Results 151 to 160 of about 333,390 (187)

Convergence Groups with an Invariant Component Pair

American Journal of Mathematics, 1992
Some years ago F. Gehring and G. J. Martin introduced the notion of a convergence group acting on the 2-sphere. These are defined topologically to have the properties characteristic of Kleinian groups. The purpose of this paper is to classify those convergence groups which are most closely analogous to quasi-Fuchsian groups.
Martin, Gaven J., Tukia, Pekka
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Invariance of statistical causality under convergence

Statistics & Probability Letters, 2011
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Petrović, Ljiljana, Dimitrijević, Sladjana   +1 more
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On Large Deviation Convergence of Invariant Measures

Journal of Theoretical Probability, 2003
The author presents new results concerning the connection between large deviation principles for trajectories of stochastic processes and the associated invariant measures. Applications to the invariant measures of diffusion processes and queueing processes are provided, too.
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Uniformly $$(B,\lambda )-$$Invariant Statistical Convergence

2020
In the present chapter, we consider some properties of uniformly \((B,\lambda )\)-invariant statistically convergent which is defined using the \(\varphi \)-function and invariant mean. Also we prove some inclusion theorems.
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On the Convergence Rate in the Invariance Principle

Theory of Probability & Its Applications, 1985
Let H be a real separable Hilbert space. An estimate of the convergence rate in the invariance principle for H-valued random variables is obtained. The sequence of coordinates of the random variables is supposed to be martingale-difference.
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Rate of convergence for the invariance principle

Lithuanian Mathematical Journal, 1986
See the review in Zbl 0582.60043.
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Convergence of Invariant Distances on Decreasing Domains

Complex Variables, Theory and Application: An International Journal, 2002
We investigate the behavior of the invariant distances and metrics on decreasing domains in complex Euclidean space. The invariant distances on a domain with some conditions are the limit of them on decreasing sequence of domains converging to the domain.
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Affine invariant convergence results for Newton's method

BIT, 1982
We present a unified derivation of affine invariant convergence results for Newton's method. Initially we derive affine invariant forms of the perturbation lemma and a mean value theorem. With their aid we obtain an optimal radius of convergence for Newton's method, from which further radius of convergence estimates follow. From the Newton-Kantorovitch
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On generalized invariant statistical convergence of weight g

Communications in Statistics - Theory and Methods, 2019
The goal of this paper is to introduce the concept of λ-invariant statistical convergence of weight g:[0,∞)→[0,∞) where g(xn)→∞ for any sequence (xn) in [0,∞) with xn→∞.
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The Associative Part of a Convergence Domain is Invariant

Canadian Mathematical Bulletin, 1970
Of special interest in summability theory are those conservative matrices possessing the "mean-value property". If cA={x: Ax ∊ c} denotes the convergence domain of a conservative matrix A, then A has the mean-value property in case, for each x in cA, there exists M = M(A, x) > 0 such that1This property has been considered by many writers and has ...
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