I have chosen to represent a graph in Haskell by a list of nodes (ex. `n=[1,2,3,4]`) and a list of pairs representing the edges (example `m=[(1,2), (2,3)]`). Now I have to see if the graph is strongly connected.

My main issue is how to find if there is a way between 2 nodes in the graph. I wrote something like that:

``````-- sees if 2 nodes are adjacent

adjacent x y [] = False

if(x== (fst mu) && y==(snd mu)) then True

-- the successor of a node, ex for the edge (1,2) the succ of 1 is 2
suc x [] = 0
suc x (l:list) =
if(x==(fst l)) then snd l
else suc x list

-- my main function
way 0 y list = False

way x y (mu:m)
| x==y = True
| (adjacent x y (mu:m)) == True = True
| otherwise =
if ((way (suc x (mu:m)) y (mu:m))==False) then way (suc x m) y m
else True
``````

It works when I have nodes of degree 1, but for the nodes with a greater degree it doesn't always work. Can you give me a clue about it?

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+1 for being clear it was homework! Let's us know how to approach helping. –  MtnViewMark May 5 '10 at 20:28
Once a particular answer has helped you successfully solve your question, it is normal to choose it (click the check mark under the vote count) so that SO knows the question is solved. Indicates to members that they may want to spend time on other questions now. –  MtnViewMark May 6 '10 at 13:13

You have two errors of understanding:

1. `m`, your list of edges is static throughout the entire search. Don't eat it up as you recur in `way`.
2. Each vertex can have more than one edge leaving it. You want to know whether `any` of the neighbours of x has a `way` to y. To find the neighbours you first have to `filter` the list of edges to find only the edges leaving x.

You also need to build up a list of nodes you've already visited on your quest to find a connection. If you end up on a node you've already seen, then that particular path has failed.

Some hints to make your code a lot shorter: for `adjacent`, try `elem`. For `succ`, try `Data.Maybe.fromMaybe` and `lookup`.

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Here are some questions to ask yourself:

1. Should `adjacent 3 2 [(1,2),(2,3)]` be `True`?
2. How many successors to `1` are there in the graph `[(1,2),(2,3),(1,4),(3,4)]`
3. Why does, or doesn't, `way` need to have both a `x==y` case and an `adjacent x y ...` case?
4. In the recursion step of `way` does the `== False` test really tell you something that lets you recurse on the smaller graph of `m`?

In general, you haven't written type signatures for your top level functions. It is usually very instructive to do so, and will communicate your design more clearly:

``````type Vertex = Int
type Edge = (Vertex, Vertex)
type Graph = [Edge]

adjacent :: Vertex -> Vertex -> Graph -> Bool
suc :: Vertex -> Graph -> Vertex
way :: Vertex -> Vertex -> Graph -> Bool
``````

Think about if those types make sense, and if they decompose your problem as you would expect, just thinking about graphs in general.

Is your aim really the `way` function, or is it to determine if the graph is connected? You might be presupposing too much about the way in which you can determine if the graph is connected.

Lastly, a small part about Haskell syntax: Like most other languages, function application binds very tightly, tighter than `==` and `&&` operators. Unlike most other languages, function application doesn't use parenthesis. Hence, `adjacent` can be recoded as:

``````adjacent x y [] = False
``````adjacent x y [] = False