# How Prim's algorithm time complexity is ElogV using Priority Q?

Pseudo code which I used:

``````for all V vertices: visited[n]=0

pick any vertex r from graph and set visited[r]=1

For all edges e incident to r
PQ.insert()

while(PQ is not empty)//line 1
f=PQ.min()//f(r,s) is such that visited[s]=0
for all edges e(s,t) incident to s//line 2
if(visited[t]==0)
PQ.insert(e);//line 3
else
PQ.delete(e);//line 4
visited[s]=1;
end while;
``````

According to my understanding:

• line 1 : executes `V-1` times.
• Line 2 : Sum of Degree of all the vertices times…..that is `2E` times

For each line 2: Line 3 and line 4 take `log E` time because we’re adding/deleting all the edges to/from the `PQ` one by one.

So total `time`= `V-1+2E.logE` = `E.log E`

But the book says it is `E.logV`, could you explain why that is?

-

O(log(V)) and O(log(E)) are the same.

• E is at most V2.
• log(V2) = 2*log(V)
• which is an O(log(V))
-
+1: actually E is at most V(V-1)/2. Good answer. –  Nick Dandoulakis Aug 23 '09 at 8:30
@Nick D: right, but as I think in complexities, for me it's the same. E is at most O(V^2) :) –  yairchu Aug 23 '09 at 11:25
How many edges a node `s` can have at most?
`V-1` at most. So, PQ operations have O(logV) time complexity.