NAME
Graph::Maker::KnightGrid - create Knight grid graph
SYNOPSIS
use Graph::Maker::KnightGrid;
$graph = Graph::Maker->new ('knight_grid', dims => [8,8]);DESCRIPTION
Graph::Maker::KnightGrid creates a Graph.pm graph for a grid of squares with edges connecting squares as a chess knight moves.
The dims and cyclic parameters are the same as Graph::Maker::Grid but the edges here are steps 2,1.
+------+------+------+------+ dims => [3,4]
| | | | |
| 1 | 2 | 3 | 4 | edges 1 to 7
| | | | | 1 to 10
+------+------+------+------+ 2 to 9
| | | | | 2 to 11
| 5 | 6 | 7 | 8 | 2 to 8
| | | | | ...
+------+------+------+------+ 6 to 4
| | | | | 6 to 12
| 9 | 10 | 11 | 12 | ...
| | | | | etc
+------+------+------+------+For 3 or more dimensions the moves are step by 2 in some coordinate and 1 in another different coordinate.
Cyclic
cyclic => 1 makes the grid wrap-around at its sides. For 2 dimensions this is knight moves on a torus.
For 1 dimension like dims => [6] there are no edges. A knight move 2,1 means move 2 in one dimension and 1 in another. When there is only 1 dimension there is no second dimension for the second step. 2 dimensions like dims => [6,1] can be given and in that case the effect with cyclic is steps +/-1 and +/-2 along the row of vertices cycling at the ends.
For a 1x1 cyclic grid dims => [1,1], or any higher 1x1x1 etc, there is a self-loop edge since the knight move wraps around from the single vertex to itself. This is the same as the 1-vertex cyclic case in Graph::Maker::Grid. (That class also has a self-loop for 1-dimension dims => [1] whereas here that is no edges as described above.)
FUNCTIONS
$graph = Graph::Maker->new('knight_grid', key => value, ...)-
The key/value parameters are
dims => arrayref of dimensions cyclic => boolean graph_maker => subr(key=>value) constructor, default Graph->newdimsandcyclicare in the style ofGraph::Maker::Grid. Other parameters are passed to the constructor, eithergraph_makerorGraph->new().Like
Graph::Maker::Grid, if the graph is directed (the default) then edges are added both forward and backward between vertices. Optionundirected => 1creates an undirected graph and for it there is a single edge between vertices.
FORMULAS
Vertex Degree
For a 2-dimensional grid each vertex is degree up to 8 if the grid is big enough (each dimension >= 5). In a cyclic grid all vertices are this degree. For higher dimensions the degree increases. In general for D dimensions
max_degree = 4*D*(D-1) = 0, 8, 24, 48, 80, ... (A033996)HOUSE OF GRAPHS
House of Graphs entries for graphs here include
52 2x2 4 disconnected
674 2x2 cyclic 4-cycle
896 3x2
226 3x2 cyclic
126 3x3
6607 3x3 cyclic Paley 9
684 4x2
1022 4x2 cyclic
21067 4x3
32802 4x3 cyclic circulant N=12 1,2,5
1340 4x4 cyclic or 2x2x2x2 cyclic, tesseract
21063 5x2 cyclic
32806 6x2 cyclic circulant N=12 1,5
68 2x2x2 8 singletons
1022 2x2x2 cyclic cube
32810 3x2x2 cyclic
1082 4x2x2 four 4-cyclesOEIS
A few of the entries in Sloane's Online Encyclopedia of Integer Sequences related to these graphs include
http://oeis.org/A035008 (etc)
A033996 max vertex degree in a D dimensional grid
A035008 number of edges in NxN grid
A180413 number of edges in NxNxN grid
A006075 domination number of NxN
A006076,A103315 count of ways domination number attainedSEE ALSO
Graph::Maker, Graph::Maker::Grid
HOME PAGE
http://user42.tuxfamily.org/graph-maker-other/index.html
LICENSE
Copyright 2015, 2016, 2017, 2018, 2019, 2020, 2021 Kevin Ryde
This file is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 3, or (at your option) any later version.
This file is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details.
You should have received a copy of the GNU General Public License along with This file. If not, see http://www.gnu.org/licenses/.