for (int i=0; i<N; i++)
for (int j=i; j<N; j++)
fun1(i,j);
Above is a nested for loop. The first for loop goes from 0 to N, and the second for loop goes from i to N. What is the time complexity of the above code?
edit: fun1 is o(1)
Above is a nested for loop. The first for loop goes from 0 to N, and the second for loop goes from i to N. What is the time complexity of the above code? edit: fun1 is o(1) 

O(n²*O(fun)). Clearly the answer depends on the complexity of fun. Edit: As fun() = O(1), the complexity loop complexity is O(n²) 


The number of loops are as follows 1+2+3+...+N which is N * (N + 1)/2 = N^2/2 + N/2. So, the time complexity is O(N^2/2 + N/2) = O(N^2) 


Since 


The outside for loop will run the inner for loop N times. The inner for loop will call the fun1(i,j) N times on the first cycle of the outer loop. Then (N1) times on the second cycle of the outer for loop. Then (N2) times, then (N3) times and so on all the way to the Nth cycle (i = N1) of the outside loop when fun1(i,j) will run only once. So we are running fun1(i,j) an average of N/2 times on every iteration of the inside loop. Thus assuming fun1(i,j) has a complexity of O(fun1(i,j)) we get a total complexity of O(n * (n/2) * O(fun1(i,j))) = O(n^2/2 * O(fun1(i,j))) But since we can ignore numerical constants for large values of N to gauge complexity the order of complexity of your code will be O(n^2 * O(fun1(i,j))) Since fun1(i,j) is constant time O(fun1(i,j)) = O(1) and the complexity of your code will be O(n^2) A similar example can he seen here in this Selection Sort Algo. See the selection sort algorithm. Here instead of your fun1(i,j) a simple assignment line 'index_of_min = y;' is used but this is just like your example and may be helpful. 


The body of the inner loop executes and The total growth of time of the code will depend on the complexity of EDIT As you have edited that 


fun1
, don't you think? – ybungalobill Jun 12 '12 at 16:34O(N^2 * fun1())
. – Luchian Grigore Jun 12 '12 at 16:35