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I need to get the lesser n numbers of a list in Python. I need this to be really fast because it's in a critical part for performance and it needs to be repeated a lot of times.

n is usually no greater than 10 and the list usually has around 20000 elements. The list is always different each time I call the function. Sorting can't be made in place.

Initially, I have written this function:

def mins(items, n):
    mins = [float('inf')]*n
    for item in items:
        for i, min in enumerate(mins):
	        if item < min:
		        mins.insert(i, item)
    return mins

But this function can't beat a simple sorted(items)[:n] which sort the entire list. Here is my test:

from random import randint, random
import time

test_data = [randint(10, 50) + random() for i in range(20000)]

init = time.time()
mins = mins(test_data, 8)
print 'mins(items, n):', time.time() - init

init = time.time()
mins = sorted(test_data)[:8]
print 'sorted(items)[:n]:', time.time() - init


mins(items, n): 0.0632939338684
sorted(items)[:n]: 0.0231449604034

sorted()[:n] is three times faster. I believe this is because:

  1. insert() operation is costly because Python lists are not linked lists.
  2. sorted() is an optimized c function and mine is pure python.

Is there any way to beat sorted()[:n] ? Should I use a C extension, or Pyrex or Psyco or something like that?

Thanks in advance for your answers.

share|improve this question
up vote 13 down vote accepted

You actually want a sorted sequence of mins.

mins = items[:n]
for i in items[n:]:
    if i < mins[-1]: 
        mins= mins[:n]

This runs much faster because you aren't even looking at mins unless it's provably got a value larger than the given item. About 1/10th the time of the original algorithm.

This ran in zero time on my Dell. I had to run it 10 times to get a measurable run time.

mins(items, n): 0.297000169754
sorted(items)[:n]: 0.109999895096
mins2(items)[:n]: 0.0309998989105

Using bisect.insort instead of append and sort may speed this up a hair further.

share|improve this answer
This is super fast! – Manuel Ceron Dec 8 '08 at 19:53
A heap would be better; no need to fully sort the whole list for each insert, just a cheaper reheap. – erickson Dec 8 '08 at 19:54
@erickson: Just edited to add that bisect.insort may have the same effect. – S.Lott Dec 8 '08 at 19:55
You're right. using bisect speeds up the algorithm. It's the fastest at the moment. And it's pure python. – Manuel Ceron Dec 8 '08 at 20:03
Cool; sorry I don't know python but I figured it would have something along these lines. – erickson Dec 8 '08 at 20:04
import heapq

nlesser_items = heapq.nsmallest(n, items)

Here's a correct version of S.Lott's algorithm:

from bisect    import insort
from itertools import islice

def nsmallest_slott_bisect(n, iterable, insort=insort):
    it   = iter(iterable)
    mins = sorted(islice(it, n))
    for el in it:
        if el <= mins[-1]: #NOTE: equal sign is to preserve duplicates
            insort(mins, el)

    return mins


$ python -mtimeit -s "import marshal; from nsmallest import nsmallest$label as nsmallest; items = marshal.load(open('items.marshal','rb')); n = 10"\
 "nsmallest(n, items)"
100 loops, best of 3: 12.9 msec per loop
100 loops, best of 3: 4.37 msec per loop
100 loops, best of 3: 3.95 msec per loop

nsmallest_slott_bisect is 3 times faster than heapq's nsmallest (for n=10, len(items)=20000). nsmallest_slott_list is only marginally slower. It is unclear why heapq's nsmallest is so slow; its algorithm is almost identical to the presented above (for small n).

share|improve this answer
Yes, this is the faster one. Thanks for the corrections. And thanks S.Lott too. This answer is the new chosen one :) – Manuel Ceron Dec 8 '08 at 21:48
@Manuel: I think the main credit should go to S.Lott and his answer should be accepted when he corrects his version (it is still incorrect at the time of this comment). – J.F. Sebastian Dec 8 '08 at 22:19
I agree. I'm going to give him back the selection when he updates the algorithm – Manuel Ceron Dec 8 '08 at 22:45

I like erickson's heap idea. I don't know Python either, but there appears to be a canned solution here: heapq — Heap queue algorithm

share|improve this answer
have tried heapq.nsmallest, but even when is a bit faster that sorted(items)[:n] is not faster than S.Lott's algorithm – Manuel Ceron Dec 8 '08 at 20:08

A possibility is to use the bisect module:

import bisect

def mins(items, n):
    mins = [float('inf')]*n
    for item in items:
        bisect.insort(mins, item)
    return mins

However, it's just a bit faster for me:

mins(items, n): 0.0892250537872
sorted(items)[:n]: 0.0990262031555

Using psyco does speed it up a bit more:

import bisect
import psyco

def mins(items, n):
    mins = [float('inf')]*n
    for item in items:
        bisect.insort(mins, item)
    return mins


mins(items, n): 0.0431621074677
sorted(items)[:n]: 0.0859830379486
share|improve this answer

If speed is of utmost concern, the fastest method is going to be with c. Psyco has an upfront cost, but may prove to be pretty fast. I would recommend Cython for python -> c compilation (a more up to date for pf Pyrex).

Hand coding it in c would be the best, and allow you to use data structures specific to your problem domain.

But note:

"Compiling the wrong algorithm in C may not be any faster than the right algorithm in Python" @S.Lott

I wanted to add S.Lott's comment so it gets noticed. Python make an excellent prototype language, where you can iron out an algorithm that you intend to later translate to a lower level language.

share|improve this answer
Compiling the wrong algorithm in C may not be any faster than the right algorithm in Python. – S.Lott Dec 8 '08 at 19:47
@S.Lott, I absolutely agree :) - Since you had a better algorithm, all I could do was to offer up a language alternative, (plus I wanted to mention Cython, as opposed to Pyrex) – JimB Dec 8 '08 at 20:02

why not just call the select_n_th element in O(N) time and then divide the array into two parts by the n_th element, this should be the fastest one.

ps: This O(N) algorithm works if you don't specify the order of the n-smallest elements The link below seems to do the selection algorithm.

Assuming the array doesn't have duplicate elements, the code works for me. The efficiency still depends on the problem scale, if n<10, probably an O(logn*N) algorithm is enough.

import random
import numpy as np
def select(data, n):
    "Find the nth rank ordered element (the least value has rank 0)."
    data = list(data)
    if not 0 <= n < len(data):
        raise ValueError('not enough elements for the given rank')
    while True:
        pivot = random.choice(data)
        pcount = 0
        under, over = [], []
        uappend, oappend = under.append, over.append
        for elem in data:
            if elem < pivot:
            elif elem > pivot:
                pcount += 1
        if n < len(under):
            data = under
        elif n < len(under) + pcount:
            return pivot
            data = over
            n -= len(under) + pcount

def n_lesser(data,n):
    data_nth = select(data,n)
    ind = np.where(data<data_nth)
    return data[ind]
share|improve this answer
Is this a comment or an answer? – Radical Fanatic Mar 12 '14 at 16:20
Can you improve your answer? Given the fact, it's about an algo, it is recommended to at least show a basic pseudo code. – bonCodigo Mar 12 '14 at 16:21
I am new to stack overflow editor, here now I attach the code – qdpercy Mar 12 '14 at 21:35

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