Results 41 to 50 of about 98,839 (207)
The Measurement Invariance of Schizotypy in Europe [PDF]
European Psychiatry, 2015 AbstractThe short version of the Oxford-Liverpool Inventory of Feelings and Experiences (sO-LIFE) is a widely used measure assessing schizotypy. There is limited information, however, on how sO-LIFE scores compare across different countries. The main goal of the present study is to test the measurement invariance of the sO-LIFE scores in a large sample
Fonseca-Pedrero E +7 more
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The Annals of Probability, 1973 Let $\mu$ be a probability measure on $(\mathscr{R}, \mathscr{B})$, where $\mathscr{R}$ is the real line and $\mathscr{B}$ the family of Borel sets on $\mathscr{R}$. A measurable set `$A$' is called $\mu$-invariant if $\mu(A + \theta) = \mu(A) \mathbf{\forall} \theta, -\infty < \theta < \infty$.
Blum, Julius R., Pathak, Pramod K.
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Measurement Invariance, Entropy, and Probability [PDF]
Entropy, 2010 We show that the natural scaling of measurement for a particular problem defines the most likely probability distribution of observations taken from that measurement scale. Our approach extends the method of maximum entropy to use measurement scale as a type of information constraint.
Steven A. Frank, D. Eric Smith
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Bayesian invariant measurements of generalization [PDF]
Neural Processing Letters, 1995 The problem of evaluating different learning rules and other statistical estimators is analysed. A new general theory of statistical inference is developed by combining Bayesian decision theory with information geometry. It is coherent and invariant. For each sample a unique ideal estimate exists and is given by an average over the posterior.
Huaiyu Zhu 0001, Richard Rohwer
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Stationary Distribution of Stochastic Age-Dependent Population–Toxicant Model with Markov Switching
MathematicsThis work focuses on the convergence of the numerical invariant measure for a stochastic age-dependent population–toxicant model with Markov switching. Considering that Euler–Maruyama (EM) has the advantage of fast computation and low cost, explicit EM ...
Yanyan Du, Zong Wang
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Solving the 4NLS with white noise initial data
Forum of Mathematics, Sigma, 2020 We construct global-in-time singular dynamics for the (renormalized) cubic fourth-order nonlinear Schrödinger equation on the circle, having the white noise measure as an invariant measure.
Tadahiro Oh +2 more
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On Relatively Invariant Measures [PDF]
Canadian Journal of Mathematics, 1960 In this note we will discuss the question of the measurability of the multiplier function of a relatively invariant measure on a group. That is, for a group G, σ-ring S, and a measure μ defined on the sets of S, we assume: E in S, x in G implies xE is in S and μ(XE) = σ(x)μ(E) and study the measurability of the function σ(x).The problem was discussed ...
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Isometrically invariant extensions of Lebesgue measure
, 1990 The purpose of this note is to give a very short prove of the theorem thta every isometrically invariant measure extending Lebesgue measure on R n {{\mathbf {R}}^
Krzysztof Ciesielski
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, 2015 We provide an example of a discrete-time Markov process on the three-dimensional infinite integer lattice with Zq-invariant Bernoulli-increments which has as local state space the cyclic group Zq.
Külske, Christof +3 more
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Law Invariant Risk Measures Have the Fatou Property [PDF]
S. Kusuoka [K 01, Theorem 4] gave an interesting dual characterizationof law invariant coherent risk measures, satisfying the Fatou property.The latter property was introduced by F. Delbaen [D 02].
Walter Schachermayer +2 more
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