Grassmann tensors arise from classical problems of scene reconstruction in computer vision. In particular, bifocal Grassmann tensors, related to a pair of projections from a projective space onto view spaces of varying dimensions, generalize the classical notion of fundamental matrices. In this paper, we study in full generality the variety of bifocal Grassmann tensors focusing on its birational geometry. To carry out this analysis, every object of multi-view geometry is described both from an algebraic and geometric point of view, e.g., the duality between the view spaces, and the space of rays is explicitly described via polarity. Next, we deal with the moduli of bifocal Grassmann tensors, thus showing that this variety is both birational...
International audienceWe analyze relations that exist between multiple views of a static scene, wher...
This paper discusses the basic role of the trifocal tensor 1 in scene reconstruction from three view...
We revisit the bilinear matching constraintbetween two perspective views of a 3D scene. Our objectiv...
Grassmann tensors arise from classical problems of scene reconstruction in computer vision. Trifocal...
We introduce a common framework for the definition and operations on the different multiple view ten...
International audienceGeneral camera models relax the constraint on central projection and character...
We study the theory of projective reconstruction for multiple projections from an arbitrary dimensio...
In this paper we specialize the projective unifocal, bifocal, and trifocal tensors to the affine cas...
Given two linear projections of maximal rank from (Formula presented.) to (Formula presented.) and (...
. Reconstruction of 3D space from 2D images is generally a "2-view" problem. That is, the...
. The topic of representation, recovery and manipulation of three-dimensional (3D) scenes from two-d...
We show how to use the Grassmann-Cayley algebra to model systems of one, two and three cameras. We s...
This chapter is devoted to applications of multiview tensors, in higher dimension, to projective rec...
Abstract. The topic of representation, recovery and manipulation of three-dimensional (3D) scenes fr...
Given three partially overlapping views of a scene from which a set of point correspondences have be...
International audienceWe analyze relations that exist between multiple views of a static scene, wher...
This paper discusses the basic role of the trifocal tensor 1 in scene reconstruction from three view...
We revisit the bilinear matching constraintbetween two perspective views of a 3D scene. Our objectiv...
Grassmann tensors arise from classical problems of scene reconstruction in computer vision. Trifocal...
We introduce a common framework for the definition and operations on the different multiple view ten...
International audienceGeneral camera models relax the constraint on central projection and character...
We study the theory of projective reconstruction for multiple projections from an arbitrary dimensio...
In this paper we specialize the projective unifocal, bifocal, and trifocal tensors to the affine cas...
Given two linear projections of maximal rank from (Formula presented.) to (Formula presented.) and (...
. Reconstruction of 3D space from 2D images is generally a "2-view" problem. That is, the...
. The topic of representation, recovery and manipulation of three-dimensional (3D) scenes from two-d...
We show how to use the Grassmann-Cayley algebra to model systems of one, two and three cameras. We s...
This chapter is devoted to applications of multiview tensors, in higher dimension, to projective rec...
Abstract. The topic of representation, recovery and manipulation of three-dimensional (3D) scenes fr...
Given three partially overlapping views of a scene from which a set of point correspondences have be...
International audienceWe analyze relations that exist between multiple views of a static scene, wher...
This paper discusses the basic role of the trifocal tensor 1 in scene reconstruction from three view...
We revisit the bilinear matching constraintbetween two perspective views of a 3D scene. Our objectiv...