EUDML

Currently displaying 1 – 12 of 12

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On fractional fields indexed by metric spaces.

Istas, Jacques — 2006

Electronic Communications in Probability [electronic only]

Spherical and hyperbolic fractional Brownian motion.

Istas, Jacques — 2005

Electronic Communications in Probability [electronic only]

Multifractional brownian fields indexed by metric spaces with distances of negative type

Jacques Istas — 2013

ESAIM: Probability and Statistics

We define multifractional Brownian fields indexed by a metric space, such as a manifold with its geodesic distance, when the distance is of negative type. This construction applies when the Brownian field indexed by the metric space exists, in particular for spheres, hyperbolic spaces and real trees.

Manifold indexed fractional fields

Jacques Istas — 2012

ESAIM: Probability and Statistics

(Local) self-similarity is a seminal concept, especially for Euclidean random fields. We study in this paper the extension of these notions to manifold indexed fields. We give conditions on the (local) self-similarity index that ensure the existence of fractional fields. Moreover, we explain how to identify the self-similar index. We describe a way of simulating Gaussian fractional fields.

Identification des paramètres d'un processus gaussien fractionnaire

Jacques Istas — 2000

Journal de la société française de statistique

Wavelet coefficients of a gaussian process and applications

Jacques Istas — 1992

Annales de l'I.H.P. Probabilités et statistiques

Manifold indexed fractional fields

Jacques Istas — 2012

ESAIM: Probability and Statistics

Editorial - Spring School Mons Random differential equations and gaussian fields

Jacques Istas; Serge Cohen — 2012

ESAIM: Probability and Statistics

Minimax results for estimating integrals of analytic processes

Karim Benhenni; Jacques Istas — 1998

ESAIM: Probability and Statistics

Minimax results for estimating integrals of analytic processes

Karim Benhenni; Jacques Istas — 2010

ESAIM: Probability and Statistics

The problem of predicting integrals of stochastic processes is considered. Linear estimators have been constructed by means of samples at N discrete times for processes having a fixed Hölderian regularity > 0 in quadratic mean. It is known that the rate of convergence of the mean squared error is of order N. In the class of analytic processes , ≥ 1, we show that among all estimators, the linear ones are optimal. Moreover, using optimal coefficient estimators derived...