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CVPR
2006
IEEE
2006
IEEE
Globally Optimal Grouping for Symmetric Boundaries
Many natural and man-made structures have a boundary that shows certain level of bilateral symmetry, a property that has been used to solve many computer-vision tasks. In this paper, we present a new grouping method for detecting closed boundaries with symmetry. We first construct a new type of grouping token in the form of a symmetric trapezoid, with which we can flexibly incorporate various boundary and region information into a unified grouping cost function. Particularly, this grouping cost function integrates Gestalt laws of proximity, closure, and continuity, besides the desirable boundary symmetry. We then develop a graph algorithm to find the boundary that minimizes this grouping cost function in a globally optimal fashion. Finally, we test this method by some experiments on a set of natural and medical images.
Real-time TrafficComputer Vision | CVPR 2006 | Desirable Boundary Symmetry | Grouping Cost Function | Unified Grouping Cost |
| Added | 10 Jun 2010 |
| Updated | 10 Jun 2010 |
| Type | Conference |
| Year | 2006 |
| Where | CVPR |
| Authors | Joachim S. Stahl, Song Wang |
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