I’m comparing the performance of sort vs a custom hash function for strings of varying length and the results are a bit surprising. I expected the function prime_hash (and especially prime_hash2) in the following code to outperform sort_hash although the opposite is true. Can anyone explain the perf difference? Can anyone offer an alternate hash? [The function should produce identical values for strings containing the same distribution of letters and different values for all other strings].
Here are the results I’m getting:
For strings of max length: 10
sort_hash: Time in seconds: 3.62555098534
prime_hash: Time in seconds: 5.5846118927
prime_hash2: Time in seconds: 4.14513611794
For strings of max length: 20
sort_hash: Time in seconds: 4.51260590553
prime_hash: Time in seconds: 8.87842392921
prime_hash2: Time in seconds: 5.74179887772
For strings of max length: 30
sort_hash: Time in seconds: 5.41446709633
prime_hash: Time in seconds: 11.4799649715
prime_hash2: Time in seconds: 7.58586287498
For strings of max length: 40
sort_hash: Time in seconds: 6.42467713356
prime_hash: Time in seconds: 14.397785902
prime_hash2: Time in seconds: 9.58741497993
For strings of max length: 50
sort_hash: Time in seconds: 7.25647807121
prime_hash: Time in seconds: 17.0482890606
prime_hash2: Time in seconds: 11.3653149605
And here is the code:
#!/usr/bin/env python
from time import time
import random
import string
from itertools import groupby
def prime(i, primes):
for prime in primes:
if not (i == prime or i % prime):
return False
primes.add(i)
return i
def historic(n):
primes = set([2])
i, p = 2, 0
while True:
if prime(i, primes):
p += 1
if p == n:
return primes
i += 1
primes = list(historic(26))
def generate_strings(num, max_len):
gen_string = lambda i: ''.join(random.choice(string.lowercase) for x in xrange(i))
return [gen_string(random.randrange(3, max_len)) for i in xrange(num)]
def sort_hash(s):
return ''.join(sorted(s))
def prime_hash(s):
return reduce(lambda x, y: x * y, [primes[ord(c) - ord('a')] for c in s])
def prime_hash2(s):
res = 1
for c in s:
res = res * primes[ord(c) - ord('a')]
return res
def dotime(func, inputs):
start = time()
groupby(sorted([func(s) for s in inputs]))
print '%s: Time in seconds: %s' % (func.__name__, str(time() - start))
def dotimes(inputs):
print 'For strings of max length: %s' % max([len(s) for s in inputs])
dotime(sort_hash, inputs)
dotime(prime_hash, inputs)
dotime(prime_hash2, inputs)
if __name__ == '__main__':
dotimes(generate_strings(1000000, 11))
dotimes(generate_strings(1000000, 21))
dotimes(generate_strings(1000000, 31))
dotimes(generate_strings(1000000, 41))
dotimes(generate_strings(1000000, 51))
Based on the input from BoppreH, I was able to get a version of the arithmetic-based hash which outperforms even the C-implemented ‘sorted’-based version: