Consider an array with
n numbers that has maximum
k digits (See Edit). Consider the radix sort program from here:
def radixsort( aList ): RADIX = 10 maxLength = False tmp, placement = -1, 1 while not maxLength: maxLength = True # declare and initialize buckets buckets = [list() for _ in range( RADIX )] # split aList between lists for i in aList: tmp = i / placement buckets[tmp % RADIX].append( i ) if maxLength and tmp > 0: maxLength = False # empty lists into aList array a = 0 for b in range( RADIX ): buck = buckets[b] for i in buck: aList[a] = i a += 1 # move to next digit placement *= RADIX
buckets basically is a 2d list of all the numbers. However, only
n values will be added to it. How come the space complexity is O(k + n) and not O(n)? Correct me if I am wrong, even if we consider the space used to extract digits in a particular place, it is only using 1 (constant) memory space?
Edit: I would like to explain my understanding of
k. Suppose I give an input of
[12, 13, 65, 32, 789, 1, 3], the algorithm given in the link would go through 4 passes (of first
while loop inside the function). Here
k = 4, i.e. maximum no. of digits for any element in the array + 1. Thus k is no. of passes. This is the same
k involved in time complexity of this algorithm:
O(kn) which makes sense. I am not able to understand how it plays a role in space complexity:
O(k + n).