A Quality-Preserving Cartesian to Body-Centered Cubic Downsampling Transform
Abstract
The body-centered cubic lattice is the optimal sampling lattice in three dimensions. However, most volumetric datasets are acquired on the well-known Cartesian cubic lattice. In order to leverage the approximation capabilities of the body-centred cubic lattice, we propose a factor-of-four Cartesian to body-centered downsampling transform. We derive a Fourier domain post-aliasing error kernel and use it to optimize the cosine-weighted trilinear B-spline kernel. We demonstrate that our downsampling transform preserves fidelity when an oversampled function of interest is reconstructed with trilinear interpolation on the fine-scale Cartesian grid, and optimized cosine-weighted trilinear approximation on the coarse-scale body-centered cubic grid.
BibTeX
@inproceedings {10.2312:eurovisshort.20151119,
booktitle = {Eurographics Conference on Visualization (EuroVis) - Short Papers},
editor = {E. Bertini and J. Kennedy and E. Puppo},
title = {{A Quality-Preserving Cartesian to Body-Centered Cubic Downsampling Transform}},
author = {Alim, Usman R. and Oliveira, Thiago Valentin de},
year = {2015},
publisher = {The Eurographics Association},
DOI = {10.2312/eurovisshort.20151119}
}
booktitle = {Eurographics Conference on Visualization (EuroVis) - Short Papers},
editor = {E. Bertini and J. Kennedy and E. Puppo},
title = {{A Quality-Preserving Cartesian to Body-Centered Cubic Downsampling Transform}},
author = {Alim, Usman R. and Oliveira, Thiago Valentin de},
year = {2015},
publisher = {The Eurographics Association},
DOI = {10.2312/eurovisshort.20151119}
}