DIVAnd
(Data-Interpolating Variational Analysis in n dimensions) performs an n-dimensional variational analysis/gridding of arbitrarily located observations. Observations will be interpolated/analyzed on a curvilinear grid in 1, 2, 3 or more dimensions. In this sense it is a generalization of the original two-dimensional DIVA version (still available here https://github.com/gher-uliege/DIVA but not further developed anymore).
The method bears some similarities and equivalences with Optimal Interpolation or Krigging in that it allows to create a smooth and continous field from a collection of observations, observations which can be affected by errors. The analysis method is however different in practise, allowing to take into account topological features, physical constraints etc in a natural way. The method was initially developped with ocean data in mind, but it can be applied to any field where localized observations have to be used to produce gridded fields which are "smooth".
See also https://gher-uliege.github.io/DIVAnd-presentation/#1
Please cite this paper as follows if you use DIVAnd
in a publication:
Barth, A., Beckers, J.-M., Troupin, C., Alvera-Azcárate, A., and Vandenbulcke, L.: DIVAnd-1.0: n-dimensional variational data analysis for ocean observations, Geosci. Model Dev., 7, 225-241, doi:10.5194/gmd-7-225-2014, 2014.
(click here for the BibTeX entry).
- N-Dimensional analysis/interpolation
- Scattered data
- Noise allowed
- Physical constraints can be added
- Inequality constraints can be added
- Topological constraints are handled naturally (barriers, holes)
- Analysis error maps can be estimated
- Periodicity in selected directions can be enforced
- Multivariate data can be used (experimental)
- The output grid can be curvilinear
- Instead of interpolating scattered data you can also peform Kernel Density Estimations with the points.
You need Julia (version 1.6 or later) to run DIVAnd
. The command line version is sufficient for DIVAnd
.
Inside a Julia terminal, you can download and install the package by issuing:
using Pkg
Pkg.add("DIVAnd")
It is not recommended to download the source of DIVAnd.jl
directly (using the green Clone or Download button above) because this by-passes Julia's package manager and you would need to install the dependencies of DIVAnd.jl
manually.
To update DIVAnd, run the following command and restart Julia (or restart the jupyter notebook kernel using Kernel
-> Restart
):
using Pkg
Pkg.update("DIVAnd")
Note that Julia does not directly delete the previous installed version. To check if you have the latest version run the following command:
using Pkg
Pkg.status()
The latest version number is available from here.
To explicitly install a given version X.Y.Z
you can also use:
using Pkg
Pkg.add(name="DIVAnd", version="X.Y.Z")
Or the master version:
using Pkg
Pkg.add(name="DIVAnd", rev="master")
A test script is included to verify the correct functioning of the toolbox.
The script should be run in a Julia session.
Make sure to be in a directory with write-access (for example your home directory).
You can change the directory to your home directory with the cd(homedir())
command.
using Pkg
Pkg.test("DIVAnd")
All tests should pass without error (it can take several minutes).
INFO: Testing DIVAnd
Test Summary: | Pass Total
DIVAnd | 461 461
INFO: DIVAnd tests passed
The test suite will download some sample data. You need to have Internet access and run the test function from a directory with write access.
The main routine of this toolbox is called DIVAnd
which performs an n-dimensional variational analysis of arbitrarily located observations. Type the following in Julia to view a list of parameters:
using DIVAnd
?DIVAndrun
see also https://gher-uliege.github.io/DIVAnd.jl/latest/index.html
DIVAnd_simple_example_4D.jl is a basic example in fours dimensions. The call to DIVAndrun
looks like this:
fi,s = DIVAndrun(mask,(pm,pn,po,pq),(xi,yi,zi,ti),(x,y,z,t),f,len,epsilon2);
where
mask
is the land-sea mask, usually obtained from the bathymetry/topography,
(pm,pn,po,pq)
is a n-element tuple (4 in this case) containing the scale factors of the grid,
(xi,yi,zi,ti)
is a n-element tuple containing the coordinates of the final grid,
(x,y,z,t)
is a n-element tuple containing the coordinates of the observations,
f
is the data anomalies (with respect to a background field),
len
is the correlation length and
epsilon2
is the error variance of the observations.
The call returns fi
, the analyzed field on the grid (xi,yi,zi,ti)
.
More examples are available in the notebooks from the Diva Workshop.
DIVAndrun
is the core analysis function in n dimensions. It does not know anything about the physical parameters or units you work with. Coordinates can also be very general. The only constraint is that the metrics (pm,pn,po,...)
when multiplied by the corresponding length scales len
lead to non-dimensional parameters. Furthermore the coordinates of the output grid (xi,yi,zi,...)
need to have the same units as the observation coordinates (x,y,z,...)
.
DIVAndfun
is a version with a minimal set of parameters (the coordinates and values of observations, i.e. (x,f)
, the remaining parameters being optional) and provides an interpolation function rather than an already gridded field.
diva3D
is a higher-level function specifically designed for climatological analysis of data on Earth, using longitude/latitude/depth/time coordinates and correlations length in meters. It makes the necessary preparation of metrics, parameter optimizations etc you normally would program yourself before calling the analysis function DIVAndrun
.
DIVAnd_heatmap
can be used for additive data and produces Kernel Density Estimations.
DIVAndgo
is only needed for very large problems when a call to DIVAndrun
leads to memory or CPU time problems. This function tries to decide which solver (direct or iterative) to use and how to make an automatic domain decomposition. Not all options from DIVAndrun
are available.
If you want to try out multivariate approaches, you can look at DIVAnd_multivarEOF
and DIVAnd_multivarJAC
If zero is not a valid first guess for your variable (as it is the case for e.g. ocean temperature), you have to subtract the first guess from the observations before calling DIVAnd
and then add the first guess back in.
The parameter epsilon2
and parameter len
are crucial for the analysis.
epsilon2
corresponds to the inverse of the signal-to-noise ratio. epsilon2
is the normalized variance of observation error (i.e. divided by the background error variance). Therefore, its value depends on how accurate and how representative the observations are.
len
corresponds to the correlation length and the value of len
can sometimes be determined by physical arguments. Note that there should be one correlation length per dimension of the analysis.
One statistical way to determine the parameter(s) is to do a cross-validation.
- choose, at random, a relatively small subset of observations (about 5%). This is the validation data set.
- make the analysis without your validation data set
- compare the analysis to your validation data set and compute the RMS difference
- repeat steps 2 and 3 with different values of the parameters and try to minimize the RMS difference.
You can repeat all steps with a different validation data set to ensure that the optimal parameter values are robust. Tools to help you are included in (DIVAnd_cv.jl).
DIVAnd
allows the calculation of the analysis error variance, scaled by the background error variance. Though it can be calculated "exactly" using the diagonal of the error covariance matrix s.P, it is generally too costly and approximations are provided. All of them are accessible as options via DIVAnd_errormap
or you can let DIVAnd
decide which version to use (possibly by specifying if you just need a quick estimate or a version closer the theoretical estimate) (see Beckers et al 2014 )
An arbitrary number of additional quadratic constraints can be included to the cost function which should have the following form:
J(x) = ∑i (Ci x - zi)ᵀ Qi-1 (Ci x - zi)
For every constrain, a structure with the following fields is passed to DIVAnd
:
yo
: the vector ziH
: the matrix CiR
: the matrix Qi (symmetric and positive defined)
Internally the observations are also implemented as constraint defined in this way.
An arbitrary number of additional inequality constraints can be included and which should have the following form:
(Hi x > yoi)
For every constraint, a structure with the following fields is passed to DIVAnd
:
yo
: a vectorH
: a matrix
On the server, launch the notebook with:
jupyter-notebook --no-browser --ip='0.0.0.0' --port=8888
where the path to jupyter-notebook
might have to be adapted, depending on your installation. The ip
and port
parameters can also be modified.
Then from the local machine it is possible to connect to the server through the browser.
Thanks to Lennert and Bart (VLIZ) for this trick.
Some examples in DIVAnd.jl
use a quite large data set which cannot be efficiently distributed through git
. This data can be downloaded from the URL https://dox.ulg.ac.be/index.php/s/Bo01EicxnMgP9E3/download. The zip file should be decompressed and the directory DIVAnd-example-data
should be placed on the same level than the directory DIVAnd.jl
.
Please include the following information when reporting an issue:
- Version of Julia
- Version of DIVAnd
- Operating system
- Full screen output preferably obtained by setting
ENV["JULIA_DEBUG"] = "DIVAnd"
. - Full stack strace with error message
- A short description of the problem
- The command and their arguments which produced the error
Note that only official julia builds are supported.
In all cases, if we provide a tentative solution, please provide a feedback in all cases (whether it solved your issue or not).
An educational web application has been developed to reconstruct a field based on point "observations". The user must choose in an optimal way the location of 10 observations such that the analysed field obtained by DIVAnd
based on these observations is as close as possible to the original field.
You should really reconsider and try out Julia. It is easy to use and provides the native interface to DIVAnd
.
If you have a stable workflow using python, into which you want to integrate DIVAnd
, you might try