Let D be a dataset of smooth 3D-surfaces, partitioned into disjoint classes CLj, j=1,…,k. We show how optimized diffeomorphic registration applied to large numbers of pairs S,S′∈D can provide descriptive feature vectors to implement automatic classification on D, and generate classifiers invariant by rigid motions in R3. To enhance accuracy of automatic classification, we enrich the smallest classes CLj by diffeomorphic interpolation of smooth surfaces between pairs S,S′∈CLj. We also implement small random perturbations of surfaces S∈CLj by random flows of smooth diffeomorphisms Ft:R3→R3. Finally, we test our automatic classification methods on a cardiology data base of discretized mitral valve surfaces.
Cite
@article{arxiv.2211.02530,
title = {Automatic classification of deformable shapes},
author = {Hossein Dabirian and Radmir Sultamuratov and James Herring and Carlos El Tallawi and William Zoghbi and Andreas Mang and Robert Azencott},
journal= {arXiv preprint arXiv:2211.02530},
year = {2022}
}