Summer of Code - Getting Started
The following is distilled from the Projects page for the benefit of potential Summer of Code (SoC) students. Although students are welcome to attempt any of the projects in that page or any of their own choosing, here we offer some suggestions on what good student projects might be.
Steps Toward a Successful Application
If you like any of the projects described below these are the steps you need to follow to apply:
- Help Us Get To Know You
- If you aren't communicating with us before the application is due, your application will not be accepted.
- Join the maintainers mailing list or read the archives and see what topics we discuss and how the developers interact with each other.
- Hang out in our IRC channel. Ask questions, submit patches, show us that you are motivated and well-prepared. There will be more applicants than we can effectively mentor, so do ask for feedback on your public application to increase the strength of your proposal!
- Find Something That Interests You
- It's critical that you find a project that excites you You'll be spending most of the summer working on it (we expect you to treat the SoC as a full-time job). But don't just tell us how interested you are, show us. You can do that by fixing a few bugs or interacting with us on IRC well before the deadline. Our experience shows us that successful SoC students demonstrate their interest early and often.
- Prepare Your Proposal With Us
- By working with us to prepare your proposal, you'll be getting to know us and showing us how you approach problems. The best place for this is your wiki user page and the IRC channel.
- Complete Your Application
- Fill out our public application template.
- Fill out our private application template.
- This is best done by copying the template from its page and adding the required information to your application at Google (melange) or at ESA.
- Only the organization admin and the possible mentors will see this data. You can still edit it after submitting until the deadline!
- This is best done by copying the template from its page and adding the required information to your application at Google (melange) or at ESA.
Things You'll be Expected to Know or Quickly Learn
Octave is mostly written in C++ and its own scripting language that is mostly compatible with Matlab. There are bits and pieces of Fortran, Perl, C, awk, and Unix shell scripts here and there. In addition to being familiar with C++ and Octave's scripting language, successful applicants will be familiar with or able to quickly learn about Octave's infrastructure. You can't spend the whole summer learning how to build Octave or prepare a changeset and still successfully complete your project.
- The Build System
- The GNU build system is used to build Octave.
- While you generally don't need to understand too much unless you actually want to change how Octave is built, you should be able to understand enough to get a general idea of how to build Octave.
- If you've ever done a configure && make && make install series of commands, you have already used the GNU build system.
- You must demonstrate that you are able to build the development version of Octave from sources before the application deadline.
- The Version Control System
- We use Mercurial (abbreviated hg).
- Mercurial is the distributed version control system (DVCS) we use for managing our source code. You should have some basic understanding of how a DVCS works, but hg is pretty easy to pick up, especially if you already know a VCS like git or svn.
- The Procedure for Contributing Changesets
- You will be expected to follow the same procedures as other contributors and core developers.
- You will be helping current and future Octave developers by using the same style for changes, commit messages, and so on. You should also read the same contributing guidelines we have for everyone.
- The Maintainers Mailing List
- We primarily use mailing lists for communication among developers.
- The mailing list is used most often for discussions about non-trivial changes to Octave, or for setting the direction of development.
- You should follow basic mailing list etiquette. For us, this mostly means "do not top post".
- The IRC Channel
- We also have the #octave IRC channel in Freenode.
- You should be familiar with the IRC channel. It's very helpful for new contributors (you) to get immediate feedback on ideas and code.
- Unless your primary mentor has a strong preference for some other method of communication, the IRC channel will likely be your primary means of communicating with your mentor and Octave developers.
- The Octave Forge Project
- Octave-Forge is a project closely related to Octave where packages reside. They are somewhat analogous to Matlab's toolboxes.
- Related Skills
- In addition, you probably should know some mathematics, engineering, or experimental science or something of the sort.
- If you've used Matlab before, you probably have already been exposed to the kinds of problems that Octave is used for.
The following projects are broadly grouped by category and probable skills required to tackle each. Remember to check Projects for more ideas if none of these suit you, and your own ideas are always welcome.
These projects involve implementing certain mathematical functions in Octave.
Required skills: You should understand quite a bit of mathematics. Words like "eigenvalue", "analytic", and "Taylor series" shouldn't scare you at all. There is probably little C++ experience required, and probably many of these problems can be solved with m-scripts.
Difficulty: Mid-to-hard depending how much mathematics you know and how well you can read numerical analysis journal articles.
Potential mentor: Carlo de Falco, Fotios Kasolis, Luis Gustavo Lira
Incomplete sparse factorizations ichol, ilu
Octave still lacks of an incomplete Cholesky and LU factorization for sparse matrices. These functions are available in Matlab as ichol and ilu. Incomplete factorizations are useful as preconditioners for iterative solvers such as gmres or pcg.
Good introductions to the math behind these factorizations are:
- Templates for the Solution of Linear Systems: Building Blocks for Iterative Methods especially this chapter
- Iterative Methods for Sparse Linear Systems (2nd Edition) chapter 10 (also available as textbook)
One should additionally familiarize with Octave's internal sparse matrix format which is CCS rather than CRS, used in the listed textbooks. In the past GSoC a solution using ITSOL has been created. This work needs several improvements before it can be integrated into the Octave core. Read more about the past GSoC project in this blog. A demo implementation is also available from there.
Compared to other projects in this section this one might require more knowledge of C++ and mathematical software programming. But this project doesn't need to be started from scratch and can be continued from the previous approach, if desired. For more information feel free to contact <email@example.com>.
General purpose Finite Element library
Octave-Forge already has a set of packages for discretizing Partial Differential operators by Finite Elements and/or Finite Volumes, namely the bim package which relies on the msh package (which is in turn based on gmsh) for creating and managing 2D triangular and 3D tetrahedral meshes and on the fpl package for visualizing 2D results within Octave or exporting 2D or 3D results in a format compatible with Paraview or VisIT. These packages, though, offer only a limited choice of spatial discretization methods which are based on low degree polynomials and therefore have a low order of accuracy even for problems with extremely smooth solutions. The GeoPDEs project, on the other hand, offers a complete suite of functions for discretizing a wide range of differential operators related to important physical problems and uses basis functions of arbitrary polynomial degree that allow the construction of methods of high accuracy. These latter, though, are based on the IsoGeometric Analysis Method which, although very powerful and often better performing, is less widely known and adopted than the Finite Elements Method. The implementation of a general purpose library of Finite Elements seems therefore a valuable addition to Octave-Forge. Two possible interesting choices for implementing this package exist, the first consists of implementing the most common Finite Element spaces in the GeoPDEs framework, which is possible as IsoGeometric Analysis can be viewed as a superset of the Finite Element Method, the other is to construct Octave language bindings for the free software library FEniCS based on the existing C++ or Python interfaces. This second approach has been developed during the GSOC 2013 and the Octave-Forge package fem-fenics is now available. However, fem-fenics could be extended in many different ways:
- implement the bindings for the UFL language inside Octave
- add new functions already available with Fenics but not yet in Octave
- create new functions specifically suited for Octave
- improve the efficiency of the code
The main goal for the fem-fenics package is ultimately to be merged with the FEnics project itself, so that it can remain in-sync with the main library development.
Improve logm, sqrtm, funm
Generalised eigenvalue problem
Certain calling forms of the eig function are missing. The problem is to understand what those missing forms are and implement them.
Various sparse matrix improvements
The implementation of sparse matrices in Octave needs several improvements. Any of these would be good. The paper by Bateman & Adler is good reading for understanding the sparse matrix implementation.
Implement solver for initial-boundary value problems for parabolic-elliptic PDEs in 1D
The project will deliver a solver for initial-boundary value problems for parabolic-elliptic PDEs in 1D similar to Matlab's function pdepe. A good starting point is the method of lines for which you can find more details here and here, whereas an example implementation can be found here. In addition, this page provides some useful material.
Implement solver for 1D nonlinear boundary value problems
The project will complete the implementation of the bvp4c solver that is already available in an initial version in the odepkg package by adding a proper error estimator and will implement a matlab-compatible version of the bvp5c solver. Details on the methods to be implemented can be found in this paper on bvp4c and this paper on bvp5c. Further details are available in this book.
Geometric integrators for Hamiltonian Systems
Geometric (AKA Symplectic) integrators are useful for multi-dimensional classical mechanics problems and for molecular dynamics simulations. The odepkg package has a number of solvers for ODE, DAE and DDE problems but none of them is currently specifically suited for second order problems in general and Hamiltonian systems in particular. Therefore a new package for geometric integrators would be a useful contribution. This could be created as new package or added as a set of new functions for odepkg. The function interface should be consistent throughout the package and should be modeled to follow that of other functions in odepkg (or that of DASPK and LSODE) but will need specific extensions to accommodate for specific options that only make sense for this specific class of solvers. An initial list of methods to be implemented includes (but is not limited to)
- Symplectic Euler methods, see here and here
- Störmer-Verlet method, see here and here
- Velocity Verlet method, see here and here
- Symplectic partitioned Runge-Kutta methods, see here or here
- Spectral Variational Integrator methods, see here or here
For this latter there is an existing code which is already working but needs to be improved, posted on the patch tracker. Furthermore, methods to implement solutions of problems with rigid constraints should be implemented, e.g.
Potential mentor: Mattia Penati, Edie Miglio, Carlo de Falco
Matlab-compatible ODE solvers in core-Octave
- Adapt "odeset" and "odeget" from the odepkg package so that the list of supported options is more Matlab-compatible, in the sense that all option names that are supported by Matlab should be available. On the other hand, Matlab returns an error if an option which is not in the list of known options is passed to "odeset", but we would rather make this a warning in order to allow for special extensions, for example for symplectic integrators.
- Adapt the interface of "ode45" in odepkg to be completely Matlab compatible, fix its code and documentation style and move it to Octave-core.
- Build Matlab compatible versions of "ode15s" and "ode15i". jwe has prototype implementations  of these built as wrappers to "dassl" and "daspk". An initial approach could be to just improve these wrappers, but eventually it would be better to have wrappers for "IDA" from the sundials library.
- Implement Matlab compatible versions of "deval".
Potential mentor: Sebastian Schöps, Carlo de Falco
Octave currently includes an experimental native GUI, written in Qt. There are various ways in which it could be improved.
Required skills: C++ and Qt. Whatever tools you want to use to write Qt code are fine, but Qt Creator is a popular choice nowadays.
Difficulty: Mostly medium, depending if you've had Qt or GUI development experience before.
Potential mentor: Jordi Gutiérrez Hermoso, Michael Goffioul, Torsten
Finish the Octave GUI
The GUI is currently on its own branch in hg. It is not stable enough and its design is still in flux. It is in a very alpha stage and needs to be turned into a real usable product. At the moment, it consists of the basic building blocks (terminal window, editor, variable browser, history, file browser) that are put together into a main interface. The GUI uses the Qt library. Among the things to improve are:
- improve integration with octave: variable browser/editor, debugger, profiler...
- define and implement an option/preferences dialog
- improve additional components like the documentation browser
Fix existing bugs related to the GUI, which can be browsed here
Implement a Qt widget for manipulating plots
Octave has had for some time a native OpenGL plotter. The plotter requires some user interaction for manipulating the plots, and it's been using fltk for quite some time. We want to replace this with Qt, so it fits better with the overall GUI look-and-feel and is easier to extend in the future.
QtHandles is a current work in progress integrating the octave OpenGL renderer plus good support for GUI elements (uicontrol, uimenu, uitoolbar...). This project may initially consists of integrating the existing QtHandles code base into Octave. Then if time permits, further improvements can be made to QtHandles.
Create a better (G)UI for the profiler
During GSoC 2011, Daniel Kraft successfully implemented a profiler for Octave. It needs a better interface and a way to generate reports. This may be done with Qt, but not necessarily, and HTML reports might also be good.
Create a graphical design tool for tuning closed loop control system (control pkg)
When tuning a SISO feedback system it is very helpful to be able to grab a pole or a zero and move them by dragging them with the mouse. As they are moving the software must update all the plotted lines. There should be the ability to display various graphs rlocuse, bode, step, impulse etc. and have them all change dynamically as the mouse is moving. The parameters of the compensator must be displayed and updated. Potential mentor: Doug Stewart
Octave has a new native OpenGL plotter (currently via fltk, but we want to move away from that). There are several possible projects involved with it.
Required skills: C++ and OpenGL. General understanding of computer graphics.
Difficulty: Medium, depending on your previous understanding of the topic.
Potential mentor: Michael Goffioul
Implement transparency and lighting in OpenGL backend(s). A basic implementation is available in JHandles. This needs to be ported/re-implement/re-engineered/optimized in the C++ OpenGL renderer of Octave.
Object selection in OpenGL renderer
This project is about the implementation of a selection method of graphics elements within the OpenGL renderer 
Besides the original gnuplot backend, Octave also contains an OpenGL-based renderer for advanced and more powerful 3D plots. However, OpenGL is not perfectly suited for 2D-only plots where other methods could result in better graphics. The purpose of this project is to implement an alternate graphics renderer for 2D only plots (although 3D is definitely not the focus, extending the new graphics renderer to support basic 3D features should also be taken into account). There is no particular toolkit/library that must be used, but natural candidates are:
- Qt: the GUI is currently written in Qt and work is also in progress to provide a Qt/OpenGL based backend 
- Cairo: this library is widely used and known to provides high-quality graphics with support for PS/PDF/SVG output.
Text objects in plots (like titles, labels, texts...) in the OpenGL renderer only support plain text mode without any formatting possibility. Support for TeX and/or LaTeX formatting needs to be added.
- The TeX formatting support actually only consists of a very limited subset of the TeX language. This can be implemented directly in C++ into Octave by extending the existing text engine, avoiding to add a dependency on a full TeX system. Essentially, support for Greek letters, super/sub-scripts, and several mathematical symbols needs to be supported. For example,
\alpha \approx \beta_0 + \gamma^\chi
- Would be rendered as,
- α ≈ β0 + γχ
- This is analogous to how special characters may be included in a wiki using html.
α ≈ β<sub>0</sub> + γ<sup>χ</sup>
- The text object's
extentfor the rendered result needs to be calculated and the text placed the location specified by the text object's
positionproperty. An itemized list of a text objects properties can be found here.
- On the other hand, the LaTeX formatting support is expected to provide full LaTeX capabilities. This will require to use an external LaTeX system to produce text graphics in some format (to be specified) that is then integrated into Octave plots.
- The matplotlib project has already done this in Python and might be used as an example of how to do this in Octave. Mediawiki has also also done something similar. There is also JLaTeXMath, a Java API to display LaTeX code in mathematical mode.
The interpreter is written in C++, undocumented. There are many possible projects associated with it.
Required skills: Very good C and C++ knowledge, possibly also understanding of GNU bison and flex. Understanding how compilers and interpreters are made plus being able to understand how to use a profiler and a debugger will probably be essential skills.
Difficulty: Mid hard to very hard. Some of the biggest problems will probably be the interpreter.
Potential mentors: John W. Eaton, Jordi Gutiérrez Hermoso, Max Brister.
Improve JIT compiling
Octave's interpreter is very slow on some loops. Last year, thanks to Max Brister's work, an initial implement of a just-in-time compiler (JITC) in LLVM for GSoC 2012. This project consists in understanding Max's current implementation and extending it so that functions and exponents (e.g. 2^z) compile with the JITC. This requires knowledge of compilers, C++, LLVM, and the Octave or Matlab languages. A capable student who demonstrates the ability to acquire this knowledge quickly may also be considered. Max himself will mentor this project. Here is Max's OctConf 2012 presentation about his current implementation. See also JIT.
Improve memory management
From profiling the interpreter, it appears that a lot of time is spending allocating and deallocating memory. A better memory management algorithm might provide some improvement.
Implement classdef classes
Matlab has two kinds of classes: old style @classes and new style classdef. Octave has only fully implemented the old style. There is partial support for new classes in our classdef branch. There is irregular work here, and classdef is a very complicated thing to fully implement. A successful project would be to implement enough of classdef for most basic usages. Familiarity with Matlab's current classdef support would be a huge plus. Michael Goffioul and jwe can mentor this.
There are several projects closely related to Octave but not exactly core Octave that could be worked on. They are mostly infrastructure around Octave, stuff that would help a lot.
Required skills: Various. See below.
Difficulty: Various. See below.
Potential mentor: Jordi Gutiérrez Hermoso, Carlo de Falco
Finish the Agora website
In response to this, a website started to form, Agora Octave.
This should be relatively easy webdev in Python using Django.
Things to be considered when working on this:
- discussion of Agora during OctConf2012
- Scipy Central - a website with the same objective as Agora for Scipy. Their code is released under a BSD license. Might be useful to reuse some parts.
Most of the basic functionality of Agora is already in, but there are many ways in which it could be improved, such as implementing comment threads, giving it an email interface, or a ReSTful API which could be used from Octave for package management. See also Agora.
Improve binary packaging
We would like to be able to easily generate binary packages for Windows and Mac OS X. Right now, it's difficult and tedious to do so. Any way to help us do this in a faster way would be appreciated. Required knowledge is understanding how building binaries in Windows and Mac OS X works. Our current approach to fixing this is to cross-compile from a GNU system using MXE or GUB.
Skills Required: Knowledge of GNU build systems, Makefiles, configure files, chasing library dependencies, how to use a compiler. If you choose to work on GUB, Python will be required. No m-scripting or C++ necessary, beyond understanding the C++ compilation model.
Difficulty: Medium to easy. You need to understand how build systems work and how to fix packages when they don't build.
Possible mentors: John W. Eaton or Jordi Gutiérrez Hermoso
Installation of packages
We would like to enhance the management of Octave-forge packages from within Octave environment. Currently there is a working (but rather monolithic) function that is used to do the job. The work would be to improve the way Octave interacts with the package server. Since the functionality is already sketched by the current function, the most important skill is software design.
Minimum requirements: Ability to read and write Octave code. Minimal FTP/HTTP knowledge.
Improve MPI package
Octave Forge's MPI package is a wrapper for basic MPI functions for parallel computing. It is implemented by wrapping MPI function calls in simple DLD functions that map Octave's Datataypes to MPI Derived Datatypes. The proposed project deals with improving and extending the Octave MPI package, for example:
- Octave MPI applications can currently be only run in batch mode, add the ability to launch parallel jobs and collect their output in an interactive Octave session.
- Implement functions for non-blocking communication (MPI_Isend, MPI_Irecv)
- Implement one-to-many (Broadcast, Scatter), many-to-one (Reduce, Gather), and many-to-many (All Reduce, Allgather) communication routines
Required skills: C++. Message Passing Interface (MPI).
Potential mentor: Carlo de Falco, Michael Creel, Sukanta Basu
Rewrite symbolic package
Octave's current symbolic package for symbolic computation is outdated, fragile and limited in its capabilities. The new symbolic package should offer better Matlab compatibility, for example handling of symbolic matrices. Like the current symbolic package, the new package could use the proven GiNaC library for symbolic computations.
The work would be to integrate GiNaC by using Octave's objects and classes. This can be done in C++ in a way similar to Michele Martone's new sparsersb package.
This idea has not been selected by any SoC student yet, if you want to see it happen before next SoC you can offer a bounty here.
Required skills: C++. Ability to understand Octave and GiNaC API documentation.
Potential mentor: Lukas Reichlin
Improvements to N-dimensional image processing
The image package has partial functionality for N-dimensional images. These images do exist in practice for example in medical imaging where slices from scans are assembled to form anatomical 3D images, or even exposures taken over time on different wavelengths can result in 5D images. As part of GSoC 2013, the core functions
imread were extended to better support this type of images. Likewise, many functions in the image package, mostly morphology operators, were expanded to deal with this type of images. Still, many are left to, specially image transformation and analysis of ROIs.
Note that while many of the functions in the image package will not complain about ND images, they are actually not correctly implemented and will give incorrect results.
Required skills: Mostly m-file scripting, some C++. Familiarity with common CS algorithms will be useful.
Potential mentor: Jordi Gutiérrez Hermoso
Interface to Electronic Circuit Simulator
Qucs is a C++ based circuit simulation package. This project aims to improve the interface to the Qucs algorithms to allow the transient, i.e. time series, simulation of circuits in Octave within a larger ODE system simulation driven by Octave. Other possible goals would be to make other analysis types available directly from Octave. There is an existing C++ interface which is based on handle class syntax available in the development version of Octave. The Qucs interface is intended to have two modes, synchronous and asynchronous. The asynchronous mode uses qucs to solve a circuit between two given time steps (internally taking as many smaller time steps as required), returning only the final result. This method is well developed. The alternative synchronous mode is intended to give full control of the time steps to Octave, and it is this mode which requires more work. A simple synchronous interface exists which can be built upon.
Required skills: C++ and m-file scripting. Familiarity with new classdef syntax would be useful. May require some modification/adaptation of the Qucs sources. Familiarity with the Octave ODE solvers useful but not essential. Ability to compile Octave from the development sources.
Potential mentor: Richard Crozier
- Improve the functionality of the transient solver interface by implementing a robust synchronous simulation mode that integrates well with Octave ode solvers, particularly those from the odepkg package from OctaveForge.
- Create interface to other analysis types (AC, DC, S-Parameter and Harmonic Balance)
- Packaging the interface for Octave, to make it available through OctaveForge
Color management functions in image package
The goal is to implement these functions:
iccread iccwrite makecform applycform
These functions are useful for color management, in particular for converting data (especially images) between color spaces. ICC profiles are essentially used to store look-up tables or matrix transforms (or both) that define the conversions. For example, to convert an CMYK image to sRGB, you would load a "print" ICC profile that defines the conversion from CMYK to L*a*b* (the CIE color space that is supposed to match the human visual system), then load another profile that defines the conversion from L*a*b* to sRGB (there is a standard profile for this conversion (IEC 61966-2-1), which is why Matlab has a built-in conversion from sRGB to L*a*b*). To do the above conversions in Matlab, you would use the following code:
cmykImage = double(imread('cmyk-image-filename.tif')); iccProfile = iccread('icc-profile-filename.icc'); labImage = applycform(cmykImage, makecform('clut', iccProfile, 'AToB3')); rgbImage = applycform(labImage, makecform('lab2srgb'));
'AToB3' selects one of the color transforms (look-up tables) contained in the profile. This one is "Absolute Colorimetric." More details on ICC profiles may be obtained from the ICC spec.
Knowledge of ICC profiles (at least knowledge of their application) would be a prerequisite. Since littlecms implements all the necessary functions for reading, writing, and applying profiles, it would be primarily a matter of integrating this library into Octave (assuming that is the preferred implementation -- one could certainly read the ICC files directly, but why reinvent that particular wheel).
Required skills: C++ programming, some knowledge of ICC profiles desirable.
Possible Mentor: Patrick Noffke <firstname.lastname@example.org>
High Precision Arithmetic Computation
The Linear Algebra Fortran libraries used by Octave make use of of single (32 bits) and double (64 bits) precision floating point numbers. Many operations are stopped when matrices condition number goes below 1e-16: such matrices are considered as ill-conditionned. There are cases where this is not enough, for instance simulations implying chemical concentrations covering the range 10^4 up to 10^34. There are a number of ways to increase the numerical resolution, like f.i. make use of 128 bits quadruple precision numbers available in GFortran. A simpler option is to build an interface over Gnu MPL arbitrary precision library, which is used internally by gcc and should be available on any platform where gcc runs. Such approach has been made available for MatLab under the name mptoolbox and is licensed under a BSD license. The author kindly provided a copy of the latest version and agreed to have it ported under Octave and re-distributed under GPL v3.0
The architecture consists of an Octave class interface implementing "mp" (multi-precision) objects. Arithmetic operations are forwarded to MPL using MEX files. This is totally transparent to the end user, except when displaying numbers. This implementation needs to be ported and tested under Octave.
Required skills: Octave classes and object programming. C for understanding the MEX glue code.
Potential mentor: Pascal Dupuis
The Mapping package has started but lacks many functions, see Mapping package#Missing functions. Source code for some of the calculations has been donated and could be ported, or at least used for testing. Choose this project if you'd like to learn more about mapping and GPS!
Required skills: m-file scripting
Potential mentor: TBD
HG Procedures for students and mentors
This page describes the procedures students are expected to use to publicly display their progress in a public mercurial repo during their work.
This page describes what mentors should do to review their work.