Your search keyword '"domain of convergence"' showing total 7 results

1. Domain of Existence of the Sum of a Series of Exponential Monomials.

Author

Krivosheev, A. S. and Krivosheeva, O. A.

Subjects

EXPONENTIAL sums, CONVEX domains, ARC length, GEOMETRIC series, CONDENSATION

Abstract

In the paper, series of exponential monomials are considered. We study the problem of the distribution of singular points of the sum of a series on the boundary of its domain of convergence. We study the conditions under which, for any sequence of coefficients of the series with a chosen domain of convergence, the domain of existence of the sum of this series coincides with the given domain of convergence. We consider sequences of exponents having an angular density (measurable) and the zero condensation index. Various criteria related to the distribution of singular points of the sum of a series of exponential monomials on the boundary of its convergence domain are obtained. In particular, in the class of the indicated sequences, a criterion is obtained that all boundary points of a chosen convex domain are special for any sum of a series with a given domain of convergence. The criteria are formulated using simple geometric characteristics of the sequence of exponents and a convex domain (the angular density and the length of the boundary arc). It is also shown that the condition that the condensation index is equal to zero is essential. [ABSTRACT FROM AUTHOR]

Published

2023

2. On the domain of convergence of general Dirichlet series with complex exponents.

Author

M. R., Kuryliak and O. B., Skaskiv

Subjects

COMPLEX numbers, CONVEX domains, EXPONENTS

Abstract

Let ( λ n ) be a sequence of the pairwise distinct complex numbers. For a formal Dirichlet series F ( z ) = + ∞ ∑ n = 0 a n e z λ n, z ∈ C, we denote G μ ( F ), G c ( F ), G a ( F ) the domains of the existence, of the convergence and of the absolute convergence of maximal term μ ( z, F ) = max { | a n | e R ( z λ n ) : n ≥ 0 }, respectively. It is well known that G μ ( F ), G a ( F ) are convex domains. Let us denote N 1 ( z ) := { n : R ( z λ n ) > 0 }, N 2 ( z ) := { n : R ( z λ n ) < 0 } and α ( 1 ) ( θ ) := lim –––– n → + ∞ n ∈ N 1 ( e i θ ) − ln | a n | R ( e i θ λ n ), α ( 2 ) ( θ ) := ¯¯¯¯¯¯¯¯ lim n → + ∞ n ∈ N 2 ( e i θ ) − ln | a n | R ( e i θ λ n ) . Assume that a n → 0 as n → + ∞ . In the article, we prove the following statements. 1 ) If α ( 2 ) ( θ ) < α ( 1 ) ( θ ) for some θ ∈ [ 0, π ) then { t e i θ : t ∈ ( α ( 2 ) ( θ ), α ( 1 ) ( θ ) ) } ⊂ G μ ( F ) as well as { t e i θ : t ∈ ( − ∞, α ( 2 ) ( θ ) ) ∪ ( α ( 1 ) ( θ ), + ∞ ) } ∩ G μ ( F ) = ∅ . 2 ) G μ ( F ) = ⋃ θ ∈ [ 0, π ) { z = t e i θ : t ∈ ( α ( 2 ) ( θ ), α ( 1 ) ( θ ) ) } . 3 ) If h := lim –––– n → + ∞ − ln | a n | ln n ∈ ( 1, + ∞ ), then ( h h − 1 ⋅ G a ( F ) ) ⊃ G μ ( F ) ⊃ G c ( F ) . If h = + ∞ then G a ( F ) = G c ( F ) = G μ ( F ), therefore G c ( F ) is also a convex domain. [ABSTRACT FROM AUTHOR]

Published

2023

3. On the convergence of Broyden's method and some accelerated schemes for singular problems.

Author

Mannel, Florian

Subjects

NONLINEAR equations, LINEAR dependence (Mathematics)

Abstract

We consider Broyden's method and some accelerated schemes for nonlinear equations having a strongly regular singularity of first order with a one-dimensional nullspace. Our two main results are as follows. First, we show that the use of a preceding Newton-like step ensures convergence for starting points in a starlike domain with density 1. This extends the domain of convergence of these methods significantly. Second, we establish that the matrix updates of Broyden's method converge q-linearly with the same asymptotic factor as the iterates. This contributes to the long-standing question of whether the Broyden matrices converge by showing that this is indeed the case for the setting at hand. Furthermore, we prove that the Broyden directions violate uniform linear independence, which implies that existing results for convergence of the Broyden matrices cannot be applied. Numerical experiments of high precision confirm the enlarged domain of convergence, the q-linear convergence of the matrix updates and the lack of uniform linear independence. In addition, they suggest that these results can be extended to singularities of higher order and that Broyden's method can converge r-linearly without converging q-linearly. The underlying code is freely available. [ABSTRACT FROM AUTHOR]

Published

2023

4. Generalized Popoviciu Expansions for Bernstein Polynomials of a Rational Module.

Author

Tikhonov, I. V., Sherstyukov, V. B., and Tsvetkovich, D. G.

Subjects

BERNSTEIN polynomials, POLYNOMIALS

Abstract

We study Bernstein polynomials for simple nonsmooth rational module functions. We show that these polynomials can be represented as special sums of regular structure. For historical reasons, the representations found are naturally called "generalized Popoviciu expansions." To write generalized expansions, we develop a special formalism based on combinatorial calculations. Based on the formulas obtained, we propose a complete description of the character of convergence of the Bernstein polynomials studied in the complex plane. We also discuss the relationship of generalized Popoviciu expansions with the distribution of zeros of Bernstein polynomials. In the final part of the paper, we present additional new relations for Bernstein polynomials of the rational module function. [ABSTRACT FROM AUTHOR]

Published

2022

5. On the convergence of the Campbell–Baker–Hausdorff–Dynkin series in infinite-dimensional Banach–Lie algebras.

Author

Biagi, S. and Bonfiglioli, A.

Subjects

STOCHASTIC convergence, FRACTAL dimensions, MATHEMATICAL series, INFINITY (Mathematics), BANACH algebras, LIE algebras, MATHEMATICAL proofs

Abstract

We prove a convergence result for the Campbell–Baker–Hausdorff–Dynkin seriesin infinite-dimensional Banach–Lie algebras. In the existing literature, this topic has been investigated whenis the Lie algebra of a finite-dimensional Lie group(see [Blanes and Casas, 2004]) or of an infinite-dimensional Banach–Lie group(see [Mérigot, 1974]). Indeed, one can obtain a suitable ODE for, which follows from the well-behaved formulas for the differential of the Exponential Map of the Lie group. The novelty of our approach is to derive this ODE in any infinite-dimensional Banach–Lie algebra, not necessarily associated to a Lie group, as a consequence of an analogous abstract ODE first obtained in the most natural algebraic setting: that of the formal power series in two commuting indeterminatesover the free unital associative algebra generated by two non-commuting indeterminates. [ABSTRACT FROM AUTHOR]

Published

2014

6. Model-independent sensorless control for non-salient PM Synchronous Motors at low speeds including standstill.

Author

Zaim, Sami, Nahid-Mobarakeh, Babak, Meibody-Tabar, Farid, and Meuret, Regis

Abstract

This article presents a new position and speed sensorless drive for non-salient pole PM synchronous machines in low speed range including standstill. The proposed method does not depend on the machine parameters and is very simple to implement. A voltage pulse injection is combined to a magnetic circuit saturation which will be created by an additional current. This latter is not necessary if the machine is salient pole. Mathematical proof of the convergence is presented. The minimum saliency required for sensorless operation at zero speed is determined. It is also shown that the proposed approach is robust with respect to parameter uncertainties. The effectiveness of this technique is verified by simulation and experimentation on an eight-poles 1 hp – 1000 rpm test machine. [ABSTRACT FROM PUBLISHER]

Published

2013

7. Exact Values of the Gamma Function from Stirling's Formula.

Author

Kowalenko, Victor

Subjects

GAMMA functions, EXPONENTIAL sums, ASYMPTOTIC expansions, INFINITE series (Mathematics), LOGARITHMS, ADDITION (Mathematics)

Abstract

In this work the complete version of Stirling's formula, which is composed of the standard terms and an infinite asymptotic series, is used to obtain exact values of the logarithm of the gamma function over all branches of the complex plane. Exact values can only be obtained by regularization. Two methods are introduced: Borel summation and Mellin–Barnes (MB) regularization. The Borel-summed remainder is composed of an infinite convergent sum of exponential integrals and discontinuous logarithmic terms that emerge in specific sectors and on lines known as Stokes sectors and lines, while the MB-regularized remainders reduce to one complex MB integral with similar logarithmic terms. As a result that the domains of convergence overlap, two MB-regularized asymptotic forms can often be used to evaluate the logarithm of the gamma function. Though the Borel-summed remainder has to be truncated, it is found that both remainders when summed with (1) the truncated asymptotic series, (2) Stirling's formula and (3) the logarithmic terms arising from the higher branches of the complex plane yield identical values for the logarithm of the gamma function. Where possible, they also agree with results from Mathematica. [ABSTRACT FROM AUTHOR]

Published

2020