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This piece of code is from Cracking the Coding interview book.

public static boolean isUniqueChars2(String str) {
    boolean[] char_set = new boolean[256];
    for (int i = 0; i < str.length(); i++) {
        int val = str.charAt(i);
        if (char_set[val]) return false;
        char_set[val] = true;
    }
    return true;
}

And the author mentions that,

Time complexity is O(n), where n is the length of the string, and space complexity is O(n).

I understand time complexity being O(n) but I don't understand how could space complexity be O(n)

My thinking: char_set will remain an array of size 256 no matter what the input (str) size is. Even if the length of "str" is 100,000, char_set is still a 256 element array. So I thought, since memory requirements for this function does not change with the size of the input and remain a constant 256, the space complexity is constant, i.e., O(1).

Can someone explain, if I am wrong (and, why?)

Thank you so much.

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2  
I think you are right, but that the autor said that the original str self ocupy O(n) (or you are getting a copy by value?). –  qPCR4vir Feb 20 '13 at 23:26
1  
hmmm...thats interesting. I thought when deriving Asymptotic complexities we generally ignore how/where/when the input is read? And just concentrate on what's happening inside the method (taking into account the size of input, which is n) –  anakkala Feb 20 '13 at 23:32
    
I'd like to see the author's reasoning. The space used by the algorithm itself is constant. You are right in that when we analyze space complexity, we're talking about the amount of extra space required by the processing, ignoring the input to the algorithm. –  Jim Mischel Feb 21 '13 at 0:15
    
well, a litte variation in this "algorithm" make posible not to take the whole str in memmory, but take char by char from some input device.... –  qPCR4vir Feb 21 '13 at 0:34
2  
My copy (5th ed) of this book says O(1) space. I don't see it listed in the errata though. –  brooksbp Mar 6 '13 at 4:26
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1 Answer

it's a bit more complicated, i think:

the max number of iterations before some character will be encountered twice is the size of the alphabet the string is built over.

if this size is finite, time complexity is O(1), if it's not, the boolean array cannot be of finite size, thus, space complexity will be O(n).

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