In popoular implementation we use three loops, loop variables say i,j,k. Here i & j are used for indicating two vertices' source & destination respectively and so 'k' represents the 'intermediate' vertex. If i place loop with loop variable 'k' 3rd instead of placing it 1st i get wrong answer. Why?

1I dont understand what you exactly do, please show us your new algorithm maybe we understand that :) – Lrrr Dec 30 '14 at 6:36
Here's the idea behind FloydWarshall algorithm:
if:
i is connected to k and
k is connected to j
then if i and j are not connected,
create a connection between i and j
Alternative explanation:
if:
i > k and
k > j
then if not i > j
create i > j
What I am trying to say is that k is going to be in the middle of the logical connection. The middle vertex k is responsible of giving permission for the the N neighbors vertices to have direct connection.
The above algorithm must be applied on V vertices, and therefore the loop on k must be the most outer for loop.
Example:
DiGraph:
Vertices: 0,1,2
Edges: (0,1), (1,2)
Representation: 0 > 1 > 2
Algorithm:
k = 0
i = 0 ignore because k = i
i = 1 false because 1 > 0 is wrong
i = 2 false because 2 > 0 is wrong
k = 1
i = 0 true because 0 > 1
j = 0 ignore because i = j
j = 1 ignore because j = k
j = 2 true because 1 > 2
Since 0 > 2 does not exist, create this edge
i = 1 ignore because i = k
i = 2 false because 2 > 1 is wrong
k = 2
i = 0 true because we created this edge in the previous iteration
j = 0 ignore because i = j
j = 1 false because 2 > 1 is wrong
j = 2 ignore because j = k
i = 1 true because 1 > 2
j = 0 false because 2 > 0 is wrong
j = 1 ignore because i = j
j = 2 ignore because j = k
i = 2 ignore because i = k
So in conclusion,
k needed to execute V times
i needed to execute V times for each k
j needed to execute V times for each successful i on i > k
Time complexity: O(n^{3})
Note: If you want to apply the algorithm or play with it so that you understand better how it works, please check my Github repo on the GraphADT, the method name is transitiveClosure()
. The method is implemented in the Graph.java file.

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