I am new to Design and Analysis of Algorithms. I have a nested loop and and if statement.I am unable to determine the primitive operations being done in if statement. The statements are as follows:

for (i=0;i<n;i++)
 for(j=0;j<n;j++)
   if(i!=j and A[i]==A[j])
      duplicate=true
      break;
 if(duplicate)
   break;

i am determining the No of operations in if statement as follows:

Accessing array element 2 Times
comparing i and J
Comparing A[i] and A[j] 
Comparing AND Operator

all this is being done N times. Am i right in guessing the number of primitive operations in if statement? if not then please help me correct this. Thanks

  • You should add a language tag, but written this way, the outer loop is only going to run once; that last break will exit after the first pass. It doesn't "know" the outcome of the if test -- you'd have to check duplicate in the outer loop to decide whether to abort the outer loop. – McGuireV10 Mar 11 at 13:48
  • @McGuireV10 sorry. I forget a statement. please take a look at the question again. – Jamshaid Mar 11 at 13:51
  • I assume the two statements below the first if should actually be inside the if? – Henry Mar 11 at 14:07
  • That's why I was asking what the language should be. Though it's easy enough to guess with this simple example. But yes, Jamshaid, that's what I was talking about. – McGuireV10 Mar 11 at 14:09
  • @McGuireV10 though it is easy. but as i told earlier that i am new to analysis, that's why i am confused that how much operations will be done if the i != j gets wrong in this case . or how many to count that if both sides of and are true. – Jamshaid Mar 11 at 14:14
up vote 0 down vote accepted

Technically, we can't determine how many times this will happen since it depends on the contents of the array. Once a duplicate is found, the whole thing terminates. We'd have to see the complete contents of all of the elements from A[0] through A[n-1] to provide an exact number.

What you can say is that, at most (with no duplicates in A[]), the entire code snippet will run n2 times. Consequently, the rest of this assumes no duplicates:

  • Comparing i and j

This comparison will occur n2 times (again, assuming no duplicates to break the loops).

  • Accessing array element 2 times
  • Comparing AND operator
  • Comparing A[i] and A[j]

These other operations only happen if i != j is true, because most modern languages "short circuit". When that first condition fails (in other words, when i and j are the same) the rest of the if condition is ignored. The AND is never processed, the array elements are not accessed, and the array elements are not compared.

Therefore, these will run n2-n times. The -n is because each j loop will always match the i iterator for exactly one value, short circuiting the rest of the if condition.

I'm going to just assume a C-like language and correctly format the code as if this were a C# snippet:

// n and A[] initialized elsewhere
bool duplicate = false;
for(int i = 0; i < n; i++)
{
    for(int j = 0; j < n; j++)
    {
        if(i != j && A[i] == A[j])
        {
            duplicate = true;
            break;
        }    
    }
    if(duplicate)
    {
        break;
    }
}
  • Which one should i use in my analysis then? Either it should be N^2-n or n^2? – Jamshaid Mar 11 at 14:42
  • Both apply. As in the answer, the i != j comparison is n^2 but the other three operations are n^2-n ... assuming the language short-circuits (this is why we kept asking what language you're using -- but most of them short-circuit so it's a safe assumption). – McGuireV10 Mar 11 at 14:44
  • So i should use both of the cases and generate separate equations for the complexity of each language which use short circuit technique and which doesn't evaluate short circuit technique? – Jamshaid Mar 11 at 14:45
  • You could do that, but it's a technicality, you're probably safe to assume short-circuiting will happen. These days you'd probably only encounter full evaluation in things like very simple custom scripting languages. But without short-circuit, all operations would be n^2. – McGuireV10 Mar 11 at 14:50
  • okay. what about the if(duplicate) statement? Will it run n times as it is not the part of inner loop? – Jamshaid Mar 11 at 15:08

Your Answer

 

By clicking "Post Your Answer", you acknowledge that you have read our updated terms of service, privacy policy and cookie policy, and that your continued use of the website is subject to these policies.

Not the answer you're looking for? Browse other questions tagged or ask your own question.