I am learning about analysis of algorithms (python 2.7.6). I am reading a book (Problem solving with Algorithms and Data Structures) where Python is the language used for implementations. In Chapter 2, the author introduces algorithm analysis in a very clear and understandable way, and uses an anagram detection program as a template to compare different runtime implementations (quadratics, log linear, linear). In the linear, and most efficient implementation, the code is as follows (comments added by me):
def anagram_test2(s1,s2): """ Checks if two strings are anagrams of each other Runs with O(n) linear complexity """ if (not s1) or (not s2): raise TypeError, "Invalid input: input must be string" return None # Initialize two lists of counters c1 =  * 26 c2 =  * 26 # Iterate over each string # When a char is encountered, # increment the counter at # its correspoding position for i in range(len(s1)): pos = ord(s1[i]) - ord("a") c1[pos] += 1 for i in range(len(s2)): pos = ord(s2[i]) - ord("a") c2[pos] += 1 j = 0 hit = True while j < 26 and hit: if c1[j] == c2[j]: j += 1 else: hit = False return hit
My question is: Can the code block following the two for loops not be replaced by the simpler:
if c1 == c2: return True else: return False return
where no iteration is necessary (as opposed to using the while statement)? Is there some computational/programmatic reason for using the first method vs. the second? I ran this version on various string combinations and it works exactly the same.
And a more general question: The author kind of implies that nested iterations cause quadratic runtime whereas non-nested iterations cause linear/logarithmic/log linear runtime. Is there a distinct set of rules for determining an algorithm's runtime? For example, how does one distinguish between linear/log linear/logarithmic algorithms given a program without nested iterations? In the example immediately before the one I posted above, the author used a sort and compare implementation where there are no nested loops but admits that the sort method has its own cost, which is either log linear or quadratic.