Abstract
We present a novel perspective on shape characterization using the screened Poisson equation. We discuss that the effect of the screening parameter is a change of measure of the underlying metric space. Screening also indicates a conditioned random walker biased by the choice of measure. A continuum of shape fields is created by varying the screening parameter or, equivalently, the bias of the random walker. In addition to creating a regional encoding of the diffusion with a different bias, we further break down the influence of boundary interactions by considering a number of inde- pendent random walks, each emanating from a certain boundary point, whose superposition yields the screened Poisson field. Probing the screened Poisson equation from these two complementary perspectives leads to a high-dimensional hyperfield: a rich characterization of the shape that en- codes global, local, interior, and boundary interactions. To extract particular shape information as needed in a compact way from the hyperfield, we apply various decompositions either to unveil parts of a shape or parts of a boundary or to create consistent mappings. The latter technique in- volves lower-dimensional embeddings, which we call screened Poisson encoding maps (SPEM). The expressive power of the SPEM is demonstrated via illustrative experiments as well as a quantitative shape retrieval experiment over a public benchmark database on which the SPEM method shows a high-ranking performance among the existing state-of-the-art shape retrieval methods.
Original language | English |
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Pages (from-to) | 2558-2590 |
Number of pages | 33 |
Journal | SIAM Journal on Imaging Sciences |
Volume | 7 |
Issue number | 4 |
DOIs | |
Publication status | Published - 5 Dec 2014 |
Externally published | Yes |
Bibliographical note
Publisher Copyright:© 2014 Society for Industrial and Applied Mathematics.
Keywords
- Conditioned random walker
- Elliptic models for distance transforms
- Level-set models
- Nonnegative sparse coding
- Nonrigid shape retrieval
- Screened Poisson encoding maps (SPEM)
- Screened Poisson equation
- Shape decomposition