# Transitive closure and equivalence classes

I want to ask about transitive closure and sorting in equivalence classes.

I have an boolean matrix, the result I want is that, from the boolean matrix, I compute transitive closure, find equivalence class(es), and order all these equivalence class(es).

For example: I have a graph

``````0 <-> 1
|
v
2
``````

I have 2 equivalence classes {{0; 1}; {2}}, and the result of sorting this class is: {2} after class {0; 1}

1) I want to understand more about why from transitive closure I can find equivalence classes ? Could you please give me an example? I am easily understand by example.

2) Here is an example. I am testing with the algorithm I describe above

``````let matrix =
[|[| false; true; false; false|];
[| false; false; false; false|];
[| true; true; false; true|];
[| false; false; false; false|];
|]

(* compute a transitive closure of a matrix *)
let transClosure matrix =
let n = Array.length matrix in
for k = 0 to n - 1 do
let mk = matrix.(k) in
for i = 0 to n - 1 do
let mi = matrix.(i) in
for j = 0 to n - 1 do
mi.(j) <- max mi.(j) (min mi.(k) mk.(j))
done;
done;
done;
matrix;;

(* compute transitive closure of boolean matrix *)
let tc_ma = transClosure matrix;;
(* compute equivalence classes on transitive closure*)
let eq = equivalence_classes tc_ma;;
(* sorting all equivalence classes *)
let sort = sort_equivalence_classes tc_ma eq;;
``````

with these functions `equivalence_classes` and `sort_equivalence_classes` from: Asking about return type, list and set data structure in OCaml

I don't understand why the output of functions `eq` and `sort` are the same, and here is the output of both functions: `[[3; 1; 0]; [1]]`; I don't understand why it gave me this result, and where is `2`? How can I have a result I expected?

Thank you very much

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