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Is it a linked list, an array? I searched around and only found people guessing. My C knowledge isn't good enough to look at the source code.

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google("python list implementation") ... the first 3 hits all authoritatively say that (in CPython) it's an array of pointers to objects. The second hit even has a diagram. –  John Machin Oct 12 '10 at 18:44
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@JohnMachin That is exactly what I just googled and this thread is now the first result. –  Brandon Yates Nov 14 '13 at 17:25
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7 Answers

up vote 18 down vote accepted

It's an array. Practical proof: Indexing takes (of course with extremely small differences (0.0013 µsecs!)) the same time regardless of index:

...>python -m timeit --setup="x = [None]*1000" "x[500]"
10000000 loops, best of 3: 0.0579 usec per loop

...>python -m timeit --setup="x = [None]*1000" "x[0]"
10000000 loops, best of 3: 0.0566 usec per loop

I would be astounded if IronPython or Jython used linked lists - they would ruin the performance of many many widely-used libraries built on the assumption that lists are arrays.

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@Ralf: I know my CPU (most other hardware too, for that matter) is old and dog slow - on the bright side, I can assume that code that runs fast enough for me is fast enough for all users :D –  delnan Oct 12 '10 at 19:58
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@delnan: Python almost always runs fast enough for all users –  Rafe Kettler Oct 12 '10 at 20:28
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@delnan: -1 Your "practical proof" is a nonsense, as are the 6 upvotes. About 98% of the time is taken up doing x=[None]*1000, leaving the measurement of any possible list access difference rather imprecise. You need to separate out the initialisation: -s "x=[None]*100" "x[0]" –  John Machin Oct 12 '10 at 20:44
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@John: Aaah yes, good catch... fixed and edited it (also now using len-1 (999) as first index). –  delnan Oct 12 '10 at 21:21
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Shows that it's not a naive implementation of a linked list. Doesn't definitively show that it's an array. –  Michael Mior Oct 14 '10 at 5:15
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The C code is pretty simple, actually. Expanding one macro and pruning some irrelevant comments, the basic structure is in listobject.h, which defines a list as:

typedef struct {
    PyObject_HEAD
    Py_ssize_t ob_size;

    /* Vector of pointers to list elements.  list[0] is ob_item[0], etc. */
    PyObject **ob_item;

    /* ob_item contains space for 'allocated' elements.  The number
     * currently in use is ob_size.
     * Invariants:
     *     0 <= ob_size <= allocated
     *     len(list) == ob_size
     *     ob_item == NULL implies ob_size == allocated == 0
     */
    Py_ssize_t allocated;
} PyListObject;

PyObject_HEAD contains a reference count and a type identifier. So, it's a vector/array that overallocates. The code for resizing such an array when it's full is in listobject.c. It doesn't actually double the array, but grows by allocating

new_allocated = (newsize >> 3) + (newsize < 9 ? 3 : 6);
new_allocated += newsize;

to the capacity each time, where newsize is the requested size (not necessarily allocated + 1 because you can extend by an arbitrary number of elements instead of append'ing them one by one).

See also the Python FAQ.

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Really useful. Thanks. –  santiagobasulto Sep 5 '11 at 15:13
    
So, when iterating over python lists it's as slow as linked lists, because every entry is just a pointer, so every element most likely would cause a cache miss. –  Kr0e Apr 10 at 15:24
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@Kr0e: not if subsequent elements are actually the same object :) But if you need smaller/cache-friendlier data structures, the array module or NumPy are to be preferred. –  larsmans Apr 11 at 8:55
    
@larsmans: True =) –  Kr0e Apr 11 at 10:04
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In CPython, lists are arrays of pointers. Other implementations of Python may choose to store them in different ways.

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This is implementation dependent, but IIRC:

  • CPython uses an array of pointers
  • Jython uses an ArrayList
  • IronPython apparently also uses an array. You can browse the source code to find out.

Thus they all have O(1) random access.

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Implementation dependent as in a python interpreter which implemented lists as linked lists would be a valid implementation of the python language? In other words: O(1) random access into lists is not guaranteed? Doesn't that make it impossible to write efficient code without relying on implementation details? –  sepp2k Oct 12 '10 at 18:02
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@sepp I believe lists in Python are just ordered collections; the implementation and/or performance requirements of said implementation are not explicitly stated –  NullUserException Oct 12 '10 at 18:05
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@sppe2k: Since Python doesn't really have a standard or formal specification (though there are some pieces of documentations that say "... is guaranteed to ..."), you can't be 100% sure as in "this is guaranteed by some piece of paper". But since O(1) for list indexing is a pretty common and valid assumption, no implementation would dare to break it. –  delnan Oct 12 '10 at 18:07
    
@Paul It says nothing about how the underlying implementation of lists should be done. –  NullUserException Oct 12 '10 at 21:40
    
It just doesn't happen to specify the big O running time of things. Language syntax specification doesn't necessarily mean the same thing as implementation details, it just happens to often be the case. –  Paul McMillan Oct 12 '10 at 21:40
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According to the documentation,

Python’s lists are really variable-length arrays, not Lisp-style linked lists.

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Nice writeup here on how they're implemented in C (array of pointers): http://www.laurentluce.com/posts/python-list-implementation/

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As others have stated above, the lists (when appreciably large) are implemented by allocating a fixed amount of space, and, if that space should fill, allocating a larger amount of space and copying over the elements.

To understand why the method is O(1) amortized, without loss of generality, assume we have inserted a = 2^n elements, and we now have to double our table to 2^(n+1) size. That means we're currently doing 2^(n+1) operations. Last copy, we did 2^n operations. Before that we did 2^(n-1)... all the way down to 8,4,2,1. Now, if we add these up, we get 1 + 2 + 4 + 8 + ... + 2^(n+1) = 2^(n+2) - 1 < 4*2^n = O(2^n) = O(a) total insertions (i.e. O(1) amortized time). Also, it should be noted that if the table allows deletions the table shrinking has to be done at a different factor (e.g 3x)

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