Abstract
Important concepts of the morphological sampling theorem and distance relationships are highlighted. Two representations are stated based on the kernels of morphological mappings, one as the union of erosions, the other as the intersection of dilations. A subset of this representation, namely basis functions, is used. An alternative proof for some of R. Haralick's theorems (see Proc. IEEE First Conference on Computer Vision, London 1987) using basis functions is shown. This decomposition is used to show the relationship of opening-closing in the sampled and unsampled domains.
| Original language | English (US) |
|---|---|
| Pages | 534-538 |
| Number of pages | 5 |
| State | Published - Dec 1 1990 |
| Event | Proceedings of the 1990 IEEE International Conference on Systems Engineering - Pittsburgh, PA, USA Duration: Aug 9 1990 → Aug 11 1990 |
Other
| Other | Proceedings of the 1990 IEEE International Conference on Systems Engineering |
|---|---|
| City | Pittsburgh, PA, USA |
| Period | 8/9/90 → 8/11/90 |
All Science Journal Classification (ASJC) codes
- Engineering(all)
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Morales, A., & Acharya, R. (1990). Alternating sequential filters and multiresolution morphology. 534-538. Paper presented at Proceedings of the 1990 IEEE International Conference on Systems Engineering, Pittsburgh, PA, USA, .