Let `A`

be the adjacency matrix for the graph `G = (V,E)`

. `A(i,j) = 1`

if the nodes `i`

and `j`

are connected with an edge, `A(i,j) = 0`

otherwise.

My objective is the one of understanding whether `G`

is acyclic or not. A cycle is defined in the following way:

`i`

and`j`

are connected:`A(i,j) = 1`

`j`

and`k`

are connected:`A(j,k) = 1`

`k`

and`i`

are connected:`A(k,i) = 1`

I have implemented a solution which navigates the matrix as follows:

- Start from an edge
`(i,j)`

- Select the set
`O`

of edges which are outgoing from`j`

, i.e., all the 1s in the`j`

-th row of`A`

- Navigate
`O`

in a DFS fashion - If one of the paths generated from this navigation leads to the node
`i`

, then a cycle is detected

Obviously this solution is very slow, since I have to evaluate all the paths in the matrix. If `A`

is very big, the required overhead is very huge. I was wondering whether there is a way of navigating the adjacency matrix so as to find cycles without using an expensive algorithm such as DFS.

I would like to implement my solution in MATLAB.

Thanks in advance,

Eleanore.