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# Understanding Big O for power set

I have written an algorithm for power set written as P(a). Just learning about time complexities of algorithms (Big-O), so correct me if I am wrong.

Algorithm:

``````function powerSet(int[] a ){
ArrayList pw = new ArrayList();
pw.add(" ");
for (int i = 1; i <= a.length; i++) //O(n){
ArrayList<String> tmp = new ArrayList<String>();

for (String e : pw)//O(n) {
if(e.equals(" "))
tmp.add(""+a[i-1]) //contanst time;
else
tmp.add(e+a[i-1]) //constant time;
}
pw.addAll(tmp)//O(1);
}
return pw;
}
``````

Is the time complexity of this O(n)*O(n) = O(n^2), or it is an exponential function (c^n where c > 1) like 2^n, because I am enumerating all possible subsets.

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## 1 Answer

The number of times the outer loop runs is `a.length`. The number of times the inner loop runs is `pw.length`, but this increases as the function runs. So you can't say that they're both `O(n)`. Also, `pw.addAll(tmp)` is not constant-time.

Here, the asymptotic time-complexity is the same as the number of times `tmp.add()` is called, which is equal to the final size of `pw`: `O(2^n)`.

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