# How to - Graph Coloring in Prolog

I'm trying to make the simple graph coloring algorithm in Prolog, but I'm having a bit of a hard time understanding the language. I know what I want to do - I want to go to a vertex, find all the other vertices connected to it, check my vertex's color, and depending on that, color the other vertices with different colors. I'm just having a hard time translating this to Prolog. If it was a C dialect or Java, it would be a piece of cake for me, but this is giving me fits.

This is what I have so far:

``````main:- graph_coloring.

%color_list([blue, red, green, yellow, white], colors).
%vertex_list([a, b, c, d], vertices).
%edge_list([(a,b),(b,c),(c,d)], edges).

%Our graph
color(blue).
color(red).
color(green).
color(black).
color(white).

%graph([a-b, b-c, b-d, c-d]).

vertex(a).
vertex(b).
vertex(c).
vertex(d).

%Subject to changing, so are asserted into listener at runtime.
init_dynamic_facts:-
assertz(vertex_color(a, none)),
assertz(vertex_color(b, none)),
assertz(vertex_color(c, none)),
assertz(vertex_color(d, none)),
assertz(location(a)).

edge(a,b).
edge(b,c).
edge(b,d).
edge(c,d).

is_connect(A,B):-
edge(A,B).
is_connect(A,B):-
edge(B,A).

connections(Vertex):-
edge(Vertex,X).
connections(Vertex):-
edge(X,Vertex).

move(Vertex):-
retract(location(_)),
asserta(location(Vertex)).

paint_vertex(Vertex, Color):-
retract(vertex_color(Vertex,_)),
asserta(vertex_color(Vertex, Color)).

find_vertex_color(Vertex):-
vertex_color(Vertex, X).

graph_coloring:-

location(Current_vertex),
vertex_color(Current_vertex, Curr_color),
( Curr_color =:= none ->
connections(Current_vertex, Others),
vertex_color(Others, Other_colors),
paint_vertex(Current_vertex,
``````

How can I complete this algorithm?

(edited: more code under graph_coloring)

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Don't you want to go to an uncolored vertex, then choose a color that is not used by any neighbor vertex? –  Vaughn Cato May 23 '12 at 5:06
I'm starting with no vertices colored, although to be sure, it might be better to assign a color to the first one and do what you're saying. –  Tino May 23 '12 at 5:07
Can you be more specific about what issue you are having? –  Vaughn Cato May 23 '12 at 5:10
I'm trying to do the graph coloring algorithm in prolog, but it is so different from anything else I've used, I'm not quite even sure where to start. For example, variables. They are used differently in prolog, and I've found they're even requested differently. For example, in C# I can say Variable_I_want = Method_that_returns_the_variable(). I can't quite do that in prolog, and I haven't gotten my head around how to do this the "prolog way". –  Tino May 23 '12 at 5:22
Maybe you should start with something simpler, like assigning all your vertices a particular color. –  Vaughn Cato May 23 '12 at 5:38

I think you are trying to think in a way that is not natural for Prolog programs; that is, you are trying not to use recursion :) What I've came up with is the following, which however may not be entirely correct (it's late, and I don't have a good reputation when trying to think at times like this...:) )

Let's assume that you have the graph described by the following facts:

``````edge(a,b).
edge(b,c).
edge(b,d).
edge(c,d).
``````

and that the available colors are

``````color(blue).
color(red).
color(green).
``````

(you only need 3 colors to color a planar graph, so let's just use 3 here). Let's also assume that you want the answer to be given as a [Vertex-Color] list, where the list will contain a color for every vertex of your graph. I believe the following is a correct solution:

``````coloring([V-C]) :-
color(C),
\+ edge(V,_).
coloring([V-C,V1-C1|Coloring]) :-
color(C),
edge(V,V1),
V \== V1,
coloring([V1-C1|Coloring]),
C1 \== C.
``````

The first clause says that if there is no edge from V to any other vertex, just try all possible colors. The second clause says that vertex V will get color C, and vertex V1 will get color C1 if there is an edge from V to V1, where V != V1 and C != C1. (I also assumed that your graph is connected, i.e. there are no vertices which are not connected to other vertices).

And since we only want solutions where all the vertices have colors, we will only keep lists of length |V|, where V is the set of vertices you have. You can implement this restriction in various ways; I prefer to use "findall/3":

``````colors(X) :-
coloring(X),
findall(V,edge(V,_),List),
length(List,Len),
length(X,Len).
``````

Now, by consulting this program and asking `|?- colors(X).` you will get all the possible color assignments for the vertices of your graph.

If anyone finds a problem I am almost sure there exists in the above solution, please, do let us know :)

Spyros

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Thank you very much Spyros! Right now I'm trying to figure out why colors(X). is returning 'no', but now I'm understanding this a bit more. Should there be a list like [a-b, b-c, b-d, c-d], or should the code run with just the egde/2 and color/1 facts? –  Tino May 24 '12 at 1:40
Apparently the list is the problem; after findall(...), length(List, Len) fails because for some reason the List is a "Bad Goal: H38". –  Tino May 24 '12 at 2:39
I ran the above code in XSB-Prolog and it gives the correct (I hope :) )answer. Which Prolog compiler are you using? Maybe findall/3 requires different arguments in other Prologs...The use of findall/3 here is just to find how many vertices you have. You can replace it with the actual number, if you want. Just add a "vertices(4)" fact, which will contain the number of vertices you have in total, and replace the calls to findall and length(List,Len) with vertices(Len). The only stuff I have in my source code are the definitions of edge/2, color/1, coloring/1 and colors/1. –  Spyros May 24 '12 at 6:07

While I try the above encoding by slightly changing "edge(d,c)" with "edge(d,a)", I run into a problem with stack overflow in SWI-prolog.

There are three algorithms in prolog for graph coloring, see the link http://kti.mff.cuni.cz/~bartak/prolog.old/learning/LearningProlog9.html

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Is this a question or an answer??? –  Austin Henley Oct 3 '12 at 21:38