Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I don't have a clue why is this happening. I was messing with some lists, and I needed a for loop going from 0 to log(n, 2) where n was the length of a list. But the code was amazingly slow, so after a bit a research I found that the problem is in the range generation. Sample code for demonstration:

n = len([1,2,3,4,5,6,7,8])
k = 8
timeit('range(log(n, 2))', number=2, repeat=3) # Test 1
timeit('range(log(k, 2))', number=2, repeat=3) # Test 2

The output

2 loops, best of 3: 2.2 s per loop
2 loops, best of 3: 3.46 µs per loop

The number of tests is low (I didn't want this to be running more than 10 minutes), but it already shows that range(log(n, 2)) is orders of magnitude slower than the counterpart using just the logarithm of an integer. This is really surprising and I don't have any clue on why is this happening. Maybe is a problem on my PC, maybe a Sage problem or a Python bug (I didn't try the same on Python).

Using xrange instead of range doesn't help either. Also, if you get the number with .n(), test 1 runs at the same speed of 2.

Does anybody know what can be happening? Thanks!

share|improve this question
Sounds like a Sage (maybe cython?) problem. Python range doesn't even take floats. – Pavel Anossov Apr 29 '13 at 22:37
And Python also doesn't have log in the global namespace (and no way to get it there without adding a setup to timeit). And n isn't available to timeit either. And there's no repeat parameter on timeit (which I assume you got with from timeit import timeit). – abarnert Apr 29 '13 at 22:43
Doesn't your output rather display that the values your timeit returns are rather random? After all you tried the same thing twice (both n and k are 8), and got massively varying results. – Alfe Apr 29 '13 at 22:44
Did you actually precalculate n? – jamylak Apr 29 '13 at 22:46
"Also, if you get the number with .n()". Wait, what? Get what number, from where? AFAIK, Sage is built on top of ipython, and all of its "magic" syntax starts with % or !. – abarnert Apr 29 '13 at 22:48
up vote 12 down vote accepted

Good grief -- I recognize this one. It's related to one of mine, trac #12121. First, you get extra overhead from using a Python int as opposed to a Sage Integer for boring reasons:

sage: log(8, 2)
sage: type(log(8, 2))
sage: log(8r, 2)
sage: type(log(8r, 2))
sage: %timeit log(8, 2)
1000000 loops, best of 3: 1.4 us per loop
sage: %timeit log(8r, 2)
1000 loops, best of 3: 404 us per loop

(The r suffix means "raw", and prevents the Sage preparser from wrapping the literal 2 into Integer(2))

And then it gets weird. In order to produce an int for range to consume, Sage has to figure out how to turn log(8)/log(2) into 3, and it turns out that she does the worst thing possible. Plagiarizing my original diagnosis (mutatis mutandis):

First she checks to see if this object has its own way to get an int, and it doesn't. So she builds a RealInterval object out of log(8)/log(2), and it turns out that this is about the worst thing she could do! She checks to see whether the lower and upper parts of the interval agree [on the floor, I mean] (so that she knows for certain what the floor is). But in this case, because it really is an integer! this is always going to look like:

sage: y = log(8)/log(2)
sage: rif = RealIntervalField(53)(y)
sage: rif
sage: rif.endpoints()
(2.99999999999999, 3.00000000000001)

These two bounds have floors which aren't aren't equal, so Sage decides she hasn't solved the problem yet, and she keeps increasing the precision to 20000 bits to see if she can prove that they are.. but by construction it's never going to work. Finally she gives up and tries to simplify it, which succeeds:

sage: y.simplify_full()

Proof without words that it's a perverse property of the exactly divisible case:

sage: %timeit range(log(8r, 2))
1 loops, best of 3: 2.18 s per loop
sage: %timeit range(log(9r, 2))
1000 loops, best of 3: 766 us per loop
sage: %timeit range(log(15r, 2))
1000 loops, best of 3: 764 us per loop
sage: %timeit range(log(16r, 2))
1 loops, best of 3: 2.19 s per loop
share|improve this answer
Nice diagnosis... are you going to write a patch for it now? :) – kcrisman Apr 30 '13 at 0:42
Impressive and really well explained, thanks! – gjulianm Apr 30 '13 at 10:16

This looks like it's a Sage bug.

I created a new notebook and did this:

n = len([1,2,3,4,5,6,7,8])
k = 8
timeit('range(log(n, 2))', number=2, repeat=3) # Test 1
timeit('range(log(len([1,2,3,4,5,6,7,8]), 2))', number=2, repeat=3) # Test 1.5
timeit('range(log(k, 2))', number=2, repeat=3) # Test 2

Test 1.5 is just as slow as test 1. But if you break it down in any way—take off the range, or even add m=n+0 and use m instead of n, it drops down to microseconds.

So clearly, Sage is trying to do something complicated here while evaluating the expression, and getting confused.

To verify this, in plain old ipython:

n = len([1,2,3,4,5,6,7,8])
k = 8
%timeit 'range(log(n, 2))'
%timeit 'range(log(len([1,2,3,4,5,6,7,8]), 2))'
%timeit 'range(log(k, 2))'

They're all equally fast, as you'd expect.

So… what do you do about it?

Well, you may want to try to track down the Sage bug and file it upstream. But meanwhile, you probably want a workaround in your code.

As noted above, just doing m = n+0 and using m instead of n seems to speed it up. See if that works for you?

share|improve this answer
Yes, the workaround was as easy as computing the value of the logarithm with log(n, 2).n(). This converts the expression log(8)/log(2) to a number (3) thus speeding execution. – gjulianm Apr 30 '13 at 10:10

Python 2 allows range(some_float), but its deprecated and doesn't work in python 3.

The code sample doesn't give the output specified. But we can walk through it. First, timeit needs a full script, the import in the script calling timeit is not used:

>>> timeit('range(log(8,2))')
  Traceback (most recent call last):
  File "<stdin>", line 1, in <module>
  File "/usr/lib64/python2.6/", line 226, in timeit
    return Timer(stmt, setup, timer).timeit(number)
  File "/usr/lib64/python2.6/", line 192, in timeit
    timing = self.inner(it, self.timer)
  File "<timeit-src>", line 6, in inner
NameError: global name 'log' is not defined

If you add the import to the script being timed, it includes the setup time:

>>> timeit('from math import log;range(log(8,2))')

If you move the import to the setup, its better, but timing a one-shot is notoriously inaccurate:

>>> timeit('range(log(8,2))',setup='from math import log')

Finally, run it a bunch of times and you get a good number:

>>> timeit('range(log(8,2))',setup='from math import log',number=100)
share|improve this answer
It looks like the Sage notebook imports log into globals. (And the OP is already using number on his timeit.) – abarnert Apr 29 '13 at 22:52

Maybe using log(x, 2) (aka ld()) isn't a good idea in the first place. I'd propose to use shifting the int values to implement the ld():

n = len(array)
while n:
  n >>= 1
  # perform the loop stuff

This way you might avoid all these uglinesses with the range() and the log().

In normal situations calling log() should take more time than simple bit shifting on an int. Examples:

>>> timeit('for i in range(int(math.log(8, 2))): pass', setup='import math')
>>> timeit('n = 8\nwhile n:\n  n >>= 1')

With larger values for n the difference gets smaller. For n = 10000 I got 0.8163230419158936 and 0.8106038570404053, but that should be because then the loop body will take the majority of the time, compared to the loop initialization.

share|improve this answer
I'm willing to be that this writing a right loop around bit-shifting in Python will be significantly slower than calling log. But whether I'm right or wrong, you definitely shouldn't be asserting that it's faster without even attempting to test. – abarnert Apr 29 '13 at 22:49
Maybe you just shouldn't assume I didn't test. That bit shifting isn't slower than additions or other simple arithmetics in today's processors is part of my basic knowledge. But I added some test to prove my point. – Alfe Apr 29 '13 at 22:57
OK, so you timed apples and oranges, rather than not timing anything. The first version is not even remotely equivalent to the second, because it has an extra for i in range(…) loop that the other does not (which kills all of the advantage of not having a tight loop in Python). – abarnert Apr 29 '13 at 23:00
The other has the while loop as replacement, as my answer proposes. – Alfe Apr 29 '13 at 23:01
Try from math import log timings – jamylak Apr 29 '13 at 23:08

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.