I understand that both quick sort and merge sort need O(n)
auxiliary space for the temporary sub-arrays that are constructed, and in-place quick sort requires O(log n)
auxiliary space for the recursive stack frames. But for heap sort, it seems like it also has a worst case of O(n)
auxiliary space to build the temporary heap, even if the nodes are just pointers to the actual elements.
I came across this explanation :
Only O(1) additional space is required because the heap is built inside the array to be sorted.
But I think this means the original array necessarily already had to be implemented as some sort of tree? If the original array was just a vector, it seems memory for a heap would still have to be allocated.