We take up on recent work on the Riemannian geometry of generative networks to propose a new approach for learning both a manifold structure and a Riemannian metric from data. It allows the derivation of statistical analysis on manifolds without the need for the user to design new Riemannian structure for each specific problem. In high-dimensional data, it can learn non diagonal metrics, whereas manual design is often limited to the diagonal case. We illustrate how the method allows the construction of a meaningful low-dimensional representation of data and exhibit the geometry of the space of brain images during Alzheimer's progression
Many measurements or observations in computer vision and machine learning manifest as non-Euclidean ...
International audienceInterpretable progression models for longitudinal neuroimaging data are crucia...
We investigate the geometrical structure of probabilistic generative dimensionality reduction models...
We take up on recent work on the Riemannian geometry of generative networks to propose a new approac...
The analysis of longitudinal trajectories is a longstanding problem in medical imaging which is ofte...
224 pagesAlthough machine learning researchers have introduced a plethora of useful constructions fo...
International audienceThe analysis of longitudinal trajectories is a longstandingproblem in ...
Deep generative models have de facto emerged as state of the art when it comes to density estimation...
Recently, manifold learning has been widely exploited in pattern recognition, data analysis, and mac...
In recent years, manifold learning has become increasingly popular as a tool for performing non-line...
In recent years, nonlinear dimensionality reduction (NLDR) techniques have attracted much attention ...
This PhD proposes new Riemannian geometry tools for the analysis of longitudinal observations of neu...
Many measurements or observations in computer vision and machine learning manifest as non-Euclidean ...
International audienceInterpretable progression models for longitudinal neuroimaging data are crucia...
We investigate the geometrical structure of probabilistic generative dimensionality reduction models...
We take up on recent work on the Riemannian geometry of generative networks to propose a new approac...
The analysis of longitudinal trajectories is a longstanding problem in medical imaging which is ofte...
224 pagesAlthough machine learning researchers have introduced a plethora of useful constructions fo...
International audienceThe analysis of longitudinal trajectories is a longstandingproblem in ...
Deep generative models have de facto emerged as state of the art when it comes to density estimation...
Recently, manifold learning has been widely exploited in pattern recognition, data analysis, and mac...
In recent years, manifold learning has become increasingly popular as a tool for performing non-line...
In recent years, nonlinear dimensionality reduction (NLDR) techniques have attracted much attention ...
This PhD proposes new Riemannian geometry tools for the analysis of longitudinal observations of neu...
Many measurements or observations in computer vision and machine learning manifest as non-Euclidean ...
International audienceInterpretable progression models for longitudinal neuroimaging data are crucia...
We investigate the geometrical structure of probabilistic generative dimensionality reduction models...