GRId LOgic Puzzle Solver


Keywords
constraint-solver, puzzle-generator, puzzle-hunt, puzzle-solver, python, python3, sudoku-solver, z3, z3py
License
MIT
Install
pip install grilops==0.2.0

Documentation

grilops

a GRId LOgic Puzzle Solver library, using Python 3 and z3.

This package contains a collection of libraries and helper functions that are useful for solving and checking Nikoli-style logic puzzles using z3.

To get a feel for how to use this package to model and solve puzzles, try working through the tutorial IPython notebook, and refer to the examples and the API Documentation.

Installation

grilops requires Python 3.6 or later.

To install grilops for use in your own programs:

$ pip3 install grilops

To install the source code (to run the examples and/or work with the code):

$ git clone https://github.com/obijywk/grilops.git
$ cd grilops
$ pip3 install -e .

Basic Concepts and Usage

The symbols, geometry, and grids modules contain the core functionality needed for modeling most puzzles. For convenience, their attributes can be accessed directly from the top-level grilops module.

Symbols represent the marks that are determined and written into a grid by a solver while solving a puzzle. For example, the symbol set of a Sudoku puzzle would be the digits 1 through 9. The symbol set of a binary determination puzzle such as Nurikabe could contain two symbols, one representing a black cell and the other representing a white cell.

The geometry module defines Lattice classes that are used to manage the shapes of grids and relationships between cells. Rectangular and hexagonal grids are supported, as well as grids with empty spaces in them.

A symbol grid is used to keep track of the assignment of symbols to grid cells. Generally, setting up a program to solve a puzzle using grilops involves:

  • Constructing a symbol set
  • Constructing a lattice for the grid
  • Constructing a symbol grid in the shape of the lattice, limited to contain symbols from the symbol set
  • Adding puzzle-specific constraints to cells in the symbol grid
  • Checking for satisfying assignments of symbols to symbol grid cells

Grid cells are exposed as z3 constants, so built-in z3 operators can and should be used when adding puzzle-specific constraints. In addition, grilops provides several modules to help automate and abstract away the introduction of common kinds of constraints.

Paths

The grilops.paths module is helpful for adding constraints that ensure symbols connect to form paths through the grid. These paths may be either closed (loops) or open ("terminated" paths). Some examples of puzzle types for which this is useful are Numberlink and Slitherlink.

$ python3 examples/numberlink.py        $ python3 examples/slitherlink.py
┌─┐4──┐                                 ┌──┐
│3└─25│                                 │┌┐│ ┌┐
│└─31││                                 └┘│└┐││
│┌─5│││                                   │ └┘│
││┌─┘││                                   └┐  │
││1┌─┘│                                 ┌──┘┌┐│
2└─┘4─┘                                 └───┘└┘

Unique solution                         Unique solution

Regions

The grilops.regions module is helpful for adding constraints that ensure cells are grouped into orthogonally contiguous regions (polyominos) of variable shapes and sizes. Some examples of puzzle types for which this is useful are Nurikabe and Fillomino.

$ python3 examples/nurikabe.py          $ python3 examples/fillomino.py 
2 █   ██ 2                              8 8 3 3 101010105               
███  █2███                              8 8 8 3 1010105 5               
█2█ 7█ █ █                              3 3 8 10104 4 4 5               
█ ██████ █                              1 3 8 3 102 2 4 5               
██ █  3█3█                              2 2 8 3 3 1 3 2 2               
 █2████3██                              6 6 2 2 1 3 3 1 3               
2██4 █  █                               6 4 4 4 2 2 1 3 3               
██  █████                               6 4 2 2 4 3 3 4 4               
█1███ 2█4                               6 6 4 4 4 1 3 4 4               
                                                                        
Unique solution                         Unique solution

Shapes

The grilops.shapes module is helpful for adding constraints that ensure cells are grouped into orthogonally contiguous regions (polyominos) of fixed shapes and sizes. Some examples of puzzle types for which this is useful are Battleship and LITS.

$ python3 examples/battleship.py        $ python3 examples/lits.py
     ▴                                        IIII
◂▪▸  ▪ •                                   SS  L  
     ▾                                   LSS   L I
◂▪▪▸   •                                 L IIIILLI
                                         LL   L  I
 ▴    ◂▸                                  TTT L  I
 ▾ ▴                                    SS T LL  T
   ▾ •                                   SSLL   TT
                                            L T  T
Unique solution                         IIIILTTT

                                        Unique solution

Sightlines

The grilops.sightlines module is helpful for adding constraints that ensure properties hold along straight lines through the grid. These "sightlines" may terminate before reaching the edge of the grid if certain conditions are met (e.g. if a certain symbol, such as one representing a wall, is encountered). Some examples of puzzle types for which this is useful are Akari and Skyscraper.

$ python3 examples/akari.py             $ python3 examples/skyscraper.py 
█* █*    █                              23541                            
   *   █                                15432                            
*█*   █  *                              34215                            
 *█  █   █                              42153                            
   ███*                                 51324                            
   *███*                                                                 
█ * █* █*                               Unique solution
*  █*   █*
  █     * 
█ *   █* █

Unique solution