Changing gdm/lightdm user login settings programmatically

Recently, as part of the automated testing efforts in Linaro, I needed to programmatically change the default X session for a user. It used to be the case that editing ~/.dmrc was enough to achieve this. Display managers (DMs), such as gdm and lightdm, would read the contents of the ~/.dmrc at login time to decide which language and X session to use (among other settings). When a user changed a setting through the GUI, the DM would write the new settings to ~/.dmrc (only after successfully logging in, of course).

However, all of this changed with the introduction of AccountsService. As the name suggests, AccountsService provides a service for the management of user accounts, and among other things, some of the login settings that were previously configured in ~/.dmrc. It offers this functionality through the org.freedesktop.Accounts DBus service on the system bus.

Modern Display Managers use AccountsService to manipulate user  login settings, falling back to ~/.dmrc only when the service is unavailable (at least in the case of lightdm). What this means for the end-user is that editing ~/.dmrc manually has no effect. For example, you can try changing the Session field in ~/.dmrc all you want, but next time you log in you will end up in the same session and your ~/.dmrc changes will have been overwritten.

In order to actually change any settings we need to communicate with AccountsService through DBus. The first step is to find out the object that corresponds to the user we want to change the settings for. The path of this object is of the form /org/freedesktop/Accounts/. <USER> is usually of the form User<UID> but there is no guarantee of that.  Thankfully, the /org/freedesktop/Accounts object provides the org.freedesktop.Accounts.FindUserByName and org.freedesktop.Accounts.FindUserById methods, which we can use to get the object path for a user.

Having the user object path, we can use the org.freedesktop.Accounts.User.* methods on the user object to change the required settings.

We can use the dbus-send program to perform the operations mentioned above. For example:

$ USER_PATH=$(dbus-send --print-reply=literal --system --dest=org.freedesktop.Accounts /org/freedesktop/Accounts org.freedesktop.Accounts.FindUserById int64:1000)
$ dbus-send --print-reply --system --dest=org.freedesktop.Accounts $USER_PATH org.freedesktop.Accounts.User.SetXSession string:’xterm’

As I needed to get and set the X session for a user in a user-friendly manner,  I decided to create a small python program instead. You can find the program here:

You can use like:

$ ./ [--user-id <ID>|--user-name <NAME>] set <SESSION>
$ ./ [--user-id <ID>|--user-name <NAME>] get

where <SESSION> is one of the sessions available in /usr/share/xsessions/ . Note that you may need to run as root, depending on the account you want to change the settings for.

For example:

$ ./ --user-id 1000 set xterm

You can easily tweak the program to change another setting instead of the X session.

Update 2012-08-10: Fixed problem with wordpress converting -- (double-dash) to – (en-dash) in code snippets.


glmark2: more than a benchmark


Almost 1.5 year ago, we (at Linaro) set out on a mission to provide consolidation and optimization of GNU/Linux for ARM hardware. Soon after, the Linaro Graphics Working Group was formed to focus on the graphics and user interface parts of the stack. Like all other groups within Linaro, the Graphics WG strived (and still does, of course!) to provide palpable and measurable improvements. One of the tools we needed to ensure this goal, and we found was missing, was a Free Software OpenGL ES 2.0 benchmark.

Why did we even care about this when there surely are professional, proprietary alternatives used in the industry? The answer is simple: we couldn’t imagine doing this any other way.  Linaro, both as an organization and as individuals, strongly believe that Free Software is good for society. Even if we didn’t believe in the ethics of Free Software, using a proprietary solution would have been the wrong choice from a practical point of view. Many of our goals, which reach beyond plain benchmarking, would be very difficult to achieve with a proprietary solution. We wanted a tool that was freely (in every sense) available to all, so that it would provide a common reference point for all developers and users that didn’t have access to the proprietary tools.

Instead of starting completely from scratch, we leveraged an existing GPL licensed desktop GL benchmark, called glmark, and ported it to support OpenGL ES 2.0. We decided to call the new benchmark glmark2. Although OpenGL ES 2.0 was the primary goal for us (this API is prevalent in the ARM world), we continued to treat desktop OpenGL as a first class citizen. This mindset eventually led to what we call the “subset approach”: using only the common subset of desktop OpenGL 2.1 and OpenGL ES 2.0 APIs to produce a single, easily maintainable code base, working happily with both versions.


After the initial porting to OpenGL ES 2.0 was done, and as we continued to work on new features, a set of goals for glmark2 began to crystallize in our minds. These goals transcended the limits of plain benchmarking, and can be summarized as: flexible benchmarking, best practices, validation and educating new developers.

Flexible benchmarking

The primary function of glmark2 is, of course, to provide a comprehensive benchmarking suite. What differentiates glmark2 from other tools is the unique flexibility it delivers. Most existing benchmarking tools just provide the option to run benchmarks from a predefined fixed set. For glmark2, however, we decided that we didn’t want to force our own selections on users. In this spirit, glmark2 offers a suite of scenes that can be used to evaluate many aspects of OpenGL (ES) 2.0 performance. The way in which each scene is rendered is configurable through a set of scene-specific options, that range from the simple, like selecting the texturing mode for the texturing scene, to the complex, like specifying the convolution matrix for the GPU convolution scene. A benchmark is just a scene instantiated with specific options.

For the casual user, who just wants to get an overview of the graphics stack’s performance, glmark2 comes with a predefined set of default benchmarks. For users that need to explore a particular aspect in more depth, we have made it trivial to specify and execute a custom set of benchmarks.

Regarding the actual benchmark content, we draw inspiration from typical applications that use OpenGL, like games, modern user interfaces and our own experience about important features. We have given glmark2 a focus on fundamental techniques used in 3D and 2.5D graphics, so most scenes are relatively simple, but we don’t shy way from other kinds of benchmarks. We already have low-level benchmarks for specific shader features, and we are planning to add high-level benchmarks involving more complex and visually intriguing scenes in the future.

Best practices

The flexibility offered by our option-driven benchmarking approach lends itself naturally to another one of our goals: answering developer questions and providing best practices. “Should I use X or Y to get the best performance/quality/of both worlds on this class of hardware?” is a common form of question among developers. For example, we have implemented a benchmark to test how different methods of uploading data to the GPU (glBufferData vs glMapBuffer, interleaved buffers vs separate buffers etc) affect performance. We hope that the ease with which developers can use different options will make it painless to perform targeted tests and eventually provide best practices advice.


Besides measuring the graphics performance, we also care about output quality. That is, we want to validate the correctness of the graphics stack.  Of course, we don’t want to perform validation manually, by having someone looking at pictures. We want the process to be automatic, ideally as part of our continuous integration efforts.

To handle validation in glmark2 we added a special mode in which we just draw the first frame of each benchmark and fuzzily compare some pixel values against expected reference values. We rely on the 3D pipeline being deterministic, so, if a single pixel is correct, chances are that all pixels are correct. Is this a 100% robust validation solution? No, but it is more than enough for our needs; it’s not our aim to provide a conformance suite.

Educating new developers

The last (but not least) goal we have for glmark2 is a surprising but important one: educating new developers.  We found that one of the main issues developers have when trying to move to modern, programmable 3D APIs, and in particular OpenGL ES 2.0, is the lack of concrete information on how to work with the new APIs, like EGL, and, also, how to apply fundamental 3D techniques that were straightforward before, e.g., lighting. Due to our focus on benchmarks for fundamental techniques, we are actually providing clear examples of how to achieve useful results. We make a special effort to ensure that both the C++ and the shader code are understandable, including comments explaining why and how we are doing things. Developers can use the glmark2 code base as a  launchpad to explore the wonders of modern 3D graphics.

Our journey with glmark2 has been very exciting so far, and the future looks brighter than ever! We are constantly working on new features, and the recent addition of support for Android has made glmark2 one of the most versatile Free Software 3D benchmarking tools available. You can learn more about what we are planning by visiting our blueprints page.

What are you waiting for? Grab glmark2 and start exploring!

The NP-completeness of tax solidarity

At last, it’s Friday! After a long week of hard work you deserve some time to relax and meet for a drink with friends. You make a few phone calls, everything is arranged and a few hours later you are out having a great time. And then the time comes to pay for the drinks. If you are lucky, there is a separate receipt for every drink  If you are not lucky (and you usually aren’t), there is one receipt for all the drinks. Now you have to spend the next five minutes trying to decide who gets the receipt.

Why all the fuss about receipts, you may ask? If you live in Greece (and perhaps other places) in this time of economic woe, then this scenario is all too familiar. The Greek government, in its never-ending battle with tax evasion has come up with a plan! Every citizen must present an amount in receipts which depends on their income (using a tiered system). Any difference from the required amount (up to 15000 €) leads to either a penalty or credit equal to 10% of the difference. Note, that you can’t present receipts that are used in some other way to lower your taxable income (rent, utilities etc).

The main idea is to make citizens ask for receipts, so that businesses are forced to issue them. The secondary idea is to make citizens spend more. So much for savings…

In any case, near the end of the year, everyone in your group of close friends (the ones you go out with more often) ends up with a bunch of receipts. Some have enough receipts to cover their limit, some do not.  Furthermore, some of the receipts are shared, in the sense that the one who has the receipt has paid for only some of the items on it.  Being such good friends you decide that you should help each other out, so that, if possible, everyone reaches their limit and saves money.

Practical tax solidarity

There are several practical ways to help each other and they all share a common core.  The receipts of each individual are first split into a private and public part.  Each individual keeps their private part and the public part is split among the individuals that need it. By combining different ways to decide what receipts are public and private and how to split the public ones we can get several methods to help our friends. Some interesting methods are:

private public split method
1 nothing all equally among all
2 all until limit the rest among those that need it until limit, rest back to owners or equally among all
3 all until limit + 15000€ the rest among those that need it until limit, rest back to owners or equally among all
4 non-shared shared equally among all
5 non-shared + shared until limit rest equally among all

If you are really good friends and the spirit of solidarity is high within the group, you may decide to try to split the receipts as evenly as possible within the group (method 1). This method maximizes the collective gain, but hurts the individuals that have originally a larger amount in receipts. This may not be a problem, though, and may actually be the most fair way to handle the situation if the number of shared receipts in the group is high.

Another way (method 2) is for every person to keep enough of their receipts so that they reach the limit (if they can, of course) and add the rest to the group’s surplus collection. The receipts from the surplus collection are then distributed to those that don’t have enough receipts to reach the limit on their own.  Any remaining receipts are then either  returned to their original owners or equally split within the group.

A variation of the previous method is method 3. In this case we use limit + 15000€ for the private receipts, so that individuals get the maximum benefit from their receipts. Unfortunately, this method rarely leaves any receipts for the surplus and is quite unfair if there is a large number of shared receipts.

Methods 4 and 5 assume that each receipt can be easily identified as shared or non-shared. In method 4 individuals keep only the receipts that are non-shared and add the shared receipts to the surplus. In method 5 individuals first use their non-shared receipts and then start using the shared ones until they reach the limit. If the receipts were originally distributed randomly, then method 4 is the fairest way to handle things. On the other hand, if shared receipts were originally given to the person with the highest expense then perhaps method 5 is a bit more fair.

Handling NP-completeness

Whatever way you choose to help your friends, the same basic problem must be solved: how can you evenly partition a set of receipts among a number of individuals?

This problem, as innocent as it may look, is actually NP-complete! Its official name is the “partition problem” and in its optimization version is stated as:

Partition a multiset of integers S into n subsets S_1, S_2, ..., S_n such that max(sum(S_1), sum(S_2), ..., sum(S_n)) is minimized.

In plain words, split a multiset of integers into n subsets as evenly (as far as the sum of each subset is concerned) as possible. The classic version involves only two subsets. The difficulty lies in the fact that we are not allowed to split each integer (receipt amount in our case) arbitrarily.

Being NP-complete practically means that in the worst case we have to go through all the partitioning combinations to find the best. The combinations being persons^receipts, this is *not* what I call a fun past-time.

So, is this all part of an evil plot by the tax service to get our hard-earned income? Even if it is, we are not completely helpless! The partition problem is often called the “Easiest Hard Problem”. The reason is that under some conditions, which have been extensively studied, there are heuristic methods that provide very good results.

These conditions state that if we take n numbers randomly selected from the range [1, 2^m] then if k = m / n < 1 ( \Rightarrow m < n) there is a large probability that there exist many perfect partitions. Of course this also works for numbers from arbitrary ranges because we can always map a range [a, b] to [1, b - a +1]. On the other hand if k > 1 the probability of perfect partitions existing for a given multiset abruptly drops.

Intuitively, the above condition makes perfect sense: it is much more probable to be able to split a multiset into subsets with equal sums if that multiset has many small values (where small is relative to the cardinality of the set). As the values get larger and/or the set size becomes smaller it is much less probable to be able to find a perfect split.

So, how does our problem instance fare with regard to this criterion?  First of all, we have to make a minor adjustment because the condition refers to integers but cash amounts are real numbers with two decimal digits.  This can be easily countered by expressing all amounts as euro-cents. The amount on each receipt is hardly ever outside the [1, 6553600] range (\approx 2^{23}) in euro-cents (unless, of course, you end up buying a new yacht every time you go out for groceries). Also, let’s be insanely over-conservative here and say that a normal person gets 3 receipts per week. These give us an m of 23 and an n of 3 * 52 = 156, therefore k = 23 / 156 < 1.

Now that we know that there is a good chance of being able to solve the problem, how do we actually go about it? The algorithm is surprisingly straightforward. Of course, it does not strictly solve the problem, but it produces an approximate solution that is good enough for our purposes. The algorithm is:

1. Sort the numbers in descending order   [ O(nlogn) on average ]
2. Process each number (in sorted order): [ Θ(n) ]
  2.1 Find the subset with the least sum  [ O(logp) using priority queues ]
  2.2 Add the number to the subset        [ Θ(1) ]

where n: number of receipts
      p: number of persons

This gives us T(n, p) = O(nlogn + nlogp + n). For a constant number of persons this leads to T(n) = O(nlogn). Not bad for “solving” an NP-complete problem! This algorithm has been proved to produce results relatively close to the optimal solution. Its discrepancy (the difference in value of the sums of the produced subsets) is O(1/n). There are other  algorithms that can do a bit better, but they are considerably more complicated (and not worth it for our puny purpose).

Finally, because “an ounce of action is worth a ton of theory”, I have developed a proof of concept application that implements some of the methods mentioned above. You can find it at It is written in python and licensed under the AGPL 3.0+.



  • Karmarker, Narenda and Karp, Richard M., The Differencing Method of Set Partitioning, Techreport, UC Berkley, 1983
  • Brian Hayes, The Easiest Hard Problem, American Scientist, March-April 2002
  • Stephan Mertens, The Easiest Hard Problem: Number Partitioning, Computational Complexity and Statistical Physics, 2006