Kolyteon 0.1.0
dotnet add package Kolyteon --version 0.1.0
NuGet\Install-Package Kolyteon -Version 0.1.0
<PackageReference Include="Kolyteon" Version="0.1.0" />
paket add Kolyteon --version 0.1.0
#r "nuget: Kolyteon, 0.1.0"
// Install Kolyteon as a Cake Addin #addin nuget:?package=Kolyteon&version=0.1.0 // Install Kolyteon as a Cake Tool #tool nuget:?package=Kolyteon&version=0.1.0
Kolyteon
- Model a logic problem as a binary constraint satisfaction problem (binary CSP).
- Choose a backtracking search algorithm.
- Watch the binary CSP get solved.
Included problem types: Futoshiki, Graph Colouring, Map Colouring, N-Queens, Shikaku and Sudoku.
About Kolyteon
- Kolyteon is a .NET class library for:
- Modelling logic problems as binary constraint satisfaction problems (binary CSPs), and
- Solving binary CSPs using a range of well-established backtracking search algorithms, and
- Measuring and observing a search algorithm's behaviour as it attempts to find a solution to a binary CSP.
- Kolyteon is a solo development project by Matt Tantony.
- Kolyteon is expansion of my Computer Science Postgraduate Diploma project work undertaken at Birkbeck, University of London.
Key Features
Binary CSP modelling:
- A family of generic interfaces representing a binary CSP with a specific variable type and domain value type that models a specific problem type.
- An abstract base class that implements the above using a constraint graph structure.
Binary CSP solving:
- A silent generic binary CSP solver that synchronously solves a binary CSP with optional cancellation.
- A verbose generic binary CSP solver that asynchronously solves a binary CSP with optional cancellation, issuing a progress notification after every step of the algorithm.
Choose your own algorithm:
- Both solvers are configurable at startup and runtime with the user's choice of backtracking search algorithm.
- A backtracking search algorithm is composed of:
- A checking strategy, which determines how it checks the safety of the solution at each step, and
- An ordering strategy, which determines the order in which it approaches the variables of the binary CSP.
- Every backtracking search algorithm is guaranteed to find a solution to a binary CSP if it exists, but the number of assigning/backtracking steps required will vary considerably between algorithms.
- The library currently includes 8 checking strategies and 4 ordering strategies, making a total of 32 possible search algorithms.
Example problem types:
- Immutable, serializable types for representing in code any valid instance of the following problem types: Futoshiki, Graph Colouring, Map Colouring, N-Queens, Shikaku and Sudoku.
- Services for generating random, solvable instances of all the problem types except N-Queens.
- Problem-specific constraint graph derivative classes, each of which models any instance of its problem type as a generic binary CSP.
Current Version: 0.1.0
Kolyteon is currently in its initial development version, published to NuGet for experimentation and evaluation.
I expect to have version 1.0.0 ready (with full documentation ) by approximately 30 September 2024.
A quick example
In this example, the 8-Queens problem is modelled as a binary CSP in which the variables are the column indexes from 0 to 8, each column's domain is the set of 8 possible squares in which a queen might be placed, and the constraints state that no two queens can occupy capturing squares.
The binary CSP is synchronously solved using a search algorithm composed of the Backjumping (BJ) checking strategy and the Maximum Tightness (MT) ordering strategy.
Finally, the generic binary CSP solution is converted into an array of 8 squares and its correctness is verified from the original problem.
First, we represent the 8-Queens problem as an instance of the NQueensProblem
record type:
NQueensProblem problem = NQueensProblem.FromN(8);
Then, we model the NQueensProblem
as an IBinaryCsp<int, Square, NQueensProblem>
using the included NQueensConstraintGraph
class:
IBinaryCsp<int, Square, NQueensProblem> binaryCsp = NQueensConstraintGraph.ModellingProblem(problem);
Then, we create a SilentBinaryCspSolver<int, Square>
instance, configured with the Backjumping
checking strategy and the MaxTightness
ordering strategy:
SilentBinaryCspSolver<int, Square> solver = SilentBinaryCspSolver<int, Square>.Create()
.WithCapacity(8)
.AndCheckingStrategy(CheckingStrategy.Backjumping)
.AndOrderingStrategy(OrderingStrategy.MaxTightness)
.Build();
We run the silent solver on the binary CSP:
SolvingResult<int, Square> result = solver.Solve(binaryCsp);
The result contains metrics for how many steps the search algorithm required, and a set of assignments for each int
binary CSP variable and the Square
assigned to it.
For an N-Queens problem, we're only interested in the squares, so we convert the assignments to an array of Square
values using the built-in extension method:
Square[] solution = result.Assignments.ToNQueensSolution();
Finally, we get the original NQueensProblem
instance to confirm the correctness of the solution:
bool correct = problem.VerifyCorrect(solution); // returns true
Installation
Install the Kolyteon
package in your project from NuGet using the command dotnet add package Kolyteon
.
Kolyteon has no third-party dependencies and never will.
Credits
The template backtracking search algorithm and measuring system at Kolyteon's heart has been adapted from the paper 'Hybrid Algorithms for the Constraint Satisfaction Problem' (Patrick Prosser, 1993, Computational Intelligence 9:3) [link].
All code is my own apart from where labelled in the source code.
Many thanks to Dr Panos Charalampopoulos, my Computer Science project supervisor at Birkbeck, University of London.
Product | Versions Compatible and additional computed target framework versions. |
---|---|
.NET | net8.0 is compatible. net8.0-android was computed. net8.0-browser was computed. net8.0-ios was computed. net8.0-maccatalyst was computed. net8.0-macos was computed. net8.0-tvos was computed. net8.0-windows was computed. |
-
net8.0
- No dependencies.
GitHub repositories
This package is not used by any popular GitHub repositories.
Version | Downloads | Last updated |
---|---|---|
0.1.0 | 1 | 9/2/2024 |