n$-м шаге итерации вычисления могут быть распараллелены на $m+1$ независимых вычислений. Библиография: 30 названий.

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Equivalence of a Scalar and a Vector Equilibrium Problem for a Pair of Functions Forming a Nikishin System

Abstract: We prove the equivalence of the vector and scalar equilibrium problems which arise naturally in the study of the limit zeros distribution of type I Hermite-Padé polynomials for a pair of functions forming a Nikishin system. Bibliography: 22 titles.

Cited by 3 publications

References 13 publications

Scalar equilibrium problem and the limit distribution of the zeros of Hermite-Padé polynomials of type II

Scalar equilibrium problem and the limit distribution of the zeros of Hermite-Padé polynomials of type II

Structure of the Nuttall partition for some class of four-sheeted Riemann surfaces

Алгоритм Висковатова Для Полиномов Эрмита-Паде

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