# How to determine ranking algorithm criteria

I'm trying to determine if there is a better algorithm available for the below problem set instead of the brute force method that I've come up with. Given that the initial loop is n**n, this falls over very quickly.

The gist of the algorithm is that I have a set of rankings and data associated with the ranked items. From this I need to determine what criteria was used to come up with the ranking order. For instance, if the ranking is Ben, Sam, and then Hal, then the criteria used would be GPA.

criteria = ['Height', 'Weight', 'GPA']

candidates = {'Ben': (72,205,4.0),'Sam': (65,220,3.8),'Hal': (74,210,3.6)}

def base10toN(num, base):
converted_string, modstring = "", ""
currentnum = num
while currentnum:
mod = currentnum % base
currentnum = currentnum // base
converted_string = chr(48 + mod + 7*(mod > 10)) + converted_string
return converted_string

def get_relevant_criteria(criteria, candidates, ranking):
l = len(criteria)

max_score = 0
max_criteria = ()

for x in xrange(1,l**l):
pattern = str(base10toN(x,l)).rjust(3,'0')

prev_score = 0
isvalid = True

for candidate in ranking[::-1]:
new_score = score_criteria(pattern, candidates[candidate])
if new_score < prev_score:
isvalid = False
break
prev_score = new_score
if isvalid:
return [criteria[x] + " (x"+pattern[x]+")" for x in xrange(0,len(pattern)) if pattern[x] != '0']
return None

def score_criteria(pattern, values):
score = 0
for x in xrange(0,len(pattern)):
score += int(pattern[x]) * values[x]
return score

print get_relevant_criteria(criteria, candidates, ('Ben', 'Sam', 'Hal')) # GPA
print get_relevant_criteria(criteria, candidates, ('Sam', 'Hal', 'Ben')) # Weight
print get_relevant_criteria(criteria, candidates, ('Hal', 'Ben', 'Sam')) # Height
-
What if Ben has the highest GPA, is the tallest and the heaviest, while Sam has the lowest GPA, is the shortest, and the lightest. There would be no way to tell what was used to rank them. –  Eric J. May 24 '12 at 18:53
I have a much more robust application that I've written that accounts for these details, but wanted to keep the spirit of the question as simple as possible. The main question being, to score accurately, do I really have to evaluate every single combination in the n**n? –  Benjamin Powers May 24 '12 at 18:55

You have the ranking so it should be easy to do this in a linear manner, use a dictionary with the person names as the keys and the data as the value. Walk through the sorted order you are given and for each item in the data just remember what the last person's value was for that and check if the current value of that parameter is greater (or smaller if it is reverse sort). Once you hit one where it is not you can eliminate that attribute. This will also get you the correct answer when multiple properties could have been used.

criteria = ['Height', 'Weight', 'GPA']
def get_relevant_criteria(criteria, candidates, ranking):
possible  = [1] * len(criteria)
previous  = [0] * len(criteria)
direction = [0] * len(criteria)
for name in ranking:
for (index, parameter) in enumerate(candidates[name]):
if parameter < previous[index]:
if direction[index] == 0:
direction[index] = -1
if direction[index] == 1:
possible[index] = 0
if parameter > previous[index]:
if direction[index] == 0:
direction[index] = 1
if direction[index] == -1:
possible[index] = 0
previous = candidates[name]
for i in range(len(criteria)):
if possible[i] == 1:

candidates = {'Ben': (72,205,4.0),'Sam': (65,220,3.8),'Hal': (74,210,3.6)}
print order_criteria(criteria, candidates, ('Ben', 'Sam', 'Hal')) # GPA
print order_criteria(criteria, candidates, ('Sam', 'Hal', 'Ben')) # Weight
print order_criteria(criteria, candidates, ('Hal', 'Ben', 'Sam')) # Height

candidates2 = {'Ben': (72,100,1.0), 'Sam': (72,90,2.0), 'Hal': (64,200,4.0)}
print order_criteria(criteria, candidates2, ('Ben', 'Sam', 'Hal')) # Height GPA
print order_criteria(criteria, candidates2, ('Sam', 'Hal', 'Ben')) #
print order_criteria(criteria, candidates2, ('Hal', 'Ben', 'Sam')) # Weight

Note that while you may have to touch every element of data at least once in the worst case, it scales linearly in the number of people and scales linearly with the number of parameters (it is basically the number of people times the number of parameters)... no data is touched more than once.

I modified it so that it doesn't have to know ahead of time which order the sorting was (ASC or DESC). Notice how it handles when multiple parameters could have been the sorting property and when none of them would work.

-
I think that this should hold true as long as there is a clear single criteria. The going through all of the scoring opportunities is needed for situations like the following: Ben (72,100,1.0) Sam (72,90,2.0) Hal (64,200,4.0) If the ranking is Ben,Sam, and Hal, there's not a clear cut single criteria. Since Hal is clearly winning on weight and GPA, but is last in the ranking, then Height is the most important criteria. Moving from there, because Ben is higher on weight than Sam, then weight would be the next criteria. So a pattern that would work would be: (2,1,0) –  Benjamin Powers May 24 '12 at 19:13
good only if the ranking was guaranteed to be in ascending order whitch is not true even in OP's example (even your example would be without result) –  deathApril May 24 '12 at 19:17
well if you wanted descending you could just reverse the check condition... or are you saying that in advance you don't know whether asc or desc sort was used so you have to find that too? It could be done in this manner but it would be a bit more complicated –  hackartist May 24 '12 at 19:19
Yes, order is something to consider, but shouldn't be enough to change the higher level thought on the question. Specifically, given a ranking and a set of data points, if the task is to determine relevant criteria, do I really have to evaluate n**n times? –  Benjamin Powers May 24 '12 at 19:23
so what is n? if n is the number of people then no, what I gave is linear. You will have to touch every element of data in the matrix for some ordering but this is still linear with the amount of data. –  hackartist May 24 '12 at 19:27
show 1 more comment