- Introduction
- A Motivating Example
- How It Works
- Installation
- Examples
- Limitations
- Developer Notes
- References
MPsym is a C++/Python library that makes it possible to determine whether mappings of computational tasks to multiprocessor systems are equivalent by symmetry. This is useful when trying to find an optimal/good (with respect to runtime/energy consumption etc.) mapping or set of mappings to a given system. MPsym is able to implicitly partition the search space of all possible mappings into equivalence classes of mappings that have almost identical runtime properties due to architectural symmetries. A search algorithm can then work with representatives of these equivalence classes, effectively reducing the size of the search space ifself.
MPsym uses algorithms and data structures from computational group theory as presented in e.g. [1]. These are implemented from scratch to avoid reliance on existing computational algebra systems like GAP [2]. As a result, MPsym can be more easily integrated with other C++ and Python applications and could be released under the liberal MIT License.
Although MPsym has been developed in the context of multiprocessor systems, it is potentially applicable to other problems involving symmetries (more formally: automorphism groups) of graphs.
As an introductory example, consider an abstract Multiprocessor System-on-Chip (MPSoC) architecture consisting of four processing elements connected circularly by four bidirectional communication channels (which could represent direct wired/wireless links, shared memory etc.). We can represent this architecture by the following architecture graph:
Every vertex corresponds to a processing element and each edge corresponds to a communication channel. In general, such architecture graphs might also be vertex- and or edge-colored to reflect non-identical processing elements and communication channels.
Say we want to map two tasks T_red and T_green to this architecture. Assuming that we don't wish to map both of them to the same processing element, there are twelve distinct ways of doing so:
We refer to this set of all possible mappings for a given set of tasks as the full mapping space. MPsym is able to (implicitly) partition the full mapping space into sets of mappings equivalent by symmetry:
We refer to such sets of mappings equivalent by symmetry as orbits. MPsym collapses the full mapping space by reducing each orbit to one arbitrary mapping contained in it. If we represent mappings by tuples of processor indices, it is natural to choose the lexicographically smallest such mapping (as shown above) which we call the canonical representative.
Since explicitly enumerating all orbits for a given mapping space is often prohibitively expensive, MPsym offers functions for directly determining the canonical representative for any given mapping.
For simple architectures, MPsym performs the following steps in order to determine canonical representatives for a number of mappings:
- Parse an architecture configuration file.
- Construct a totally colored architecture graph.
- Determine that architecture graph's automorphism group using nauty [3].
- Construct a base and strong generating set representation for this group.
- Find the canonical representative for a given mapping by:
- Enumerating the orbit.
- Enumerating the automorphism group.
- Using local search.
The automorphism group of an architecture graph captures all of the graphs inherent symmetries in the form of permutations. For certain classes of hierarchical architectures, MPsym uses the methods presented in [4] to speed up this process, making it viable for large but highly symmetrical architectures.
This section explains how to install MPsym to your system. Note that MPsym currently only runs on Linux. It should in principle be possible to build it on non-Linux systems but this is currently either untested or simply not yet supported by the build system.
If you only plan on calling MPsym from Python, then the easiest way to install
it is via pip install pympsym. This requires Python >= 3.6 and pip >= 19.3.
If you plan to install MPsym from source you will need the following installed on your system:
CMake >= 3.6Boost >= 1.72.0Lua >= 5.2.0LuaRocks
If you only plan on calling MPsym from Python simply run pip install . or
pip install --user ..
If you want to call MPsym from C++, you need to directly build MPsym using CMake. Run the following from the root of this repository:
mkdir build && cd build
cmake .. -DCMAKE_BUILD_TYPE=Release -DCMAKE_INSTALL_PREFIX=/usr/local
make -j $(nproc)
Afterwards, run make install to install the C++ header files and shared
objects as well as the mpsym Lua rock to your system. If you do not want to
install the Lua rock you can pass -DLUA_EMBED=ON to CMake to embed the
mpsym Lua module into a shared object. If you do not want to use Lua
architecture graph configuration files at all,
you can instead pass DLUA_NO_ROCK=ON to CMake.
You can also pass -DPYTHON_BINDINGS=ON to CMake to additionally install the
Python bindings without separately invoking pip.
The following brief examples showcase how to use the Python interface of MPsym.
For more examples, in both Python and C++, take a look at the unit tests under
test/tests.
MPsym can parse architecture graph descriptions given as Lua scripts or JSON files (the latter mostly for serialization purposes). It is also possible to construct architecture graphs programmatically.
The aforementioned Lua scripts must return a table describing an architecture
graph. This table is constructed using the mpsym Lua module. This module
defines several convenience functions and tables which can be used to quickly
construct complex architecture graphs via the following steps:
- Define a set of processing elements.
- Connect them with communication channels.
- Construct an
ArchGraphtable. - (Optional) Repeat steps 1-4 to construct additional
ArchGraphtables. - (Optional) Compose the constructed
ArchGraphtables usingArchGraphClusterandArchUniformSuperGraph.
Here, ArchGraphCluster represents a set of architecture graphs "isolated"
from each other, such that mappings within an orbit never map the same task to
different architecture graphs within the cluster. In contrast ,
ArchUniformSuperGraph represents a "super graph", i.e. a set of identical
architecture graphs connected among each other.
As a simple example, let's consider again the architecture graph from our introductory example. We can construct it as follows:
local mpsym = require 'mpsym'
return mpsym.ArchGraph:create{
directed = false,
processors = {
{0, 'P'},
{1, 'P'},
{2, 'P'},
{3, 'P'}
},
channels = {
{0, 1, 'C'},
{1, 2, 'C'},
{2, 3, 'C'},
{3, 0, 'C'}
}
}Here, the integers are processor indices and P / C are arbitrary processing
element and communication channel-type labels. The exact form of these labels
is not important, but it is cruccial, that identical processing
elements/communication channels receive identical labels.
Explicitly specifying all processing elements and communication channels can be
tedious and error prone for more complex architecture graphs. While it is often
possible to more succinctly construct the respective tables using Lua language
features, the mpsym module also offers several convenience functions for this
purpose. For instance, the architecture graph from the previous example can
be more easily constructed as such:
local mpsym = require 'mpsym'
local processors = mpsym.identical_processors(4, 'P')
local channels = mpsym.grid_channels(processors, 'C')
return mpsym.ArchGraph:create{
directed = false,
processors = processors,
channels = channels
}We can parse a Lua configuration file in Python as follows:
import pympsym
ag = pympsym.ArchGraphSystem.from_lua_file('arch_graph.lua')We can also explicitly construct architecture graphs, e.g.:
import pympsym
ag = pympsym.ArchGraph()
ag.add_processors(4, 'P')
for i in range(4):
ag.add_channel(i, (i + 1) % 4, 'C')MPsym can determine representatives especially efficiently when working with
certain hierarchical graph. For example, Kalray's MPPA3 Coolidge processor
consists or sixteen identical clusters of processing elements which are fully
connected internally (via shared memory) and connected in a grid fashion among
each other. We can use ArchUniformSuperGraph to model this (here "proto"
refers to the architecture of each cluster and "super" to the interconnections
between them):
local mpsym = require 'mpsym'
local super_graph_clusters = mpsym.identical_clusters(16, 'SoC')
local super_graph_channels = mpsym.grid_channels(super_graph_clusters, 'C')
local proto_processors = mpsym.identical_processors(16, 'P')
local proto_channels = mpsym.fully_connected_channels(proto_processors, 'shared memory')
return mpsym.ArchUniformSuperGraph:create{
super_graph = mpsym.ArchGraph:create{
directed = false,
clusters = super_graph_clusters,
channels = super_graph_channels
},
proto = mpsym.ArchGraph:create{
directed = false,
processors = proto_processors,
channels = proto_channels
}
}This also works in Python:
import pympsym
ag_super = pympsym.ArchGraph()
# ... build super graph
ag_proto = pympsym.ArchGraph()
# ... build proto graph
ag = pympsym.ArchUniformSuperGraph(ag_super, ag_proto)Both ArchGraph and ArchUniformSuperGraph are subclasses of the abstract
ArchGraphSystem class which defines methods for determining orbits,
representatives etc. There is also
ArchGraphCluster which combines an arbitrary number of different and
unconnected architecture graphs.
Once constructed, it's possible to convert ArchGraphSystem objects to and
from JSON. This is especially useful because
initializing an architecture graph after
its construction can require a non-trivial amount of computing time which can
be avoided on subsequent runs by loading an already initialized architecture
graph from a JSON file.
>>> ag.to_json()
'{"automorphisms": [4,[1, 0],["(0, 1)(2, 3)", "(0, 3)", "(1, 2)"]]}'
>>> ag = pympsym.ArchGraphSystem.from_json(...)Before we can perform any useful operations on an ArchGraphSystem object, we
need to initialize it. This is a separate step that must be performed exactly
once after construction (and again if the architecture graph changes):
>>> ag.initialize()Note that it is not necessary to call ArchGraphSystem.initialize explicitly.
Operations that require it will call this method implicitly. However, since it
might take a significant amount of time to complete, it can be more sensible to
separate initialization and use of an architecture graph. We can also pass a
timeout argument, such that an exception will be raised if initialization does
not complete in the given number of seconds:
>>> ag.initialize(timeout=2.5) # raise exception after 2.5 seconds of runtimeSeveral other ArchGraphSystem methods also take a timeout parameter that
works the same way.
Given an architecture graph, we can easily determine the orbit of an arbitrary mapping:
>>> list(ag.orbit((0,1)))
[(0, 1), (0, 3), (1, 0), (1, 2), (2, 1), (2, 3), (3, 0), (3, 2)]
>>> list(ag.orbit((0,2)))
[(0, 2), (1, 3), (2, 0), (3, 1)]Orbits are constructed lazily, i.e. the orbit elements are determined
incrementally while iterating through the object returned by
ArchGraphSystem.orbit. The lexicographically smallest mapping in each
orbit is its representative. We can also directly determine this representative
(possibly much more efficiently) as follows:
>>> ag.representative((1,0))
(0, 1)The method argument controls how the representative is determined. iterate
and orbit always produce the correct representative and which one is faster
depends on the given architecture graph and mapping. local_search_bfs and
local_search_dfs are very fast, but the returned representative is not
guaranteed to be correct (the likelihood of an incorrect result again varies
with architecture graphs and mappings):
>>> ag.representative((1,0), method='auto') # default
(0, 1)
>>> ag.representative((1,0), method='iterate') # iterate through automorphism group
(0, 1)
>>> ag.representative((1,0), method='orbit') # enumerate orbit
(0, 1)
>>> ag.representative((1,0), method='local_search_bfs') # BFS local search
(0, 1)
>>> ag.representative((1,0), method='local_search_dfs') # DFS local search
(0, 1)ArchGraphSystem.representative also takes an optional parameter of type
Representatives which conveniently stores all determined representatives and
causes ArchGraphSystem.representative to return a boolean flag and an integer
in addition to the determined representative. The boolean flag indicates
whether or not the representative has not been encountered before and the
integer uniquely identifies the orbit which the representative belongs to.
>>> representatives = pympsym.Representatives
>>> ag.representative((0, 1), representatives)
((0, 1), True, 0)
>>> ag.representative((0, 2), representatives)
((0, 2), True, 1)
>>> ag.representative((0, 3), representatives)
((0, 1), False, 0)This makes it possible to pass a number of mappings to
ArchGraphSystem.representative in sequence and to immediately decide whether
or not to e.g. skip a computationally expensive simulation step if the current
mapping is equivalent by symmetry to a previously simulated one:
mappings = [...]
simulation_results = {}
for mapping in mappings:
_, new, index = ag.representative(mapping)
if new:
simulation_results[index] = simulate(mapping)
print('simulation results: {}'.format(simulation_results[index]))We can directly retrieve the automorphism group of an ArchGraphSystem object:
>>> pg = ag.automorphisms()The returned object is of type PermGroup and acts like a set of Perm objects:
>>> pg.degree()
4
>>> len(pg)
8
>>> next(iter(pg))
(0, 1)(2, 3)
>>> '(1,2)' in pg
True
>>> '(1,3)' in pg
FalseThe "degree" of a permutation group is the largest element it acts on + 1, for
an architecture graph's automorphism group this corresponds to the number of
processing elements. Each Perm object in turn represents a permutation of the
architecture graphs vertixes:
>>> p.degree()
4
>>> p
(0, 1)(2, 3)
>>> p[0]
1
>>> p[2]
3
>>> p[4]
Traceback (most recent call last):
File "<stdin>", line 1, in <module>
IndexError: not in domainWe can also directly construct permutation groups and use them in place of
architecture graphs via the ArchGraphAutomorphisms class. This can be useful
when the automorphism group of an architecture is known ahead of time and there
is thus no need to let MPsym determine it:
>>> pg = pympsym.PermGroup(5, ['(0, 1)', '(3, 4)'])
>>> ag = pympsym.ArchGraphAutomorphisms(pg)A number of convenience methods are available to construct and combine common permutation groups:
>>> pg1 = pympsym.PermGroup.symmetric(5) # S_5
>>> pg2 = pympsym.PermGroup.cyclic(10) # C_10
>>> pg = pympsym.PermGroup.direct_product(pg1, pg2) # S_5 x C_10- Architecture graph initialization could be significantly sped up by employing more advanced BSGS construction algorithms.
- Heuristic methods could improve accuracy of local search but this would require significant experimentation and fine-tuning work.
- MPsym contains code for automatically decomposing hierarchical architecture graphs but it is as of now mostly untested and not explicitly useable from either the C++ or Python interface.
- MPsym also contains code for dealing with partial symmetries derived from [5], however, this is currently broken due to both technical and theoretical problems.
The include and source directories contain the main C++ code which can be
compiled into a shared object (or static library if the LINK_STATIC CMake
flag is set). The C++ code has four dependencies:
BoostLuanautynlohmann/json
The former two must already be installed on your system. The latter two are
automatically downloaded during the CMake configuration step. nauty is
compiled into a separate shared object (or static library), see
nauty/CMakeLists.txt.
The lua directory contains the mpsym.lua Lua module which can be used to
construct Lua architecture graph description files. When trying to parse these
files from MPsym, mpsym.lua must thus be made available via the LUA_PATH
environment variable, i.e. by setting:
export LUA_PATH=$LUA_PATH;$(readlink -f mpsym/lua/?.lua)Alternatively, you can set the LUA_EMBED CMake flag to embed mpsym.lua into
the MPsym shared object/static library (which is arguably a weird thing to do
but quite handy in practice).
The test/tests directory contains C++ unit tests. these are built by CMake
if -DCMAKE_BUILD_TYPE=Debug is specified. The tests use the Googletest
framework which is automatically downloaded during the CMake configuration step.
The python directory contains Python binding code and tests. It has the
following structure:
python/
├── setup.py
├── mpsym
│ ├── __init__.py
│ └── _mpsym_tests.py
└── source
├── CMakeLists.txt
└── _mpsym.cpp
python/mpsym is the binding module directory. python/_mpsym.cpp contains
pybind11 wrapper code for MPsym's public
C++ interface. When the PYTHON_BINDINGS CMake flag is set, a corresponding
shared object is created under python/mpsym/_mpsym.*.so. _mpsym_tests.py
contains a number of unit tests. The mpsym binding module loads both the
module created via pybind11 and _mpsym_tests.py in its __init__.py. The
latter can be run by invoking mpsym.test(verbosity=...), a return value of
0 indicates success.
If you don't care about the C++ interface, you can directly install the binding
module to your system via python setup.py install --user.
Besides Release and Debug, a third build mode, Profile, is also
supported. In this mode, the programs under profile/source are compiled.
They can be used to profile the runtime of the Schreier-Sims algorithm as
implemented by MPsym, as well as the various canonical representative
algorithms. These programs implement --help flags that should more or less
explain how to use them. Some related example architecture graphs and scripts
can be found here.
Running deploy.sh will create test coverage data and Doxygen documentation
and will upload these to Codecov and GitHub pages respectively. Of course you
shouldn't be able to do this unless you're me :o).
Previously, MPsym used Travis for CI. Since Travis is unfortunately no longer
free for FOSS projects, GitHub Actions are now used instead. Take a look at
.github/workflows/workflow.yml for details. On every commit and pull request
to the master branch, MPsym is built and tested inside a Ubuntu/macOS image
using recent versions of gcc/clang.
Previously, Travis also took care of deployment. To save on GitHub Action credits, coverage and documentation must now be deployed manually. PyPi wheels are still built automatically (for Linux and macOS), but now in a separate repository that uses multibuild (currently a work in progress).
[1] Holt, D. F. (2005). Handbook of Computational Group Theory. CRC Press
[2] Groups, T. G. (2020). GAP - Groups, Algorithms, and Programming, Version 4.11.0.
[3] McKay, B. D. and Piperno, A. (2014). Practical graph isomorphism, ii. Journal of Symbolic Computation, 60:94–112.
[4] Donaldson, A. F. and Miller, A. (2009). On the constructive orbit problem. Annals of Mathematics and Artificial Intelligence 57:1-35.
[5] East, J., Egri-Nagy, A., Mitchell, J., and Péresse, Y. (2019). Computing finite semigroups. Journal of Symbolic Computation, 92:110–155.