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Benchmark for quadratic programming solvers available in Python

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QP solvers benchmark

CI Coverage Conda version PyPI version

Benchmark for quadratic programming (QP) solvers available in Python.

The objective is to compare and select the best QP solvers for given use cases. The benchmarking methodology is open to discussions. Standard and community test sets are available: all of them can be processed using the qpbenchmark command-line tool, resulting in standardized reports evaluating all metrics across all QP solvers available on the test machine.

Test sets

The benchmark comes with standard and community test sets to represent different use cases for QP solvers:

New test sets are welcome! The qpbenchmark tool is designed to make it easy to wrap up a new test set without re-implementing the benchmark methodology. Check out the contribution guidelines to get started.

Solvers

Solver Keyword Algorithm Matrices License
Clarabel clarabel Interior point Sparse Apache-2.0
CVXOPT cvxopt Interior point Dense GPL-3.0
DAQP daqp Active set Dense MIT
ECOS ecos Interior point Sparse GPL-3.0
Gurobi gurobi Interior point Sparse Commercial
HiGHS highs Active set Sparse MIT
HPIPM hpipm Interior point Dense BSD-2-Clause
MOSEK mosek Interior point Sparse Commercial
NPPro nppro Active set Dense Commercial
OSQP osqp Douglas–Rachford Sparse Apache-2.0
PIQP piqp Proximal Interior Point Dense & Sparse BSD-2-Clause
ProxQP proxqp Augmented Lagrangian Dense & Sparse BSD-2-Clause
QPALM qpalm Augmented Lagrangian Sparse LGPL-3.0
qpOASES qpoases Active set Dense LGPL-2.1
qpSWIFT qpswift Interior point Sparse GPL-3.0
quadprog quadprog Goldfarb-Idnani Dense GPL-2.0
SCS scs Douglas–Rachford Sparse MIT

Metrics

We evaluate QP solvers based on the following metrics:

  • Success rate: percentage of problems a solver is able to solve on a given test set.
  • Computation time: time a solver takes to solve a given problem.
  • Optimality conditions: we evaluate all three optimality conditions:
    • Primal residual: maximum error on equality and inequality constraints at the returned solution.
    • Dual residual: maximum error on the dual feasibility condition at the returned solution.
    • Duality gap: value of the duality gap at the returned solution.

Shifted geometric mean

Each metric (computation time, primal and dual residuals, duality gap) produces a different ranking of solvers for each problem. To aggregate those rankings into a single metric over the whole test set, we use the shifted geometric mean (shm), which is a standard to aggregate computation times in benchmarks for optimization software. This mean has the advantage of being compromised by neither large outliers (as opposed to the arithmetic mean) nor by small outliers (in contrast to the geometric geometric mean). Check out the references below for further details.

Intuitively, a solver with a shifted-geometric-mean runtime of $Y$ is $Y$ times slower than the best solver over the test set. Similarly, a solver with a shifted-geometric-mean primal residual $R$ is $R$ times less accurate on equality and inequality constraints than the best solver over the test set.

Results

The outcome from running a test set is a standardized report comparing solvers against the different metrics. Here are the results for the various qpbenchmark test sets:

You can check out results from a variety of machines, and share the reports produced by running the benchmark on your own machine, in the Results category of the discussions forum of each test set.

Limitations

Here are some known areas of improvement for this benchmark:

  • Cold start only: we don't evaluate warm-start performance for now.
  • CPU thermal throttling: the benchmark currently does not check the status of CPU thermal throttling.
  • HPIPM evaluation: currently we evaluate HPIPM against a duality-gap tolerance but the solver is asked to solve a complementarity-slackness condition.

Check out the issue tracker for ongoing works and future improvements.

Installation

We recommend installing the benchmark in its own environment using conda:

conda install qpbenchmark

Alternatively, you can install the benchmarking tool individually by pip install qpbenchmark. In that case, the benchmark will run on all supported solvers it can import.

Usage

The benchmark works by running qpbenchmark on a Python script describing the test set. For instance:

qpbenchmark my_test_set.py run

The test-set script is followed by a benchmark command, such as "run" here. We can add optional arguments to run a specific solver, problem, or solver settings:

qpbenchmark my_test_set.py run --solver proxqp --settings default

Check out qpbenchmark --help for a list of available commands and arguments.

Plots

The command line ships a plot command to compare solver performances over a test set for a specific metric. For instance, run:

qpbenchmark maros_meszaros_dense.py plot runtime high_accuracy

To generate the following plot:

image

Contributing

Contributions to improving this benchmark are welcome. You can for instance propose new problems, or share the runtimes you obtain on your machine. Check out the contribution guidelines for details.

Citation

If you use qpbenchmark in your works, please cite all its contributors as follows:

@software{qpbenchmark2024,
  title = {{qpbenchmark: Benchmark for quadratic programming solvers available in Python}},
  author = {Caron, Stéphane and Zaki, Akram and Otta, Pavel and Arnström, Daniel and Carpentier, Justin and Yang, Fengyu and Leziart, Pierre-Alexandre},
  url = {https://github.com/qpsolvers/qpbenchmark},
  license = {Apache-2.0},
  version = {2.4.0},
  year = {2024}
}

See also

References

Other benchmarks