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I've often seen that the discrete logarithm is a hard problem. However, I don't quite see how this could be. It seems to me that a regular binary search would do just fine to serve this purpose. For example,

binary_search(base, left, right, target) {
    if (pow(base, left) == target) 
        return left;
    if (pow(base, right) == target)
        return right;
    if (pow(base, (left + right) / 2) < target)
        return binary_search(base, (left + right) / 2, right, target);
    else
        return binary_search(base, left, (left + right) / 2, target);
}   

log(base, number) {
    left = 1;
    right = 2;
    while(pow(base, p) < number) {
        left = right;
        right *= 2;
    }
    return binary_search(base, left, right, number);
}

If the naive implementation of just incrementing p until pow(base, p) is O(n), then surely this binary search is O(log(n) ^2).

Or do I not understand how this algorithm is measured?

Edit: I don't usually write binary searches, so if there's some trivial implementation error, kindly just ignore it or edit in a fix.

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What’s the complexity of pow? –  Josh Lee Dec 17 '11 at 19:05
    
@JoshLee: Logarithmic in the power, at most. –  Puppy Dec 17 '11 at 19:06
    
Try this one en.wikipedia.org/wiki/Baby-step_giant-step –  kilotaras Dec 17 '11 at 19:27
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1 Answer 1

up vote 9 down vote accepted

Your algorithm assumes that a < b implies pow(base, a) < pow(base, b).

This is true for natural numbers, but it won't work in a finite cyclic group (when 'pow' is calculated modulo some number).

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That quite clearly explains the discrepancy between my intuition and the truth- I hadn't considered such. –  Puppy Dec 17 '11 at 19:17
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