Intrinsic Polynomials for Regression on Riemannian Manifolds

Hinkle, Jacob; Fletcher, P. Thomas; Joshi, Sarang

doi:10.1007/s10851-013-0489-5

Cited by 74 publications

(66 citation statements)

References 33 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…12 In some textbooks it is called the basic Euler-Poincaré equation to emphasize that it only includes the kinetic energy of a free-body. 13 In [121,83] it is also found that…”

Section: Evolution Of Geodesics Described In the Algebramentioning

confidence: 92%

Left-Invariant Riemannian Geodesics on Spatial Transformation Groups

Zacur¹,

Bossa²,

Olmos³

2014

SIAM J. Imaging Sci.

View full text Add to dashboard Cite

Spatial transformations are mappings between locations of a d-dimensional space and are commonly used in computer vision and image analysis. Many of the spatial transformation sets have a group structure and can be represented by matrix groups. In the computer vision and image analysis fields there is a recent and growing interest in performing analyses on spatial transformations data. Differential and Riemannian geometry have been used as a framework to endow the set of spatial transformations with a metric space structure, allowing the extension of the standard analysis techniques defined on vector spaces. This paper presents a review of the concepts and an overview of approaches to computing Riemannian geodesics on spatial transformation groups. The paper is aimed at providing a bridge for researchers from computer vision and image analysis fields to fill in the gap between differential geometry and computer vision and imaging disciplines. Some application examples are shown to illustrate the use of invariant Riemannian geodesics, such as interpolation of spatial transformations and filtering of matrix-valued images.

show abstract

“…12 In some textbooks it is called the basic Euler-Poincaré equation to emphasize that it only includes the kinetic energy of a free-body. 13 In [121,83] it is also found that…”

Section: Evolution Of Geodesics Described In the Algebramentioning

confidence: 92%

Left-Invariant Riemannian Geodesics on Spatial Transformation Groups

Zacur¹,

Bossa²,

Olmos³

2014

SIAM J. Imaging Sci.

View full text Add to dashboard Cite

show abstract

“…[3,42,11,29,13,20], we deal with the nonlinearity of the space of interest by utilizing the linear tangent space at the identity. Though not explored here, other types of statistics on manifolds [32,12,34,38,36,21,19,41,28,44,10,23,14] may also be applicable.…”

Section: Related Workmentioning

confidence: 99%

Highly-Expressive Spaces of Well-Behaved Transformations: Keeping it Simple

Freifeld

Hauberg

Batmanghelich

et al. 2015

2015 IEEE International Conference on Computer Vision (ICCV)

View full text Add to dashboard Cite

show abstract

“…A variety of methods extending concepts of regression in Euclidean spaces to nonflat manifolds have been proposed. Rentmeesters [24], Fletcher [11] and Hinkle et al [15] address the problem of geodesic fitting on Riemannian manifolds, mostly focusing on symmetric spaces. Niethammer et al [22] generalized linear regression to the manifold of diffeomorphisms to model image time-series data, followed by works extending this concept [16,25,26].…”

Section: Related Workmentioning

confidence: 99%

“…Unlike Jacobi field approaches, solutions using adjoint methods do not require computation of the curvature explicitly and easily extend to higher-order models, e.g., polynomials [15], splines [26], or piecewise regression models. Our approach is a representative of the first category which ensures extensibility to more advanced models.…”

Section: Related Workmentioning

confidence: 99%

Geodesic Regression on the Grassmannian

Hong

Kwitt

Singh

et al. 2014

Computer Vision – ECCV 2014

View full text Add to dashboard Cite

Abstract. This paper considers the problem of regressing data points on the Grassmann manifold over a scalar-valued variable. The Grassmannian has recently gained considerable attention in the vision community with applications in domain adaptation, face recognition, shape analysis, or the classification of linear dynamical systems. Motivated by the success of these approaches, we introduce a principled formulation for regression tasks on that manifold. We propose an intrinsic geodesic regression model generalizing classical linear least-squares regression. Since geodesics are parametrized by a starting point and a velocity vector, the model enables the synthesis of new observations on the manifold. To exemplify our approach, we demonstrate its applicability on three vision problems where data objects can be represented as points on the Grassmannian: the prediction of traffic speed and crowd counts from dynamical system models of surveillance videos and the modeling of aging trends in human brain structures using an affine-invariant shape representation.

show abstract

Intrinsic Polynomials for Regression on Riemannian Manifolds

Cited by 74 publications

References 33 publications

Left-Invariant Riemannian Geodesics on Spatial Transformation Groups

Left-Invariant Riemannian Geodesics on Spatial Transformation Groups

Highly-Expressive Spaces of Well-Behaved Transformations: Keeping it Simple

Geodesic Regression on the Grassmannian

Contact Info

Product

Resources

About