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On Pencils of Tangent Planes and the Recognition of Smooth 3D Shapes from Silhouettes

  • Svetlana Lazebnik
  • Amit Sethi
  • Cordelia Schmid
  • David Kriegman
  • Jean Ponce
  • Martial Hebert
Conference paper
Part of the Lecture Notes in Computer Science book series (LNCS, volume 2352)

Abstract

This paper presents a geometric approach to recognizing smooth objects from their outlines. We define a signature function that associates feature vectors with objects and baselines connecting pairs of possible viewpoints. Feature vectors, which can be projective, affine, or Euclidean, are computed using the planes that pass through a fixed baseline and are also tangent to the object’s surface. In the proposed framework, matching a test outline to a set of training outlines is equivalent to finding intersections in feature space between the images of the training and the test signature functions. The paper presents experimental results for the case of internally calibrated perspective cameras, where the feature vectors are angles between epipolar tangent planes.

Keywords

Feature Vector Feature Space Image Plane Signature Function Tangent Plane 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

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Copyright information

© Springer-Verlag Berlin Heidelberg 2002

Authors and Affiliations

  • Svetlana Lazebnik
    • 1
  • Amit Sethi
    • 1
  • Cordelia Schmid
    • 2
  • David Kriegman
    • 1
  • Jean Ponce
    • 1
  • Martial Hebert
    • 3
  1. 1.Beckman Institute for Advanced Science and TechnologyUniversity of Illinois at Urbana-ChampaignUrbanaUSA
  2. 2.INRIA Rhône-AlpesMontbonnotFrance
  3. 3.Robotics InstituteCarnegie Mellon UniversityPittsburghUSA

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