In this paper, we formulate a generic non-minimal solver using the existing tools of Polynomials Optimization Problems (POP) from computational algebraic geometry. The proposed method exploits the well known Shor’s or Lasserre’s relaxations, whose theoretical aspects are also discussed. Notably, we further exploit the POP formulation of non-minimal solver also for the generic consensus maximization problems in 3D vision. Our framework is simple and straightforward to implement, which is also supported by three diverse applications in 3D vision, namely rigid body transformation estimation, Non-Rigid Structure-fromMotion (NRSfM), and camera autocalibration. In all three cases, both non-minimal and consensus maximization are tested, which are ...
Abstract Finding a closed form solution to a system of polynomial equations is a common problem in ...
Rigid structure-from-motion (RSfM) and non-rigid structure-from-motion (NRSfM) have long been treate...
Many computer vision methods use consensus maximization to relate measurements containing outliers w...
We study the Perspective-n-Point (PNP) problem, which is fundamental in 3D vision, for the recovery ...
Robust fitting of geometric models is a core problem in computer vision. The most common approach is...
© 2016 IEEE. Semidefinite Programming (SDP) and Sums-of-Squ-ares (SOS) relaxations have led to certi...
The overall objective of this thesis is to apply a polynomial optimization method, based on moments ...
Dépôt officiel de la thèse effectué sur le site de l'INPT : http://ethesis.inp-toulouse.fr/archive/0...
Abstract Many computer vision applications require robust and efficient estimation of camera geomet...
Efficient solutions to polynomial equation systems is an important topic in modern geometric compute...
Consensus maximization is a key strategy in 3D vision for robust geometric model estimation from mea...
Computer vision is today a wide research area including topics like robot vision, image analysis, pa...
Abstract. We introduce a framework for computing statistically optimal estimates of geometric recons...
Reconstructing the three-dimensional structure of a scene using images is a fundamental problem in c...
Rigid structure-from-motion (RSfM) and non-rigid structure-from-motion (NRSfM) have long been treate...
Abstract Finding a closed form solution to a system of polynomial equations is a common problem in ...
Rigid structure-from-motion (RSfM) and non-rigid structure-from-motion (NRSfM) have long been treate...
Many computer vision methods use consensus maximization to relate measurements containing outliers w...
We study the Perspective-n-Point (PNP) problem, which is fundamental in 3D vision, for the recovery ...
Robust fitting of geometric models is a core problem in computer vision. The most common approach is...
© 2016 IEEE. Semidefinite Programming (SDP) and Sums-of-Squ-ares (SOS) relaxations have led to certi...
The overall objective of this thesis is to apply a polynomial optimization method, based on moments ...
Dépôt officiel de la thèse effectué sur le site de l'INPT : http://ethesis.inp-toulouse.fr/archive/0...
Abstract Many computer vision applications require robust and efficient estimation of camera geomet...
Efficient solutions to polynomial equation systems is an important topic in modern geometric compute...
Consensus maximization is a key strategy in 3D vision for robust geometric model estimation from mea...
Computer vision is today a wide research area including topics like robot vision, image analysis, pa...
Abstract. We introduce a framework for computing statistically optimal estimates of geometric recons...
Reconstructing the three-dimensional structure of a scene using images is a fundamental problem in c...
Rigid structure-from-motion (RSfM) and non-rigid structure-from-motion (NRSfM) have long been treate...
Abstract Finding a closed form solution to a system of polynomial equations is a common problem in ...
Rigid structure-from-motion (RSfM) and non-rigid structure-from-motion (NRSfM) have long been treate...
Many computer vision methods use consensus maximization to relate measurements containing outliers w...