6533b871fe1ef96bd12d1a25

RESEARCH PRODUCT

Globally Optimal Line Clustering and Vanishing Point Estimation in Manhattan World

Cédric DemonceauxKatsushi IkeuchiMarc PollefeysIn So KweonYongduek SeoPascal VasseurJean-charles Bazin

subject

0209 industrial biotechnologyMathematical optimization[INFO.INFO-RB] Computer Science [cs]/Robotics [cs.RO][ INFO.INFO-RB ] Computer Science [cs]/Robotics [cs.RO]02 engineering and technologyReal imageParallelMaxima and minima020901 industrial engineering & automationOrthogonalityLine (geometry)0202 electrical engineering electronic engineering information engineering[INFO.INFO-RB]Computer Science [cs]/Robotics [cs.RO]020201 artificial intelligence & image processingVanishing pointCluster analysisRotation (mathematics)Mathematics

description

The projections of world parallel lines in an image intersect at a single point called the vanishing point (VP). VPs are a key ingredient for various vision tasks including rotation estimation and 3D reconstruction. Urban environments generally exhibit some dominant orthogonal VPs. Given a set of lines extracted from a calibrated image, this paper aims to (1) determine the line clustering, i.e. find which line belongs to which VP, and (2) estimate the associated orthogonal VPs. None of the existing methods is fully satisfactory because of the inherent difficulties of the problem, such as the local minima and the chicken-and-egg aspect. In this paper, we present a new algorithm that solves the problem in a mathematically guaranteed globally optimal manner and can inherently enforce the VP orthogonality. Specifically, we formulate the task as a consensus set maximization problem over the rotation search space, and further solve it efficiently by a branch-and-bound procedure based on the Interval Analysis theory. Our algorithm has been validated successfully on sets of challenging real images as well as synthetic data sets.

yearjournalcountryeditionlanguage
2012-06-16
https://hal.archives-ouvertes.fr/hal-00697707