Convergence rates for empirical barycenters in metric spaces: curvature, convexity and extendable geodesics

Ahidar-Coutrix, Adil; Gouic, Thibaut Le; Paris, Quirino

doi:10.1007/s00440-019-00950-0

Cited by 33 publications

(58 citation statements)

References 50 publications

(57 reference statements)

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“…[PM18] and [AGP18] show rates of convergence for metric spaces which have a finite diameter (or at least the support of the distribution of observations must be bounded). The proofs in both papers rely on empirical process theory.…”

Section: Our Contributionmentioning

confidence: 99%

“…In particular, they make use of symmetrization and the generic chaining to bound the supremum of an empirical process. But where [AGP18] use that bound to be able to apply Talagrand's inequality [Bou02], [PM18] employ a peeling device (also called slicing; see, e.g., [Gee00]) to obtain rates. As a consequence, [AGP18] achieve stronger results (nonasymptotic exponential concentration instead of O P -statements), but they rely more heavily on the boundedness of the metric.…”

Section: Our Contributionmentioning

confidence: 99%

“…But where [AGP18] use that bound to be able to apply Talagrand's inequality [Bou02], [PM18] employ a peeling device (also called slicing; see, e.g., [Gee00]) to obtain rates. As a consequence, [AGP18] achieve stronger results (nonasymptotic exponential concentration instead of O P -statements), but they rely more heavily on the boundedness of the metric. As our goal is to obtain results for spaces with infinite diameter, our proof technique is closer to [PM18], i.e., we also apply a peeling device.…”

Section: Our Contributionmentioning

confidence: 99%

“…The recent article [AGP18] provides nonasymptotic concentration rates in general bounded metric spaces. Its relation to our results will be discussed in the next subsection.…”

Section: Introductionmentioning

confidence: 99%

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Convergence rates for the generalized Fréchet mean via the quadruple inequality

Schötz¹

2019

Electron. J. Statist.

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For sets Q and Y, the generalized Fréchet mean m ∈ Q of a random variable Y , which has values in Y, is any minimizerThere are little restrictions to Q and Y. In particular, Q can be a non-Euclidean metric space. We provide convergence rates for the empirical generalized Fréchet mean. Conditions for rates in probability and rates in expectation are given. In contrast to previous results on Fréchet means, we do not require a finite diameter of the Q or Y. Instead, we assume an inequality, which we call quadruple inequality. It generalizes an otherwise common Lipschitz condition on the cost function. This quadruple inequality is known to hold in Hadamard spaces. We show that it also holds in a suitable way for certain powers of a Hadamard-metric.

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Section: Our Contributionmentioning

confidence: 99%

Section: Our Contributionmentioning

confidence: 99%

Section: Our Contributionmentioning

confidence: 99%

“…The recent article [AGP18] provides nonasymptotic concentration rates in general bounded metric spaces. Its relation to our results will be discussed in the next subsection.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Convergence rates for the generalized Fréchet mean via the quadruple inequality

Schötz¹

2019

Electron. J. Statist.

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“…For spaces with non-positive sectional curvature, these assumptions are always true. They are also true for spaces of non-negative curvature under certain conditions (Ahidar-Coutrix et al, 2019).…”

Section: Metric Covariance: Trace Of Cross-covariance Operator and Asmentioning

confidence: 91%

Functional Models for Time-Varying Random Objects

Dubey

Müller

2020

Journal of the Royal Statistical Society Series B: Statistical Methodology

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Summary Functional data analysis provides a popular toolbox of functional models for the analysis of samples of random functions that are real valued. In recent years, samples of time‐varying object data such as time‐varying networks that are not in a vector space have been increasingly collected. These data can be viewed as elements of a general metric space that lacks local or global linear structure and therefore common approaches that have been used with great success for the analysis of functional data, such as functional principal component analysis, cannot be applied. We propose metric covariance, a novel association measure for paired object data lying in a metric space (Ω,d) that we use to define a metric autocovariance function for a sample of random Ω‐valued curves, where Ω generally will not have a vector space or manifold structure. The proposed metric autocovariance function is non‐negative definite when the squared semimetric d2 is of negative type. Then the eigenfunctions of the linear operator with the autocovariance function as kernel can be used as building blocks for an object functional principal component analysis for Ω‐valued functional data, including time‐varying probability distributions, covariance matrices and time dynamic networks. Analogues of functional principal components for time‐varying objects are obtained by applying Fréchet means and projections of distance functions of the random object trajectories in the directions of the eigenfunctions, leading to real‐valued Fréchet scores. Using the notion of generalized Fréchet integrals, we construct object functional principal components that lie in the metric space Ω. We establish asymptotic consistency of the sample‐based estimators for the corresponding population targets under mild metric entropy conditions on Ω and continuity of the Ω‐valued random curves. These concepts are illustrated with samples of time‐varying probability distributions for human mortality, time‐varying covariance matrices derived from trading patterns and time‐varying networks that arise from New York taxi trips.

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Data analysis onnonstandardspaces

Huckemann

Eltzner

2020

WIREs Computational Stats

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The task to write on data analysis on nonstandard spaces is quite substantial, with a huge body of literature to cover, from parametric to nonparametrics, from shape spaces to Wasserstein spaces. In this survey we convey simple (e.g., Fréchet means) and more complicated ideas (e.g., empirical process theory), common to many approaches with focus on their interaction with one‐another. Indeed, this field is fast growing and it is imperative to develop a mathematical view point, drawing power, and diversity from a higher level of abstraction, for example, by introducing generalized Fréchet means. While many problems have found ingenious solutions (e.g., Procrustes analysis for principal component analysis [PCA] extensions on shape spaces and diffusion on the frame bundle to mimic anisotropic Gaussians), more problems emerge, often more difficult (e.g., topology and geometry influencing limiting rates and defining generic intrinsic PCA extensions). Along this survey, we point out some open problems, that will, as it seems, keep mathematicians, statisticians, computer and data scientists busy for a while. This article is categorized under: Statistical and Graphical Methods of Data Analysis > Analysis of High Dimensional Data

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Convergence rates for empirical barycenters in metric spaces: curvature, convexity and extendable geodesics

Cited by 33 publications

References 50 publications

Convergence rates for the generalized Fréchet mean via the quadruple inequality

Convergence rates for the generalized Fréchet mean via the quadruple inequality

Functional Models for Time-Varying Random Objects

Data analysis onnonstandardspaces

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