The sharpeness of some cluster set results

We show that a recent cluster set theorem of Rung is sharp in a certain sense. This is accomplished through the construction of an interpolating sequence whose limit set is closed, totally disconnected and porous. The results also generalize some of Dolzenko's cluster set theorems.

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Some Note on Exceptional Values of Meromorphic Functions

Nagoya Mathematical Journal ◽

10.1017/s0027763000011090 ◽

1963 ◽

Vol 22 ◽

pp. 189-201 ◽

Cited By ~ 5

Author(s):

Kikuji Matsumoto

Keyword(s):

Meromorphic Function ◽

Meromorphic Functions ◽

Essential Singularity ◽

Compact Set ◽

A Value ◽

Cluster Set ◽

Totally Disconnected ◽

Null Set

LetEbe a totally-disconnected compact set in thez-plane and letΩbe its complement with respect to the extendedz-plane. ThenΩis a domain and we can consider a single-valued meromorphic functionw = f(z)onΩwhich has a transcendental singularity at each point ofE. Suppose thatEis a null-set of the classWin the sense of Kametani [4] (the classNBin the sense of Ahlfors and Beurling [1]). Then the cluster set off(z)at each transcendental singularity is the wholew-plane, and hencef(z)has an essential singularity at each point ofE. We shall say that a valuewis exceptional forf(z)at an essential singularity ζ ∈Eif there exists a neighborhood of ζ where the functionf(z)does not take this valuew.

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Cantor Limit Set of a Topological Transformation Group on S1

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/2011/342759 ◽

2011 ◽

Vol 2011 ◽

pp. 1-11

Author(s):

Keying Guan ◽

Zuming Chen

Keyword(s):

Riccati Equation ◽

Transformation Group ◽

Limit Set ◽

Topological Transformation ◽

Concrete Application ◽

Totally Disconnected

The limit set of a topological transformation group onS1generated by two generators is proved to be totally disconnected (or thin) and perfect if the conditions (i–v) are satisfied. A concrete application to a Doubly Periodic Riccati equation is given.

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Teichmüller space of a countable set of points on the Riemann sphere

Filomat ◽

10.2298/fil1701045t ◽

2017 ◽

Vol 31 (1) ◽

pp. 45-51

Author(s):

Masahiko Taniguchi

Keyword(s):

Configuration Space ◽

Infinite Number ◽

Riemann Sphere ◽

Teichmüller Space ◽

Teichmuller Space ◽

Limit Set ◽

Finitely Generated ◽

Forward Limit ◽

Set Of Points ◽

Totally Disconnected

We introduce the Teichm?ller space T(E) of an ordered countable set E of infinite number of distinct points on the Riemann sphere. We discuss the relation between the Teichm?ller distance on T(E) and a natural one on the configuration space for E. Also we give a system of global holomorphic coordinates for T(E) when E is determined from a finitely generated semigroup consisting of M?bius transformations with the totally disconnected forward limit set.

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Compositional Analysis of III-V Interface Lattice Images

Proceedings, annual meeting, Electron Microscopy Society of America ◽

10.1017/s1431927600001331 ◽

1980 ◽

Vol 38 ◽

pp. 318-319

Author(s):

A. Olsen ◽

J.C.H. Spence ◽

P. Petroff

Keyword(s):

Crystal Structure ◽

Image Matching ◽

Compositional Analysis ◽

Depth Of Field ◽

Limit Set ◽

High Contrast ◽

Resolution Limit ◽

Fourier Image ◽

Lattice Images ◽

True Structure

Since the point resolution of the JEOL 200CX electron microscope is up = 2.6Å it is not possible to obtain a true structure image of any of the III-V or elemental semiconductors with this machine. Since the information resolution limit set by electronic instability (1) u0 = (2/πλΔ)½ = 1.4Å for Δ = 50Å, it is however possible to obtain, by choice of focus and thickness, clear lattice images both resembling (see figure 2(b)), and not resembling, the true crystal structure (see (2) for an example of a Fourier image which is structurally incorrect). The crucial difficulty in using the information between Up and u0 is the fractional accuracy with which Af and Cs must be determined, and these accuracies Δff/4Δf = (2λu2Δf)-1 and ΔCS/CS = (λ3u4Cs)-1 (for a π/4 phase change, Δff the Fourier image period) are strongly dependent on spatial frequency u. Note that ΔCs(up)/Cs ≈ 10%, independent of CS and λ. Note also that the number n of identical high contrast spurious Fourier images within the depth of field Δz = (αu)-1 (α beam divergence) decreases with increasing high voltage, since n = 2Δz/Δff = θ/α = λu/α (θ the scattering angle). Thus image matching becomes easier in semiconductors at higher voltage because there are fewer high contrast identical images in any focal series.

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Influence of Applied Phytosanitary Treatments and Climatic Crop Year on Zinc Content in Wines from Tohani Vineyard

Revista de Chimie ◽

10.37358/rc.17.9.5830 ◽

2017 ◽

Vol 68 (9) ◽

pp. 2092-2097

Author(s):

Catalina Calin ◽

Gina Vasile Scaeteanu ◽

Roxana Maria Madjar ◽

Otilia Cangea

Keyword(s):

Zinc Content ◽

Soil Samples ◽

Limit Set ◽

Red Wines ◽

Metallic Ions ◽

Sauvignon Blanc ◽

Before And After ◽

Haze Formation ◽

Zinc Levels ◽

Concentration Levels

Metallic ions present a great importance in oenological practice and usually are present in wines in levels that are not hazardous. Among all metallic ions, zinc presents a great interest because may cause the persistence of the wine sour taste and by the side of Al, Cu, Fe and Ni, contribute to the haze formation and the change of color. The present study was focused on measuring the concentration levels of mobile zinc from vineyard soil before and after phytosanitary treatments and zinc content from white (Feteasca Alba - FA, Riesling Italian - RI, Sauvignon Blanc - SB, Tamaioasa Rom�neasca - TR), rose (Busuioaca de Bohotin - BB) and red (Feteasca Neagra - FN) wines within the wine-growing Tohani area, Romania. Other objective was to investigate of the influence of crop year and variety on zinc levels found in wine samples. Mobile zinc content for all analyzed soil samples is low ([1.5 mg/kg). Analyses indicated that zinc content found in wines was below 5 mg/L, limit set by Organisation Internationale of Vine and Wine (OIV). Also, it was found that red wines contain zinc in higher concentrations than white ones.

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RADIAL CLUSTER SET AND INTERPOLATION

Real Analysis Exchange ◽

10.2307/44151994 ◽

1989 ◽

Vol 15 (1) ◽

pp. 102

Author(s):

Nishiura

Keyword(s):

Cluster Set ◽

Radial Cluster

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Limit set trichotomy and dichotomy for skew-product semiflows with applications

Nonlinear Analysis ◽

10.1016/j.na.2009.01.135 ◽

2009 ◽

Vol 71 (7-8) ◽

pp. 2834-2839

Author(s):

Bin-Guo Wang ◽

Wan-Tong Li

Keyword(s):

Limit Set ◽

Skew Product ◽

Limit Set Trichotomy

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A non-Borel special alpha-limit set in the square

Ergodic Theory and Dynamical Systems ◽

10.1017/etds.2021.68 ◽

2021 ◽

pp. 1-11

Author(s):

STEPHEN JACKSON ◽

BILL MANCE ◽

SAMUEL ROTH

Keyword(s):

Dynamical Systems ◽

Limit Set ◽

Limit Sets ◽

Unit Square

Abstract We consider the complexity of special $\alpha $ -limit sets, a kind of backward limit set for non-invertible dynamical systems. We show that these sets are always analytic, but not necessarily Borel, even in the case of a surjective map on the unit square. This answers a question posed by Kolyada, Misiurewicz, and Snoha.

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Complete regularity of Ellis semigroups of -actions

Ergodic Theory and Dynamical Systems ◽

10.1017/etds.2020.118 ◽

2020 ◽

pp. 1-17

Author(s):

MARCY BARGE ◽

JOHANNES KELLENDONK

Keyword(s):

Complete Regularity ◽

Completely Regular ◽

Ellis Semigroup ◽

Totally Disconnected

Abstract It is shown that the Ellis semigroup of a $\mathbb Z$ -action on a compact totally disconnected space is completely regular if and only if forward proximality coincides with forward asymptoticity and backward proximality coincides with backward asymptoticity. Furthermore, the Ellis semigroup of a $\mathbb Z$ - or $\mathbb R$ -action for which forward proximality and backward proximality are transitive relations is shown to have at most two left minimal ideals. Finally, the notion of near simplicity of the Ellis semigroup is introduced and related to the above.

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Dendrogramic Representation of Data: CHSH Violation vs. Nonergodicity

Entropy ◽

10.3390/e23080971 ◽

2021 ◽

Vol 23 (8) ◽

pp. 971

Author(s):

Oded Shor ◽

Felix Benninger ◽

Andrei Khrennikov

Keyword(s):

Experimental Data ◽

Clustering Algorithms ◽

Realistic Model ◽

Minkowski Geometry ◽

Ultrametric Spaces ◽

Chsh Inequality ◽

Classical Quantum ◽

Basic Features ◽

Totally Disconnected ◽

Explicate Order

This paper is devoted to the foundational problems of dendrogramic holographic theory (DH theory). We used the ontic–epistemic (implicate–explicate order) methodology. The epistemic counterpart is based on the representation of data by dendrograms constructed with hierarchic clustering algorithms. The ontic universe is described as a p-adic tree; it is zero-dimensional, totally disconnected, disordered, and bounded (in p-adic ultrametric spaces). Classical–quantum interrelations lose their sharpness; generally, simple dendrograms are “more quantum” than complex ones. We used the CHSH inequality as a measure of quantum-likeness. We demonstrate that it can be violated by classical experimental data represented by dendrograms. The seed of this violation is neither nonlocality nor a rejection of realism, but the nonergodicity of dendrogramic time series. Generally, the violation of ergodicity is one of the basic features of DH theory. The dendrogramic representation leads to the local realistic model that violates the CHSH inequality. We also considered DH theory for Minkowski geometry and monitored the dependence of CHSH violation and nonergodicity on geometry, as well as a Lorentz transformation of data.

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