Results 21 to 30 of about 478,225 (113)
, 2015 This paper studies convergence properties of multivariate distributions constructed by endowing empirical margins with a copula. This setting includes Latin Hypercube Sampling with dependence, also known as the Iman--Conover method.
Mainik, Georg
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Uniformity in the strong convergence of self-adjoint operators
Journal of Mathematical Analysis and Applications, 1972 The purpose of this note is to give a consequence of a theorem of Rellich [3, p. 6841. Rellich showed that if a sequence of self-adjoint operators H, over a Hilbert space H converges strongly to the self-adjoint operator H in the generalized sense, then the resolutions of the identity E,(X) of H, converge strongly to the resolution of the identity E(h)
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, 2019 We study a coupled bulk-surface Allen-Cahn system with an affine linear transmission condition, that is, the trace values of the bulk variable and the values of the surface variable are connected via an affine relation, and this serves to generalize the ...
Colli, Pierluigi +2 more
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Strong uniform convergence rates of the linear wavelet estimator of a multivariate copula density
, 2023 23 ...
Seck, Cheikh Tidiane, Mamane, Salha
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Large-sample study of the kernel density estimators under multiplicative censoring
, 2012 The multiplicative censoring model introduced in Vardi [Biometrika 76 (1989) 751--761] is an incomplete data problem whereby two independent samples from the lifetime distribution $G$, $\mathcal{X}_m=(X_1,...,X_m)$ and $\mathcal{Z}_n=(Z_1,...,Z_n)$, are ...
Asgharian, Masoud +2 more
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Global attractors of evolutionary systems [PDF]
, 2006 An abstract framework for studying the asymptotic behavior of a dissipative evolutionary system $\mathcal{E}$ with respect to weak and strong topologies was introduced in [8] primarily to study the long-time behavior of the 3D Navier-Stokes equations ...
Cheskidov, Alexey
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, 2022 Consider $n$ points independently sampled from a density $p$ of class $\mathcal{C}^2$ on a smooth compact $d$-dimensional sub-manifold $\mathcal{M}$ of $\mathbb{R}^m$, and consider the generator of a random walk visiting these points according to a transition kernel $K$.
Guérin, Hélène +2 more
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Complete metrizability of topologies of strong uniform convergence on bornologies
Journal of Mathematical Analysis and Applications, 2012 It is well-known that if \(X\) is locally compact and Lindelöf then the compact-open topology on the set of real-valued continuous functions is completely metrizable, see \textit{R. F. Arens} [Ann. Math. (2) 47, 480--495 (1946; Zbl 0060.39704)]; the key property here is that there is a countable family of compact sets whose interiors cover~\(X\).
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On the rate of uniform convergence of the product-limit estimator: strong and weak laws
The Annals of Statistics, 1997 Let \(\{X_i\}\) and \(\{V_i\}\) be two independent sequences of nonnegative i.i.d. random variables with common distributions \(F\) and \(G\), respectively. In random censorship models, we observe \(\{Z_i, \delta_i,\;1\leq i\leq n\}\) with \(Z_i=X_i \wedge V_i\) and \(\delta_i= I_{\{X_i\leq V_i\}}\).
Chen, K., Lo, SH
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Local Linear Fitting Under Near Epoch Dependence: Uniform consistency with Convergence Rates [PDF]
Local linear fitting is a popular nonparametric method in statistical and econometric modelling. Lu and Linton (2007) established the pointwise asymptotic distribution for the local linear estimator of a nonparametric regression function under the ...
Degui Li, Oliver Linton, Zudi Lu
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