There is a beautiful algorithm for solving this that works in two passes (total time O(N)) using only constant external space (O(1)). I have an implementation of this algorithm, along with comments including a correctness proof, available here
The intuition behind the algorithm is actually quite beautiful. Suppose that you were to have a roomful of people each holding one element of the array. Whenever two people find each other where neither is holding the same array element as the other, the two of them sit down. Eventually, at the very end, if anyone is left standing, there's a chance that they're in the majority, and you can just check that element. As long as one element occurs with frequency at least N/2, you can guarantee that this approach will always find the majority element.
To actually implement the algorithm, you make a linear scan over the array and keep track of your current guess as to what the majority element is, along with the number of times that you've seen it so far. Initially, this guess is undefined and the number of repeats is zero. As you walk across the array, if the current element matches your guess, you increment the counter. If the current element doesn't match your guess, you decrement the counter. If the counter ever hits zero, then you reset it to the next element you encounter. You can think about this implementation as a concrete realization of the above "standing around in a room" algorithm. Whenever two people meet with different elements, they cancel out (dropping the counter). Whenever two people have the same element, then they don't interact with each other.
For a full correctness proof, citation to the original paper (by Boyer and Moore of the more famous Boyer-Moore string matching algorithm), and an implementation in C++, check out the above link.
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