# Implementation of locality-sensitive hashing with min-hash

I have read a lot of tutorials, documents, and pieces of code implementing LSH (locality-sensitive hashing) with min-hash.

LSH tries to find the Jaccard coefficient of two sets by hashing random subsets and aggregating over those. I have looked at implementations in code.google.com but was not able to understand their method as well. I understand the paper Google news personalization: scalable online collaborative filtering, but I fail to understand any of the implementations out there.

Can someone please explain me in simple words how to implement LSH with MinHash?

You want to implement the min-hash algorithm but not LSH per se. Min-hashing is an LSH technique. Thus, LSH, in general, does not approximate the Jaccard coefficient, the particular method of min-hashing does.

An introduction is given in Mining of Massive Datasets, Chapter 3 by Anand Rajaraman and Jeff Ullman.

The min-hash representation of a set is an efficient means of estimating the Jaccard similarity, given as the relative number of shared hashes between the two min hash sets:

``````import random

def minhash():
d1 = set(random.randint(0, 2000) for _ in range(1000))
d2 = set(random.randint(0, 2000) for _ in range(1000))
jacc_sim = len(d1.intersection(d2)) / len(d1.union(d2))
print("jaccard similarity: {}".format(jacc_sim))

N_HASHES = 200
hash_funcs = []
for i in range(N_HASHES):
hash_funcs.append(universal_hashing())

m1 = [min([h(e) for e in d1]) for h in hash_funcs]
m2 = [min([h(e) for e in d2]) for h in hash_funcs]
minhash_sim = sum(int(m1[i] == m2[i]) for i in range(N_HASHES)) / N_HASHES
print("min-hash similarity: {}".format(minhash_sim))

def universal_hashing():
def rand_prime():
while True:
p = random.randrange(2 ** 32, 2 ** 34, 2)
if all(p % n != 0 for n in range(3, int((p ** 0.5) + 1), 2)):
return p
m = 2 ** 32 - 1
p = rand_prime()
a = random.randint(0, p)
if a % 2 == 0:
a += 1
b = random.randint(0, p)
def h(x):
return ((a * x + b) % p) % m
return h

if __name__ == "__main__":
minhash()
``````