The dot product of two n-dimensional vectors `u=[u1,u2,...un]`

and `v=[v1,v2,...,vn]`

is is given by `u1*v1 + u2*v2 + ... + un*vn`

.

A question posted yesterday encouraged me to find the fastest way to compute dot products in Python using only the standard library, no third-party modules or C/Fortran/C++ calls.

I timed four different approaches; so far the fastest seems to be `sum(starmap(mul,izip(v1,v2)))`

(where `starmap`

and `izip`

come from the `itertools`

module).

For the code presented below, these are the elapsed times (in seconds, for one million runs):

```
d0: 12.01215
d1: 11.76151
d2: 12.54092
d3: 09.58523
```

Can you think of a faster way to do this?

```
import timeit # module with timing subroutines
import random # module to generate random numnbers
from itertools import imap,starmap,izip
from operator import mul
def v(N=50,min=-10,max=10):
"""Generates a random vector (in an array) of dimension N; the
values are integers in the range [min,max]."""
out = []
for k in range(N):
out.append(random.randint(min,max))
return out
def check(v1,v2):
if len(v1)!=len(v2):
raise ValueError,"the lenght of both arrays must be the same"
pass
def d0(v1,v2):
"""
d0 is Nominal approach:
multiply/add in a loop
"""
check(v1,v2)
out = 0
for k in range(len(v1)):
out += v1[k] * v2[k]
return out
def d1(v1,v2):
"""
d1 uses an imap (from itertools)
"""
check(v1,v2)
return sum(imap(mul,v1,v2))
def d2(v1,v2):
"""
d2 uses a conventional map
"""
check(v1,v2)
return sum(map(mul,v1,v2))
def d3(v1,v2):
"""
d3 uses a starmap (itertools) to apply the mul operator on an izipped (v1,v2)
"""
check(v1,v2)
return sum(starmap(mul,izip(v1,v2)))
# generate the test vectors
v1 = v()
v2 = v()
if __name__ == '__main__':
# Generate two test vectors of dimension N
t0 = timeit.Timer("d0(v1,v2)","from dot_product import d0,v1,v2")
t1 = timeit.Timer("d1(v1,v2)","from dot_product import d1,v1,v2")
t2 = timeit.Timer("d2(v1,v2)","from dot_product import d2,v1,v2")
t3 = timeit.Timer("d3(v1,v2)","from dot_product import d3,v1,v2")
print "d0 elapsed: ", t0.timeit()
print "d1 elapsed: ", t1.timeit()
print "d2 elapsed: ", t2.timeit()
print "d3 elapsed: ", t3.timeit()
```

Notice that the name of the file must be `dot_product.py`

for the script to run; I used Python 2.5.1 on a Mac OS X Version 10.5.8.

EDIT:

I ran the script for N=1000 and these are the results (in seconds, for one million runs):

```
d0: 205.35457
d1: 208.13006
d2: 230.07463
d3: 155.29670
```

I guess it is safe to assume that, indeed, option three is the fastest and option two the slowest (of the four presented).

main'. – unutbu Dec 1 '09 at 19:30