Finding all cycles in directed graphs of length <= k

Is there a way of modifing the algorithm in

Finding all cycles in undirected graphs

to consider edges as directed and only cycles of length <= k ?

-

``````static void Main(string[] args)
{
int k = 4;
for (int i = 0; i < graph.GetLength(0); i++)
for (int j = 0; j < graph.GetLength(1); j++)
{
findNewCycles(new int[] { graph[i, j] },k);
}

foreach (int[] cy in cycles)
{
string s = "" + cy[0];

for (int i = 1; i < cy.Length; i++)
s += "," + cy[i];

Console.WriteLine(s);
}
}

static void findNewCycles(int[] path, int k)
{
int n = path[0];
int x;
int[] sub = new int[path.Length + 1];

if (path.Length < k + 1)
{

for (int i = 0; i < graph.GetLength(0); i++)
for (int y = 0; y <= 1; y = y + 2)
if (graph[i, y] == n)
//  edge referes to our current node
{
x = graph[i, (y + 1) % 2];
if (!visited(x, path))
//  neighbor node not on path yet
{
sub[0] = x;
Array.Copy(path, 0, sub, 1, path.Length);
//  explore extended path
findNewCycles(sub,k);
}
else if ((path.Length > 2) && (x == path[path.Length - 1]))
//  cycle found
{
int[] p = normalize(path);
int[] inv = invert(p);
if (isNew(p) && isNew(inv))
}
}
}

}

static bool equals(int[] a, int[] b)
{
bool ret = (a[0] == b[0]) && (a.Length == b.Length);

for (int i = 1; ret && (i < a.Length); i++)
if (a[i] != b[i])
{
ret = false;
}

return ret;
}

static int[] invert(int[] path)
{
int[] p = new int[path.Length];

for (int i = 0; i < path.Length; i++)
p[i] = path[path.Length - 1 - i];

return normalize(p);
}

//  rotate cycle path such that it begins with the smallest node
static int[] normalize(int[] path)
{
int[] p = new int[path.Length];
int x = smallest(path);
int n;

Array.Copy(path, 0, p, 0, path.Length);

while (p[0] != x)
{
n = p[0];
Array.Copy(p, 1, p, 0, p.Length - 1);
p[p.Length - 1] = n;
}

return p;
}

static bool isNew(int[] path)
{
bool ret = true;

foreach (int[] p in cycles)
if (equals(p, path))
{
ret = false;
break;
}

return ret;
}

static int smallest(int[] path)
{
int min = path[0];

foreach (int p in path)
if (p < min)
min = p;

return min;
}

static bool visited(int n, int[] path)
{
bool ret = false;

foreach (int p in path)
if (p == n)
{
ret = true;
break;
}

return ret;
}
}
``````
-
A very good example of why giving variables meaningful names is absolutely essential. –  BenjaminPaul Mar 5 '13 at 20:24
Yeah, if you could provide some context it would help. I'm not even sure what language this is. And 'graph' is a global variable with the adjacency matrix? If you could describe what you did in pseudocode that would be great. –  Quantum7 Jun 18 '13 at 4:39