0

Given a directed connected non-weighted graph as input.I want to print a result to the output where result is the number of sub-graphs in which there is an edge between each pair of nodes of the sub-graph (in either of the directions) . The sub-graphs having zero nodes or a single node are also counted in the result.Since the result might be too large so result modulo 10^9 + 7 has to be printed.

The input-graph will not have multiple edges between any node pair and the edges are directed from node u to node v only if u < v .

Sample input:

3 // no of nodes

2 // no of edges

1 2

2 3

Sample output:

6

Reason:

1.no nodes

2.node 1

3.node 2

4.node 3

5.node 1,2

6.node 2,3

I am a using a recurrence result = sum(DP[nodes])+1, where DP[node] = sum(DP[adjacentnodes])+1 But this is giving 7 to the output . Kindly suggest some better method for this graph having number of nodes <= 3000 .

Thanks

|improve this question
  • 1
    For a complete graph on 3000 nodes, there are 2^3000 cliques (a subgraph in which every pair of nodes is linked by an edge is called a clique). It's impractical to try to count them all. It makes more sense to try to count maximal cliques -- that is, cliques that can't be extended into larger cliques by adding more vertices. There are still a large (exponential) number of these. – j_random_hacker Dec 9 '14 at 7:47
  • @j_random_hacker the result modulo 10^9+7 has to printed in this question . Sorry for mentioning this later . Also since an edge exists between (u,v) pair with u < v , the graph is not complete . – tapopadma Dec 9 '14 at 8:19
  • 1
    @heropanti are you aware still it could be complete? for instance for node 1,2,3 we have : 1->2, 1->3, 2->3 – Lrrr Dec 9 '14 at 9:26
  • yah !! I mean the maximum edges = (number of node) choose 2 !!less than node*(node-1) !! By the way can't this question have a polynomial time solution ? – tapopadma Dec 9 '14 at 9:38
  • It's effectively a complete undirected graph, since the criterion for being a valid subgraph doesn't care about edge direction, and for any pair of vertices u and v, either u < v or v < u, so there's potentially an undirected edge between them. – j_random_hacker Dec 9 '14 at 10:16

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Browse other questions tagged or ask your own question.