For functional data lying on an unknown nonlinear low-dimensional space, we study manifold learning and introduce the notions of manifold mean, manifold modes of functional variation and of functional manifold components. These constitute nonlinear representations of functional data that complement classical linear representations such as eigenfunctions and functional principal components. Our manifold learning procedures borrow ideas from existing nonlinear dimension reduction methods, which we modify to address functional data settings. In simulations and applications, we study examples of functional data which lie on a manifold and validate the superior behavior of manifold m...
Statistical methods that adapt to individual observations or unknown population structures are attra...
Supervised manifold learning methods learn data representations by preserving the geometric structur...
Neuroimaging techniques, especially fMRI analysis provide images that are contained in a high dimens...
For functional data lying on an unknown nonlinear low-dimensional space, we study manifold ...
Manifold learning has gained in recent years a great attention in facing the problem of dimensionali...
Manifold learning is a popular recent approach to nonlinear dimensionality reduction. Algorithms for...
We are increasingly confronted with very high dimensional data from speech,images, genomes, and othe...
Computer aided diagnosis is often confronted with processing and analyzing high dimensional data. On...
Modeling data generated by physiological systems is a crucial step in many problems such as classifi...
Functional data analysis on nonlinear manifolds has drawn recent interest. We propose an intrinsic p...
In this thesis, we introduce a comprehensive framework for the analysis of statistical samples that ...
We study the problem of discovering a manifold that best preserves information relevant to a nonline...
We develop a high-dimensional graphical modeling approach for functional data where the number of fu...
We investigate how to learn a kernel matrix for high dimensional data that lies on or near a low dim...
In recent years, nonlinear dimensionality reduction (NLDR) techniques have attracted much attention ...
Statistical methods that adapt to individual observations or unknown population structures are attra...
Supervised manifold learning methods learn data representations by preserving the geometric structur...
Neuroimaging techniques, especially fMRI analysis provide images that are contained in a high dimens...
For functional data lying on an unknown nonlinear low-dimensional space, we study manifold ...
Manifold learning has gained in recent years a great attention in facing the problem of dimensionali...
Manifold learning is a popular recent approach to nonlinear dimensionality reduction. Algorithms for...
We are increasingly confronted with very high dimensional data from speech,images, genomes, and othe...
Computer aided diagnosis is often confronted with processing and analyzing high dimensional data. On...
Modeling data generated by physiological systems is a crucial step in many problems such as classifi...
Functional data analysis on nonlinear manifolds has drawn recent interest. We propose an intrinsic p...
In this thesis, we introduce a comprehensive framework for the analysis of statistical samples that ...
We study the problem of discovering a manifold that best preserves information relevant to a nonline...
We develop a high-dimensional graphical modeling approach for functional data where the number of fu...
We investigate how to learn a kernel matrix for high dimensional data that lies on or near a low dim...
In recent years, nonlinear dimensionality reduction (NLDR) techniques have attracted much attention ...
Statistical methods that adapt to individual observations or unknown population structures are attra...
Supervised manifold learning methods learn data representations by preserving the geometric structur...
Neuroimaging techniques, especially fMRI analysis provide images that are contained in a high dimens...