Solver Explained

A solver is a piece of mathematical software, possibly in the form of a stand-alone computer program or as a software library, that 'solves' a mathematical problem. A solver takes problem descriptions in some sort of generic form and calculates their solution. In a solver, the emphasis is on creating a program or library that can easily be applied to other problems of similar type.

Solver types

Types of problems with existing dedicated solvers include:

The General Problem Solver (GPS) is a particular computer program created in 1957 by Herbert Simon, J. C. Shaw, and Allen Newell intended to work as a universal problem solver, that theoretically can be used to solve every possible problem that can be formalized in a symbolic system, given the right input configuration. It was the first computer program that separated its knowledge of problems (in the form of domain rules) from its strategy of how to solve problems (as a general search engine).

General solvers typically use an architecture similar to the GPS to decouple a problem's definition from the strategy used to solve it. The advantage in this decoupling is that the solver does not depend on the details of any particular problem instance. The strategy utilized by general solvers was based on a general algorithm (generally based on backtracking) with the only goal of completeness. This induces an exponential computational time that dramatically limits their usability. Modern solvers use a more specialized approach that takes advantage of the structure of the problems so that the solver spends as little time as possible backtracking.

For problems of a particular class (e.g., systems of non-linear equations) multiple algorithms are usually available. Some solvers implement multiple algorithms.

See also

Lists of solvers

Notes and References

  1. https://www.bc.edu/content/dam/bc1/schools/mcas/cs/pdf/honors-thesis/sample5.pdf Using QBF Solvers to Solve Games and Puzzles
  2. Book: Zhang, Weixiong . State-Space Search: Algorithms, Complexity, Extensions, and Applications . 2012-12-06 . Springer Science & Business Media . 978-1-4612-1538-7 . en.
  3. Bowling, Michael, and Manuela Veloso. An analysis of stochastic game theory for multiagent reinforcement learning. No. CMU-CS-00-165. Carnegie-Mellon Univ Pittsburgh Pa School of Computer Science, 2000.
  4. Web site: October 26, 2019. A neural net solves the three-body problem 100 million times faster. 2021-05-16. MIT Technology Review. en.