SIGDT: 2D Curve Reconstruction
Abstract
Determining connectivity between points and reconstructing their shape boundaries are long-standing problems in computer graphics. One possible approach to solve these problems is to use a proximity graph. We propose a new proximity graph computed by intersecting the to-date rarely used proximity-based graph called spheres-of-influence graph (SIG) with the Delaunay triangulation (DT). We prove that the resulting graph, which we name SIGDT, contains the piece-wise linear reconstruction for a set of unstructured points in the plane for a sampling condition superseding current bounds and capturing well practical point sets' properties. As an application, we apply a dual of boundary adjustment steps from the CONNECT2D algorithm to remove the redundant edges. We show that the resulting algorithm SIG-CONNECT2D yields the best reconstruction accuracy compared to state-of-the-art algorithms from a recent comprehensive benchmark, and the method offers the potential for further improvements, e.g., for surface reconstruction.
BibTeX
@article {10.1111:cgf.14654,
journal = {Computer Graphics Forum},
title = {{SIGDT: 2D Curve Reconstruction}},
author = {Marin, Diana and Ohrhallinger, Stefan and Wimmer, Michael},
year = {2022},
publisher = {The Eurographics Association and John Wiley & Sons Ltd.},
ISSN = {1467-8659},
DOI = {10.1111/cgf.14654}
}
journal = {Computer Graphics Forum},
title = {{SIGDT: 2D Curve Reconstruction}},
author = {Marin, Diana and Ohrhallinger, Stefan and Wimmer, Michael},
year = {2022},
publisher = {The Eurographics Association and John Wiley & Sons Ltd.},
ISSN = {1467-8659},
DOI = {10.1111/cgf.14654}
}