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ICCV
2001
IEEE
2001
IEEE
Image Segmentation with Minimum Mean Cut
We introduce a new graph-theoretic approach to image segmentation based on minimizing a novel class of `mean cut' cost functions. Minimizing these cost functions corresponds to finding a cut with minimum mean edge weight in a connected planar graph. This approach has several advantages over prior approaches to image segmentation. First, it allows cuts with both open and closed boundaries. Second, it guarantees that the partitions are connected. Third, the cost function does not introduce an explicit bias, such as a preference for large-area foregrounds, smooth or short boundaries, or similar-weight partitions. This lack of bias allows it to produce segmentations that are better aligned with image edges, even in the presence of long thin regions. Finally, the global minimum of this cost function is largely insensitive to the precise choice of edge-weight function. In particular, we show that the global minimum is invariant under a linear transformation of the edge weights and thus...
Real-time TrafficComputer Vision | Cost Function | Cost Functions Corresponds | Global Minimum | ICCV 2001 | Mean-cut Cost Function | Minimum Mean Edge |
Related Content
| Added | 15 Oct 2009 |
| Updated | 15 Oct 2009 |
| Type | Conference |
| Year | 2001 |
| Where | ICCV |
| Authors | Song Wang, Jeffrey Mark Siskind |
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