# What is the algorithm for generating a random Deterministic Finite Automata?

The DFA must have the following four properties:

• The DFA has N nodes

• Each node has 2 outgoing transitions.

• Each node is reachable from every other node.

• The DFA is chosen with perfectly uniform randomness from all possibilities

This is what I have so far:

2. Choose a node that has not already been chosen.
3. Connect its output to 2 other randomly selected nodes
4. Label one transition 1 and the other transition 0.
5. Go to 2, unless all nodes have been chosen.
6. Determine if there is a node with no incoming connections.
7. If so, steal an incoming connection from a node with more than 1 incoming connection.
8. Go to 6, unless there are no nodes with no incoming connections

However, this is algorithm is not correct. Consider the graph where node 1 has its two connections going to node 2 (and vice versa), while node 3 has its two connection going to node 4 (and vice versa). That is something like:

1 <==> 2

3 <==> 4

Where, by <==> I mean two outgoing connections both ways (so a total of 4 connections). This seems to form 2 cliques, which means that not every state is reachable from every other state.

Does anyone know how to complete the algorithm? Or, does anyone know another algorithm? I seem to vaguely recall that a binary tree can be used to construct this, but I am not sure about that.

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Are you sure you want all nodes to be reachable from every node? It's much simpler to make one where all nodes are reachable from the start node. –  Null Set Apr 2 '11 at 20:42
Yes, I'm sure I need all nodes to be reachable from every node. –  Jeff B. Apr 2 '11 at 20:44
"random deterministic"? –  Lasse V. Karlsen Apr 2 '11 at 21:00
A randomly constructed deterministic finite automata (DFA). The DFA is deterministic. It is chosen randomly, with perfectly uniform distribution, from all possible DFA with N nodes. –  Jeff B. Apr 2 '11 at 21:18
That is, it is chosen randomly from all DFA with the four properties I mentioned in my question. –  Jeff B. Apr 2 '11 at 21:30

Strong connectivity is a difficult constraint. Let's generate uniform random surjective transition functions and then test them with e.g. Tarjan's linear-time SCC algorithm until we get one that's strongly connected. This process has the right distribution, but it's not clear that it's efficient; my researcher's intuition is that the limiting probability of strong connectivity is less than 1 but greater than 0, which would imply only O(1) iterations are necessary in expectation.

Generating surjective transition functions is itself nontrivial. Unfortunately, without that constraint it is exponentially unlikely that every state has an incoming transition. Use the algorithm described in the answers to this question to sample a uniform random partition of {(1, a), (1, b), (2, a), (2, b), …, (N, a), (N, b)} with N parts. Permute the nodes randomly and assign them to parts.

For example, let N = 3 and suppose that the random partition is

``````{{(1, a), (2, a), (3, b)}, {(2, b)}, {(1, b), (3, a)}}.
``````

We choose a random permutation 2, 3, 1 and derive a transition function

``````(1, a) |-> 2
(1, b) |-> 1
(2, a) |-> 2
(2, b) |-> 3
(3, a) |-> 1
(3, b) |-> 2
``````
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Note that this is assuming distinguishable states. For indistinguishable states, use Brendan McKay's nauty to compute the number of automorphisms A and then accept the graph with probability 1/A if it is strongly connected. Note that A is almost always 1, so this is (a) still efficient (b) not much different in distribution from distinguishable states. –  qrqwe Apr 3 '11 at 19:36
Note also that although Jeremiah Willcock's algorithm is exponential-time, computers are really fast these days and you should avoid enforcing surjectivity until you know that N is too large. –  qrqwe Apr 3 '11 at 20:52
I am referring to indistinguishable states. So, what graph are you saying I need to accept with 1/A probability? The graph produced by the algorithm you gave above? –  Jeff B. Apr 3 '11 at 22:19
@qrqwe: AHHHH. I get it. Thank you!!! –  Jeff B. Apr 3 '11 at 22:28
Could Ono's recent discovery with the completion of the theory behind the partition function speed this up? Didn't he come up with a way to determine the number of partitions of any number relatively easily? –  Jeff B. Apr 3 '11 at 22:36

In what follows I'll use the basic terminology of graph theory.

You could:

1. Start with a directed graph with N vertices and no arcs.
2. Generate a random permutation of the N vertices to produce a random Hamiltonian cycle, and add it to the graph.
3. For each vertex add one outgoing arc to a randomly chosen vertex.

The result will satisfy all three requirements.

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Yea, I thought about that, but is it really random if I add in a Hamiltonian cycle? I need it to be chosen with perfectly uniform randomness from all possibilities. –  Jeff B. Apr 2 '11 at 20:46
That's a very strong requirement. If that's what you really need, you ought to clearly state it in your question. –  NPE Apr 2 '11 at 20:47
Your right. Sorry about that. –  Jeff B. Apr 2 '11 at 20:52
There are DFAs which meet the requirements and have no hamiltonian path. Consider the graph with edges {ab,ba,bc,cb,aa,cc}. –  Null Set Apr 2 '11 at 22:49
Yes, but they all have a directed cycle. –  Jeff B. Apr 2 '11 at 22:52

Just keep growing a set of nodes which are all reachable. Once they're all reachable, fill in the blanks.

``````Start with a set of N nodes called A.
Choose a node from A and put it in set B.
While there are nodes left in set A
Choose a node x from set A
Choose a node y from set B with less than two outgoing transitions.
Choose a node z from set B
Add a transition from y to x.
Add a transition from x to z
Move x to set B
For each node n in B
While n has less than two outgoing transitions
Choose a node m in B
Add a transition from n to m
Choose a node to be the start node.
Choose some number of nodes to be accepting nodes.
``````

Every node in set B can reach every node in set B. As long as a node can be reached from a node in set B and that node can reach a node in set B, it can be added to the set.

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Are you absolutely sure this is correct? –  Jeff B. Apr 2 '11 at 20:53
@Jeff B: I am pretty sure. I can't see any reason my invariant wouldn't be true. –  Null Set Apr 2 '11 at 20:58
Will is always be the case that y exists in the set B? –  Jeff B. Apr 2 '11 at 21:05
I think this is correct. Thank you. –  Jeff B. Apr 2 '11 at 21:20
@templatetypedef: We'd need to have a good definition of what exactly a distinct DFA is before I could start trying to prove that. –  Null Set Apr 2 '11 at 21:42

The simplest way that I can think of is to (uniformly) generate a random DFA with `N` nodes and two outgoing edges per node, ignoring the other constraints, and then throw away any that are not strongly connected (which is easy to test using a strongly connected components algorithm). Generating uniform DFAs should be straightforward without the reachability constraint. The one thing that could be problematic performance-wise is how many DFAs you would need to skip before you found one with the reachability property. You should try this algorithm first, though, and see how long it ends up taking to generate an acceptable DFA.

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We can start with a random number of states N1 between N and 2N.

Assume the initial state the as the state number 1. For each state, for each character in the input alphabet we generate a random transition (between 1 and N1).

We take the connex automaton starting from the initial state. We check the number of states, and after few tries we get one with N states.

If we wish a minimal automaton too, remains only the assignment of final states, however there are great chances that a random assignment gets a minimal automaton as well.

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The following references seem to be relevant to your question:

F. Bassino, J. David and C. Nicaud, Enumeration and random generation of possibly incomplete deterministic automata, Pure Mathematics and Applications 19 (2-3) (2009) 1-16.

F. Bassino and C. Nicaud. Enumeration and Random Generation of Accessible Automata. Theor. Comp. Sc.. 381 (2007) 86-104.

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