23

I am solving a problem on directed acyclic graph.

But I am having trouble testing my code on some directed acyclic graphs. The test graphs should be large, and (obviously) acyclic.

I tried a lot to write code for generating acyclic directed graphs. But I failed every time.

Is there some existing method to generate acyclic directed graphs I could use?

  • How can you use C and C++, yet not show any code? – sehe Oct 8 '12 at 22:29
  • I would take some large opensource netlist and break loops (if any) using a simple DFS-based loop detector. – bobah Oct 8 '12 at 22:30
  • "I am suffering" - hopefully it doesn't hurt. Sorry, I had to make fun, but your English is really ok. See the function directed_acyclic_graph here: condor.depaul.edu/rjohnson/source/graph_ge.c – Flavius Oct 8 '12 at 22:31
52

I cooked up a C program that does this. The key is to 'rank' the nodes, and only draw edges from lower ranked nodes to higher ranked ones.

The program I wrote prints in the DOT language.

Here is the code itself, with comments explaining what it means:

#include <stdio.h>
#include <stdlib.h>
#include <time.h>

#define MIN_PER_RANK 1 /* Nodes/Rank: How 'fat' the DAG should be.  */
#define MAX_PER_RANK 5
#define MIN_RANKS 3    /* Ranks: How 'tall' the DAG should be.  */
#define MAX_RANKS 5
#define PERCENT 30     /* Chance of having an Edge.  */

int main (void)
{
  int i, j, k,nodes = 0;
  srand (time (NULL));

  int ranks = MIN_RANKS
              + (rand () % (MAX_RANKS - MIN_RANKS + 1));

  printf ("digraph {\n");
  for (i = 0; i < ranks; i++)
    {
      /* New nodes of 'higher' rank than all nodes generated till now.  */
      int new_nodes = MIN_PER_RANK
                      + (rand () % (MAX_PER_RANK - MIN_PER_RANK + 1));

      /* Edges from old nodes ('nodes') to new ones ('new_nodes').  */
      for (j = 0; j < nodes; j++)
        for (k = 0; k < new_nodes; k++)
          if ( (rand () % 100) < PERCENT)
            printf ("  %d -> %d;\n", j, k + nodes); /* An Edge.  */

      nodes += new_nodes; /* Accumulate into old node set.  */
    }
  printf ("}\n");
  return 0;
}

And here is the graph generated from a test run:

A randomly generated DAG

  • 7
    Impressive simplicity. +1 – sehe Oct 9 '12 at 0:10
  • How have you visualised the graph like that? – LaLa Oct 24 '16 at 6:59
  • @LaLa like I mentioned in my answer, the program in my answer prints output in the DOT language. This file format is machine readable and can be visualized using any program that understands the language (I believe there are more than one). I used the dot program supplied with the GraphWiz package. – ArjunShankar Oct 24 '16 at 14:47
12

The answer to https://mathematica.stackexchange.com/questions/608/how-to-generate-random-directed-acyclic-graphs applies: if you have a adjacency matrix representation of the edges of your graph, then if the matrix is lower triangular, it's a DAG by necessity.

A similar approach would be to take an arbitrary ordering of your nodes, and then consider edges from node x to y only when x < y. That constraint should also get your DAGness by construction. Memory comparison would be one arbitrary way to order your nodes if you're using structs to represent nodes.

Basically, the pseudocode would be something like:

for(i = 0; i < N; i++) {
    for (j = i+1; j < N; j++) {
        maybePutAnEdgeBetween(i, j);
    }
}

where N is the number of nodes in your graph.

The pseudocode suggests that the number of potential DAGs, given N nodes, is

2^(n*(n-1)/2),

since there are

n*(n-1)/2

ordered pairs ("N choose 2"), and we can choose either to have the edge between them or not.

  • 1
    Can all dags be represented as a lower triangle adjacency matrix up to permutation of vertexes? – Andrew Tomazos Oct 8 '12 at 22:45
  • 2
    Yes. According to en.wikipedia.org/wiki/Directed_acyclic_graph, you can topologically sort the nodes. Given that, if you write out the matrix rows in order of the toposort, it has to be lower triangular due to the toposort. – dyoo Oct 8 '12 at 23:09
  • 1
    A proof with better explanation on SO: stackoverflow.com/questions/777613/… – dyoo Oct 8 '12 at 23:23
  • 1
    I see now, there must be one vertex in a DAG without an inbound edge. Place one of these on the last row of n matrix. The rightmost column must be all zeros. Remove the vertex from the graph, resulting in n-1 vertex DAG. By induction it works for n-1 submatrix. – Andrew Tomazos Oct 9 '12 at 14:53
  • 1
    You do not impose a structure ensuring a single connected DAG. Your maybePutAnEdgeBetween procedure would need to facilitate that. – Domi Jan 18 '14 at 6:11
3

You could generate a random directed graph, and then do a depth-first search for cycles. When you find a cycle, break it by deleting an edge.

I think this is worst case O(VE). Each DFS takes O(V), and each one removes at least one edge (so max E)

If you generate the directed graph by uniformly random selecting all V^2 possible edges, and you DFS in random order and delete a random edge - this would give you a uniform distribution (or at least close to it) over all possible dags.

3

So, to try to put all these reasonable answers together:

(In the following, I used V for the number of vertices in the generated graph, and E for the number of edges, and we assume that E ≤ V(V-1)/2.)

Personally, I think the most useful answer is in a comment, by Flavius, who points at the code at http://condor.depaul.edu/rjohnson/source/graph_ge.c. That code is really simple, and it's conveniently described by a comment, which I reproduce:

To generate a directed acyclic graph, we first
generate a random permutation dag[0],...,dag[v-1].
(v = number of vertices.)
This random permutation serves as a topological
sort of the graph. We then generate random edges of the
form (dag[i],dag[j]) with i < j.

In fact, what the code does is generate the request number of edges by repeatedly doing the following:

  1. generate two numbers in the range [0, V);
  2. reject them if they're equal;
  3. swap them if the first is larger;
  4. reject them if it has generated them before.

The problem with this solution is that as E gets closes to the maximum number of edges V(V-1)/2, then the algorithm becomes slower and slower, because it has to reject more and more edges. A better solution would be to make a vector of all V(V-1)/2 possible edges; randomly shuffle it; and select the first (requested edges) edges in the shuffled list.

The reservoir sampling algorithm lets us do this in space O(E), since we can deduce the endpoints of the kth edge from the value of k. Consequently, we don't actually have to create the source vector. However, it still requires O(V2) time.

Alternatively, one can do a Fisher-Yates shuffle (or Knuth shuffle, if you prefer), stopping after E iterations. In the version of the FY shuffle presented in Wikipedia, this will produce the trailing entries, but the algorithm works just as well backwards:

// At the end of this snippet, a consists of a random sample of the
// integers in the half-open range [0, V(V-1)/2). (They still need to be
// converted to pairs of endpoints).
vector<int> a;
int N = V * (V - 1) / 2;
for (int i = 0; i < N; ++i) a.push_back(i);
for (int i = 0; i < E; ++i) {
  int j = i + rand(N - i);
  swap(a[i], a[j]);
a.resize(E);

This requires only O(E) time but it requires O(N2) space. In fact, this can be improved to O(E) space with some trickery, but an SO code snippet is too small to contain the result, so I'll provide a simpler one in O(E) space and O(E log E) time. I assume that there is a class DAG with at least:

class DAG {
  // Construct an empty DAG with v vertices
  explicit DAG(int v);

  // Add the directed edge i->j, where 0 <= i, j < v
  void add(int i, int j);
};

Now here goes:

// Return a randomly-constructed DAG with V vertices and and E edges.
// It's required that 0 < E < V(V-1)/2.
template<typename PRNG>
DAG RandomDAG(int V, int E, PRNG& prng) {
  using dist = std::uniform_int_distribution<int>;
  // Make a random sample of size E
  std::vector<int> sample;
  sample.reserve(E);
  int N = V * (V - 1) / 2;
  dist d(0, N - E);  // uniform_int_distribution is closed range
  // Random vector of integers in [0, N-E]
  for (int i = 0; i < E; ++i) sample.push_back(dist(prng));
  // Sort them, and make them unique
  std::sort(sample.begin(), sample.end());
  for (int i = 1; i < E; ++i) sample[i] += i;
  // Now it's a unique sorted list of integers in [0, N-E+E-1]
  // Randomly shuffle the endpoints, so the topological sort
  // is different, too.
  std::vector<int> endpoints;
  endpoints.reserve(V);
  for (i = 0; i < V; ++i) endpoints.push_back(i);
  std::shuffle(endpoints.begin(), endpoints.end(), prng);
  // Finally, create the dag
  DAG rv;
  for (auto& v : sample) {
    int tail = int(0.5 + sqrt((v + 1) * 2));
    int head = v - tail * (tail - 1) / 2;
    rv.add(head, tail);
  }
  return rv;
}
2

A very simple approach is:

  1. Randomly assign edges by iterating over the indices of a lower diagonal matrix (as suggested by a link above: https://mathematica.stackexchange.com/questions/608/how-to-generate-random-directed-acyclic-graphs)

  2. This will give you a DAG with possibly more than one component. You can use a Disjoint-set data structure to give you the components that can then be merged by creating edges between the components.

Disjoint-sets are described here: https://en.wikipedia.org/wiki/Disjoint-set_data_structure

1

Create a graph with n nodes and an edge between each pair of node n1 and n2 if n1 != n2 and n2 % n1 == 0.

  • "an edge between each pair of node n1 and n2 if n1 != n2 and n2 % n1 == 0" - That would produce a graph in a deterministic way. – ArjunShankar Oct 8 '12 at 23:23
  • Yes it would. The question was about generating DAGs. This is a recipe to create DAGs. There wasn't any statement about randomness. Also, there is a distinct advantage of deterministic graphs for testing: they are deterministic! – Dietmar Kühl Oct 8 '12 at 23:27
  • Since the time I have been looking at this question, it has had 'random' it the title. I see now that this is the result of an edit. As to the advantages of using graphs that are essentially sub-graphs of each other in order to test code: I don't think I agree. I'd rather just generate a few thousand pseudo-random graphs and keep them stored away so I can better find bugs/regressions. Anyway, I won't argue the point. This is still a pretty valid answer. – ArjunShankar Oct 8 '12 at 23:32
1

I recently tried re-implementing the accepted answer and found that it is indeterministic. If you don't enforce the min_per_rank parameter, you could end up with a graph with 0 nodes.

To prevent this, I wrapped the for loops in a function and then checked to make sure that, after each rank, that min_per_rank was satisfied. Here's the JavaScript implementation:

https://github.com/karissa/random-dag

And some pseudo-C code that would replace the accepted answer's main loop.

int pushed = 0

int addRank (void) 
{
  for (j = 0; j < nodes; j++)
    for (k = 0; k < new_nodes; k++)
      if ( (rand () % 100) < PERCENT)
        printf ("  %d -> %d;\n", j, k + nodes); /* An Edge.  */

  if (pushed < min_per_rank) return addRank()
  else pushed = 0

  return 0
}
0

The code that @ArjunShankar provided generated DAG's with many redundant edges.

I translated to Python and integrated some functionalities to create a transitive set of the random DAG. In this way, the graph generated has the minimum number of edges with the same reachability.

The transitive graph can be visualized at http://dagitty.net/dags.html by pasting the output in Model code (in the right).

Note that @ArjunShankar code can be tuned to only generate the DAG with a minimum number of edges (code at the end).

Bellow, I generate a transitive graph of an existing DAG.

import random

class Graph:
    nodes = []
    edges = []
    removed_edges = []

    def remove_edge(self, x, y):
        e = (x,y)
        try:
            self.edges.remove(e)
            # print("Removed edge %s" % str(e))
            self.removed_edges.append(e)
        except:
            return

    def Nodes(self):
        return self.nodes

    # Sample data
    def __init__(self):
        self.nodes = []
        self.edges = []


def get_random_dag():
    MIN_PER_RANK = 1    # Nodes/Rank: How 'fat' the DAG should be
    MAX_PER_RANK = 2
    MIN_RANKS = 6   # Ranks: How 'tall' the DAG should be
    MAX_RANKS = 10
    PERCENT = 0.3  # Chance of having an Edge
    nodes = 0

    ranks = random.randint(MIN_RANKS, MAX_RANKS)

    adjacency = []
    for i in range(ranks):
        # New nodes of 'higher' rank than all nodes generated till now
        new_nodes = random.randint(MIN_PER_RANK, MAX_PER_RANK)

        # Edges from old nodes ('nodes') to new ones ('new_nodes')
        for j in range(nodes):
            for k in range(new_nodes):
                if random.random() < PERCENT:
                    adjacency.append((j, k+nodes))

        nodes += new_nodes

    # Compute transitive graph
    G = Graph()
    # Append nodes
    for i in range(nodes):
        G.nodes.append(i)
    # Append adjacencies
    for i in range(len(adjacency)):
        G.edges.append(adjacency[i])

    N = G.Nodes()
    for x in N:
        for y in N:
            for z in N: 
                if (x, y) != (y, z) and (x, y) != (x, z):
                    if (x, y) in G.edges and (y, z) in G.edges:
                        G.remove_edge(x, z)

    # Print graph
    for i in range(nodes):
        print(i)
    print()
    for value in G.edges:
        print(str(value[0]) + ' ' + str(value[1]))

get_random_dag()

Bellow, you may see in the first figure the random DAG with many redundant edges generated by @ArjunShankar code. The second figure is the transitive set of random DAG.

Random DAG

Transitive Graph

Transitive

def get_random_dag():
    MIN_PER_RANK = 1    # Nodes/Rank: How 'fat' the DAG should be
    MAX_PER_RANK = 3
    MIN_RANKS = 15   # Ranks: How 'tall' the DAG should be
    MAX_RANKS = 20
    PERCENT = 0.3  # Chance of having an Edge
    nodes = 0
    node_counter = 0

    ranks = random.randint(MIN_RANKS, MAX_RANKS)

    adjacency = []
    rank_list = []
    for i in range(ranks):
        # New nodes of 'higher' rank than all nodes generated till now
        new_nodes = random.randint(MIN_PER_RANK, MAX_PER_RANK)

        list = []
        for j in range(new_nodes):
            list.append(node_counter)
            node_counter += 1
        rank_list.append(list)

        print(rank_list)

        # Edges from old nodes ('nodes') to new ones ('new_nodes')
        if i > 0:
            for j in rank_list[i - 1]:
                for k in range(new_nodes):
                    if random.random() < PERCENT:
                        adjacency.append((j, k+nodes))

        nodes += new_nodes

    for i in range(nodes):
        print(i)
    print()
    for edge in adjacency:
        print(str(edge[0]) + ' ' + str(edge[1]))
    print()
    print()
0

Generating a random DAG which might not be connected

Here's an simple algorithm for generating a random DAG that might not be connected.

const randomDAG = (x, n) => {
    const length = n * (n - 1) / 2;

    const dag = new Array(length);

    for (let i = 0; i < length; i++) {
        dag[i] = Math.random() < x ? 1 : 0;
    }

    return dag;
};

const dagIndex = (n, i, j) => n * i + j - (i + 1) * (i + 2) / 2;

const dagToDot = (n, dag) => {
    let dot = "digraph {\n";

    for (let i = 0; i < n; i++) {
        dot += `    ${i};\n`;

        for (let j = i + 1; j < n; j++) {
            const k = dagIndex(n, i, j);
            if (dag[k]) dot += `    ${i} -> ${j};\n`;
        }
    }

    return dot + "}";
};

const randomDot = (x, n) => dagToDot(n, randomDAG(x, n));

new Viz().renderSVGElement(randomDot(0.3, 10)).then(svg => {
    document.body.appendChild(svg);
});
<script src="https://cdnjs.cloudflare.com/ajax/libs/viz.js/2.1.2/viz.js"></script>
<script src="https://cdnjs.cloudflare.com/ajax/libs/viz.js/2.1.2/full.render.js"></script>

If you run this code snippet a couple of times, you might see a DAG which is not connected.

So, how does this code work?

A directed acyclic graph (DAG) is just a topologically sorted undirected graph. An undirected graph of n vertices can have a maximum of n * (n - 1) / 2 edges, not counting repeated edges or edges from a vertex to itself. Now, you can only have an edge from a lower vertex to a higher vertex. Hence, the direction of all the edges are predetermined.

This means that you can represent the entire DAG using a one dimensional array of n * (n - 1) / 2 edge weights. An edge weight of 0 means that the edge is absent. Hence, we just create a random array of zeros or ones, and that's our random DAG.

An edge from vertex i to vertex j in a DAG of n vertices, where i < j, has an edge weight at index k where k = n * i + j - (i + 1) * (i + 2) / 2.


Generating a connected DAG

Once you generate a random DAG, you can check if it's connected using the following function.

const isConnected = (n, dag) => {
    const reached = new Array(n).fill(false);

    reached[0] = true;

    const queue = [0];

    while (queue.length > 0) {
        const x = queue.shift();

        for (let i = 0; i < n; i++) {
            if (i === n || reached[i]) continue;
            const j = i < x ? dagIndex(n, i, x) : dagIndex(n, x, i);
            if (dag[j] === 0) continue;
            reached[i] = true;
            queue.push(i);
        }
    }

    return reached.every(x => x); // return true if every vertex was reached
};

If it's not connected then its complement will always be connected.

const complement = dag => dag.map(x => x ? 0 : 1);

const randomConnectedDAG = (x, n) => {
    const dag = randomDAG(x, n);
    return isConnected(n, dag) ? dag : complement(dag);
};

Note that if we create a random DAG with 30% edges then its complement will have 70% edges. Hence, the only safe value for x is 50%. However, if you care about connectivity more than the percentage of edges then this shouldn't be a deal breaker.

Finally, putting it all together.

const randomDAG = (x, n) => {
    const length = n * (n - 1) / 2;

    const dag = new Array(length);

    for (let i = 0; i < length; i++) {
        dag[i] = Math.random() < x ? 1 : 0;
    }

    return dag;
};

const dagIndex = (n, i, j) => n * i + j - (i + 1) * (i + 2) / 2;

const isConnected = (n, dag) => {
    const reached = new Array(n).fill(false);

    reached[0] = true;

    const queue = [0];

    while (queue.length > 0) {
        const x = queue.shift();

        for (let i = 0; i < n; i++) {
            if (i === n || reached[i]) continue;
            const j = i < x ? dagIndex(n, i, x) : dagIndex(n, x, i);
            if (dag[j] === 0) continue;
            reached[i] = true;
            queue.push(i);
        }
    }

    return reached.every(x => x); // return true if every vertex was reached
};

const complement = dag => dag.map(x => x ? 0 : 1);

const randomConnectedDAG = (x, n) => {
    const dag = randomDAG(x, n);
    return isConnected(n, dag) ? dag : complement(dag);
};

const dagToDot = (n, dag) => {
    let dot = "digraph {\n";

    for (let i = 0; i < n; i++) {
        dot += `    ${i};\n`;

        for (let j = i + 1; j < n; j++) {
            const k = dagIndex(n, i, j);
            if (dag[k]) dot += `    ${i} -> ${j};\n`;
        }
    }

    return dot + "}";
};

const randomConnectedDot = (x, n) => dagToDot(n, randomConnectedDAG(x, n));

new Viz().renderSVGElement(randomConnectedDot(0.3, 10)).then(svg => {
    document.body.appendChild(svg);
});
<script src="https://cdnjs.cloudflare.com/ajax/libs/viz.js/2.1.2/viz.js"></script>
<script src="https://cdnjs.cloudflare.com/ajax/libs/viz.js/2.1.2/full.render.js"></script>

If you run this code snippet a couple of times, you may see a DAG with a lot more edges than others.


Generating a connected DAG with a certain percentage of edges

If you care about both connectivity and having a certain percentage of edges then you can use the following algorithm.

  1. Start with a fully connected graph.
  2. Randomly remove edges.
  3. After removing an edge, check if the graph is still connected.
  4. If it's no longer connected then add that edge back.

It should be noted that this algorithm is not as efficient as the previous method.

const randomDAG = (x, n) => {
    const length = n * (n - 1) / 2;

    const dag = new Array(length).fill(1);

    for (let i = 0; i < length; i++) {
        if (Math.random() < x) continue;
        dag[i] = 0;
        if (!isConnected(n, dag)) dag[i] = 1;
    }

    return dag;
};

const dagIndex = (n, i, j) => n * i + j - (i + 1) * (i + 2) / 2;

const isConnected = (n, dag) => {
    const reached = new Array(n).fill(false);

    reached[0] = true;

    const queue = [0];

    while (queue.length > 0) {
        const x = queue.shift();

        for (let i = 0; i < n; i++) {
            if (i === n || reached[i]) continue;
            const j = i < x ? dagIndex(n, i, x) : dagIndex(n, x, i);
            if (dag[j] === 0) continue;
            reached[i] = true;
            queue.push(i);
        }
    }

    return reached.every(x => x); // return true if every vertex was reached
};

const dagToDot = (n, dag) => {
    let dot = "digraph {\n";

    for (let i = 0; i < n; i++) {
        dot += `    ${i};\n`;

        for (let j = i + 1; j < n; j++) {
            const k = dagIndex(n, i, j);
            if (dag[k]) dot += `    ${i} -> ${j};\n`;
        }
    }

    return dot + "}";
};

const randomDot = (x, n) => dagToDot(n, randomDAG(x, n));

new Viz().renderSVGElement(randomDot(0.3, 10)).then(svg => {
    document.body.appendChild(svg);
});
<script src="https://cdnjs.cloudflare.com/ajax/libs/viz.js/2.1.2/viz.js"></script>
<script src="https://cdnjs.cloudflare.com/ajax/libs/viz.js/2.1.2/full.render.js"></script>

Hope that helps.

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