Many computer vision and pattern recognition problems may be posed as the analysis of a set of {\bf dissimilarities} between objects. For many types of data, these dissimilarities are not Euclidean (i.e. they do not represent the distances between points in a Euclidean space), and therefore cannot be isometrically embedded in a Euclidean space. Examples include shape-dissimilarities, graph distances and mesh geodesic distances. In this paper, we provide a means of embedding such non-Euclidean data onto surfaces of constant curvature. We aim to embed the data on a space whose radius of curvature is determined by the dissimilarity data. The space can be either of positive curvature (spherical) or of negative curvature (hyperbolic). We give an...
International audienceWe construct shape spaces of elastic spherical surfaces immersed in Euclidean ...
We have started to see non-Euclidean geometries used in many applications, including visualization, ...
International audienceWe address the problem of matching two 3D shapes by representing them using th...
Many computer vision and pattern recognition problems may be posed as the analysis of a set of {\bf ...
We take a non-Euclidean view at three classical machine learning subjects: low-dimensional embedding...
Manifold learning and finding low-dimensional structure in data is an important task. Many algorithm...
Multi-dimensional scaling is an analysis tool which transforms pairwise distances between points to ...
This paper discusses the problem of approximating data points in n-dimensional Euclidean space, usin...
Learning a latent embedding to understand the underlying nature of data distribution is often formul...
We introduce a method of calculating and rendering shapes in a non-Euclidean 2D space in real-time u...
Abstract. Pairwise proximities describe the properties of objects in terms of their similarities. By...
Pairwise dissimilarity representations are frequently used as an alternative to feature vectors in p...
Inherent to state-of-the-art dimension reduction algorithms is the assumption that global distances ...
Mapping complex input data into suitable lower dimensional manifolds is a common procedure in machin...
The curvature of a geometric space measures its deviation from regular (or "Euclidean") space. For e...
International audienceWe construct shape spaces of elastic spherical surfaces immersed in Euclidean ...
We have started to see non-Euclidean geometries used in many applications, including visualization, ...
International audienceWe address the problem of matching two 3D shapes by representing them using th...
Many computer vision and pattern recognition problems may be posed as the analysis of a set of {\bf ...
We take a non-Euclidean view at three classical machine learning subjects: low-dimensional embedding...
Manifold learning and finding low-dimensional structure in data is an important task. Many algorithm...
Multi-dimensional scaling is an analysis tool which transforms pairwise distances between points to ...
This paper discusses the problem of approximating data points in n-dimensional Euclidean space, usin...
Learning a latent embedding to understand the underlying nature of data distribution is often formul...
We introduce a method of calculating and rendering shapes in a non-Euclidean 2D space in real-time u...
Abstract. Pairwise proximities describe the properties of objects in terms of their similarities. By...
Pairwise dissimilarity representations are frequently used as an alternative to feature vectors in p...
Inherent to state-of-the-art dimension reduction algorithms is the assumption that global distances ...
Mapping complex input data into suitable lower dimensional manifolds is a common procedure in machin...
The curvature of a geometric space measures its deviation from regular (or "Euclidean") space. For e...
International audienceWe construct shape spaces of elastic spherical surfaces immersed in Euclidean ...
We have started to see non-Euclidean geometries used in many applications, including visualization, ...
International audienceWe address the problem of matching two 3D shapes by representing them using th...