Combinatorial Gradient Fields for 2D Images with Empirically Convergent Separatrices
Computer Vision and Pattern Recognition
2012-09-03 v1 Computational Geometry
Discrete Mathematics
Abstract
This paper proposes an efficient probabilistic method that computes combinatorial gradient fields for two dimensional image data. In contrast to existing algorithms, this approach yields a geometric Morse-Smale complex that converges almost surely to its continuous counterpart when the image resolution is increased. This approach is motivated using basic ideas from probability theory and builds upon an algorithm from discrete Morse theory with a strong mathematical foundation. While a formal proof is only hinted at, we do provide a thorough numerical evaluation of our method and compare it to established algorithms.
Cite
@article{arxiv.1208.6523,
title = {Combinatorial Gradient Fields for 2D Images with Empirically Convergent Separatrices},
author = {Jan Reininghaus and David Günther and Ingrid Hotz and Tino Weinkauf and Hans Peter Seidel},
journal= {arXiv preprint arXiv:1208.6523},
year = {2012}
}
Comments
17 pages, 7 figures