This is an open-source C++ implementation written by Rafael Ballester-Ripoll ([email protected]) of the compressor developed in TTHRESH: Tensor Compression for Multidimensional Visual Data (R. Ballester-Ripoll, P. Lindstrom and R. Pajarola). It is intended for Cartesian grid data of 3 or more dimensions, and leverages the higher-order singular value decomposition (HOSVD), a generalization of the SVD to 3 and more dimensions.
If you use TTHRESH for a scientific publication, please cite one or both of these papers:
- TTHRESH: Tensor Compression for Multidimensional Visual Data:
@article{BLP:19, Author = {Ballester-Ripoll, Rafael and Lindstrom, Peter and Pajarola, Renato}, Journal = {IEEE Transaction on Visualization and Computer Graphics}, Keywords = {visualization, data compression, volume rendering, higher-order decompositions, tensor approximation}, Title = {TTHRESH: Tensor Compression for Multidimensional Visual Data}, Volume = {26}, Issue = {9}, Pages = {2891--2903}, Year = {2019}}
- Lossy Volume Compression Using Tucker Truncation and Thresholding:
@article{BP:15, year={2015}, issn={0178-2789}, journal={The Visual Computer}, title={Lossy volume compression using {T}ucker truncation and thresholding}, publisher={Springer Berlin Heidelberg}, keywords={Tensor approximation; Data compression; Higher-order decompositions; Tensor rank reduction; Multidimensional data encoding}, author={Ballester-Ripoll, Rafael and Pajarola, Renato}, pages={1--14}}
For more information on the Tucker transform and tensor-based volume compression, check out our slides.
"Isotropic fine" turbulence timestep (512x512x512, 32-bit float) from the Johns Hopkins Turbulence Database:
git clone https://github.com/rballester/tthresh.git
(or as a zip file).
Use CMake to generate an executable tthresh
:
mkdir build
cd build
cmake -DCMAKE_BUILD_TYPE=Release ..
make
Compression:
tthresh -i <dataset> <options> -c <compressed dataset>
Decompression:
tthresh -c <compressed dataset> -o <decompressed dataset>
Compression + decompression (this will print both the compression rate and the achieved accuracy):
tthresh -i dataset <options> -c <compressed dataset> -o <decompressed dataset>
The target accuracy can be specified either as relative error (-e
), RMSE (-r
) or PSNR (-p
).
Toy example:
A toy data set (a 3D sphere) is included in the data/
folder. You can test the compressor with it as follows:
tthresh -i data/3D_sphere_64_uchar.raw -t uchar -s 64 64 64 -p 30 -c data/comp.raw -o data/decomp.raw
- Use
-a
to reconstruct only the data set's bounding box. - Use
-k
when compressing a file to skip its k leading bytes. - Use NumPy-like notation immediately after
-o
to decimate the data while decompression. For example,-o :: :: 0
will reconstruct only the first z-slice of a volume,-o ::2 ::2 ::2
will decompress only every other voxel along all dimensions, and-o ll4 ll4 ll4
will perform Lanczos downsampling by a factor of 4. Some result examples for x2 decimation:
To get more info on the available options, run tthresh -h
.
This work was partially supported by the UZH Forschungskredit "Candoc", grant number FK-16-012. I also thank Enrique G. Paredes for his help with CMake compilation issues.
Tensor-based compression is non-local, in the sense that all compressed coefficients contribute to the reconstruction of each individual voxel (in contrast to e.g. wavelet transforms or JPEG for images, which uses a localized DCT transform). This can be computationally demanding but decorrelates the data at all spatial scales, which has several advantages:
- Very competitive compression quality
- Fine bit-rate granularity
- Smooth degradation at high compression (in particular, no blocking artifacts or temporal glitches)
- Ability to downsample in the compressed domain