Results 251 to 260 of about 788,948 (294)

Entropy Numbers of Some Ergodic Averages

Theory of Probability & Its Applications, 2000
If \(X\) is a seminormed linear space and \(U\) a bounded linear operator on \(X\), we may consider the moving averages \(A_n= n^{-1} \sum^{n-1}_{j=0} U^j\), \(n= 1,2,\dots\). Given \(x\in X\), does a subsequence \(S\) of the sequence \(\{A_n(x)\}^\infty_{n=1}\) converge or cluster in some sense? The main thrust of this paper, building upon a result of
Gamet, C., Weber, M.
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Uniform Entropy Numbers

1996
In Section 2.5.1 the empirical process was shown to converge weakly for indexing sets F satisfying a uniform entropy condition. In particular, if $$ s\mathop u\limits_Q p\log N\left( {\varepsilon \parallel F{\parallel _{Q,2}},F,\mathop L\nolimits_2 \left( Q \right)} \right) \leqslant K{\left( {\frac{1}{\varepsilon }} \right)^{2 - \delta ...
Aad W. van der Vaart, Jon A. Wellner
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Gaussian Approximation Numbers and Metric Entropy

Journal of Mathematical Sciences, 2019
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Kühn, T., Linde, W.
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Entropy Numbers of Certain Summation Operators

gmj, 2001
Abstract Given nonnegative real sequences and we study the generated summation operator regarded as a mapping from ℓ p (ℤ) to ℓ q (ℤ).
Creutzig, J., Linde, W.
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The entropy source of pseudo random number generators: from low entropy to high entropy

2019 IEEE International Conference on Intelligence and Security Informatics (ISI), 2019
The pseudo random number generators (PRNG) is one type of deterministic functions. The information entropy of the output sequences depends on the entropy of the input seeds. The output sequences can be predicted if attackers could know or control the input seeds of PRNGs.
Jizhi Wang, Jingshan Pan, Xueli Wu
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Entropy numbers and interpolation

Mathematische Nachrichten, 1982
From the author's introduction. It is the purpose of this note to answer a query put forward by \textit{H. Triebel} in [Interpolation theory, function spaces, differential operators (1978; Zbl 0387.46032), p. 118], regarding interpolation properties of a certain class of operator ideals, the so-called entropy ideals.
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Some estimates on entropy numbers

Israel Journal of Mathematics, 1993
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Junge, Marius, Defant, Martin
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Entropy-Based Random Number Evaluation

American Journal of Mathematical and Management Sciences, 1995
SYNOPTIC ABSTRACTPrevious work has shown how to test a simple hypothesis of uniformity on the interval (0, 1) by using spacings-based estimates of entropy. In this paper we use Monte Carlo methods to extend previous tables of critical points and power for such entropy tests to the large sample sizes likely to be desirable when evaluating the output of ...
Edward J. Dudewicz, Edward C. van der Meulen, M.G. SriRam, Nick K.W. Teoh   +3 more
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Entropy estimation and Fibonacci numbers

SPIE Proceedings, 2013
We introduce a new metric on a space of right-sided infinite sequences drawn from a finite alphabet. Emerging from a problem of entropy estimation of a discrete stationary ergodic process, the metric is important on its own part and exhibits some interesting properties.
Evgeniy A. Timofeev, Alexei Kaltchenko
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Generalized Entropy Numbers and Gelfand Numbers – an Approach to the Entropy Behaviour of Certain Integral Operators

Mathematische Nachrichten, 1987
The authors study generalized inner entropy numbers \(f_ n(T,{\mathfrak A})\) and Gelfand numbers \(c_ n(T,{\mathfrak A})\) of an operator T relative to some operator ideal \({\mathfrak A}\). Denoting the ideal of those maps T for which \((f_ n(T({\mathfrak A}))_{n\in {\mathbb{N}}}\) belongs to the Lorentz sequence space \(\ell_{p,q}\) by \({\mathfrak ...
Carl, Bernd, Stephani, Irmtraud
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