An upper bound for the logarithmic capacity of two intervals
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Publication:5448727
DOI10.1080/17476930701644863zbMath1132.33337arXiv1306.6182OpenAlexW2144168772MaRDI QIDQ5448727
Publication date: 7 March 2008
Published in: Complex Variables and Elliptic Equations (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1306.6182
logarithmic capacityJacobi's elliptic functionsJacobi's theta functionstwo intervalsChebyshev constanttransfinite diameter
Elliptic functions and integrals (33E05) Potentials and capacity, harmonic measure, extremal length and related notions in two dimensions (31A15)
Related Items
An upper bound for the norm of the Chebyshev polynomial on two intervals, Estimates for the asymptotic convergence factor of two intervals, Two-sided bounds for the logarithmic capacity of multiple intervals
Cites Work
- Monotonicity theorems and inequalities for the complete elliptic integrals
- Über die Kapazität der Summe von Kontinuen
- Weighted analogues of capacity, transfinite diameter, and Chebyshev constant
- Extremal configurations of certain problems on the capacity and harmonic measure
- On the transfinite diameters of some related sets
- Functional Inequalities for Complete Elliptic Integrals and Their Ratios
- The Degenerating Behavior of Elliptic Functions
- Functional Inequalities for Hypergeometric Functions and Complete Elliptic Integrals
- Sharp inequalities for the complete elliptic integral of the first kind
- Asymptotic Approximations for Symmetric Elliptic Integrals
- Elliptic Orthogonal and Extremal Polynomials
- Sharp Estimates for Complete Elliptic Integrals
- Tchebycheff Polynomials and the Transfinite Diameter
