ref: a7c01127f9749fe471367c6461cde357403cc3b3
dir: /sys/src/cmd/python/Doc/lib/libcollections.tex/
\section{\module{collections} --- High-performance container datatypes} \declaremodule{standard}{collections} \modulesynopsis{High-performance datatypes} \moduleauthor{Raymond Hettinger}{python@rcn.com} \sectionauthor{Raymond Hettinger}{python@rcn.com} \versionadded{2.4} This module implements high-performance container datatypes. Currently, there are two datatypes, deque and defaultdict. Future additions may include balanced trees and ordered dictionaries. \versionchanged[Added defaultdict]{2.5} \subsection{\class{deque} objects \label{deque-objects}} \begin{funcdesc}{deque}{\optional{iterable}} Returns a new deque object initialized left-to-right (using \method{append()}) with data from \var{iterable}. If \var{iterable} is not specified, the new deque is empty. Deques are a generalization of stacks and queues (the name is pronounced ``deck'' and is short for ``double-ended queue''). Deques support thread-safe, memory efficient appends and pops from either side of the deque with approximately the same \code{O(1)} performance in either direction. Though \class{list} objects support similar operations, they are optimized for fast fixed-length operations and incur \code{O(n)} memory movement costs for \samp{pop(0)} and \samp{insert(0, v)} operations which change both the size and position of the underlying data representation. \versionadded{2.4} \end{funcdesc} Deque objects support the following methods: \begin{methoddesc}{append}{x} Add \var{x} to the right side of the deque. \end{methoddesc} \begin{methoddesc}{appendleft}{x} Add \var{x} to the left side of the deque. \end{methoddesc} \begin{methoddesc}{clear}{} Remove all elements from the deque leaving it with length 0. \end{methoddesc} \begin{methoddesc}{extend}{iterable} Extend the right side of the deque by appending elements from the iterable argument. \end{methoddesc} \begin{methoddesc}{extendleft}{iterable} Extend the left side of the deque by appending elements from \var{iterable}. Note, the series of left appends results in reversing the order of elements in the iterable argument. \end{methoddesc} \begin{methoddesc}{pop}{} Remove and return an element from the right side of the deque. If no elements are present, raises an \exception{IndexError}. \end{methoddesc} \begin{methoddesc}{popleft}{} Remove and return an element from the left side of the deque. If no elements are present, raises an \exception{IndexError}. \end{methoddesc} \begin{methoddesc}{remove}{value} Removed the first occurrence of \var{value}. If not found, raises a \exception{ValueError}. \versionadded{2.5} \end{methoddesc} \begin{methoddesc}{rotate}{n} Rotate the deque \var{n} steps to the right. If \var{n} is negative, rotate to the left. Rotating one step to the right is equivalent to: \samp{d.appendleft(d.pop())}. \end{methoddesc} In addition to the above, deques support iteration, pickling, \samp{len(d)}, \samp{reversed(d)}, \samp{copy.copy(d)}, \samp{copy.deepcopy(d)}, membership testing with the \keyword{in} operator, and subscript references such as \samp{d[-1]}. Example: \begin{verbatim} >>> from collections import deque >>> d = deque('ghi') # make a new deque with three items >>> for elem in d: # iterate over the deque's elements ... print elem.upper() G H I >>> d.append('j') # add a new entry to the right side >>> d.appendleft('f') # add a new entry to the left side >>> d # show the representation of the deque deque(['f', 'g', 'h', 'i', 'j']) >>> d.pop() # return and remove the rightmost item 'j' >>> d.popleft() # return and remove the leftmost item 'f' >>> list(d) # list the contents of the deque ['g', 'h', 'i'] >>> d[0] # peek at leftmost item 'g' >>> d[-1] # peek at rightmost item 'i' >>> list(reversed(d)) # list the contents of a deque in reverse ['i', 'h', 'g'] >>> 'h' in d # search the deque True >>> d.extend('jkl') # add multiple elements at once >>> d deque(['g', 'h', 'i', 'j', 'k', 'l']) >>> d.rotate(1) # right rotation >>> d deque(['l', 'g', 'h', 'i', 'j', 'k']) >>> d.rotate(-1) # left rotation >>> d deque(['g', 'h', 'i', 'j', 'k', 'l']) >>> deque(reversed(d)) # make a new deque in reverse order deque(['l', 'k', 'j', 'i', 'h', 'g']) >>> d.clear() # empty the deque >>> d.pop() # cannot pop from an empty deque Traceback (most recent call last): File "<pyshell#6>", line 1, in -toplevel- d.pop() IndexError: pop from an empty deque >>> d.extendleft('abc') # extendleft() reverses the input order >>> d deque(['c', 'b', 'a']) \end{verbatim} \subsubsection{Recipes \label{deque-recipes}} This section shows various approaches to working with deques. The \method{rotate()} method provides a way to implement \class{deque} slicing and deletion. For example, a pure python implementation of \code{del d[n]} relies on the \method{rotate()} method to position elements to be popped: \begin{verbatim} def delete_nth(d, n): d.rotate(-n) d.popleft() d.rotate(n) \end{verbatim} To implement \class{deque} slicing, use a similar approach applying \method{rotate()} to bring a target element to the left side of the deque. Remove old entries with \method{popleft()}, add new entries with \method{extend()}, and then reverse the rotation. With minor variations on that approach, it is easy to implement Forth style stack manipulations such as \code{dup}, \code{drop}, \code{swap}, \code{over}, \code{pick}, \code{rot}, and \code{roll}. A roundrobin task server can be built from a \class{deque} using \method{popleft()} to select the current task and \method{append()} to add it back to the tasklist if the input stream is not exhausted: \begin{verbatim} def roundrobin(*iterables): pending = deque(iter(i) for i in iterables) while pending: task = pending.popleft() try: yield task.next() except StopIteration: continue pending.append(task) >>> for value in roundrobin('abc', 'd', 'efgh'): ... print value a d e b f c g h \end{verbatim} Multi-pass data reduction algorithms can be succinctly expressed and efficiently coded by extracting elements with multiple calls to \method{popleft()}, applying the reduction function, and calling \method{append()} to add the result back to the queue. For example, building a balanced binary tree of nested lists entails reducing two adjacent nodes into one by grouping them in a list: \begin{verbatim} def maketree(iterable): d = deque(iterable) while len(d) > 1: pair = [d.popleft(), d.popleft()] d.append(pair) return list(d) >>> print maketree('abcdefgh') [[[['a', 'b'], ['c', 'd']], [['e', 'f'], ['g', 'h']]]] \end{verbatim} \subsection{\class{defaultdict} objects \label{defaultdict-objects}} \begin{funcdesc}{defaultdict}{\optional{default_factory\optional{, ...}}} Returns a new dictionary-like object. \class{defaultdict} is a subclass of the builtin \class{dict} class. It overrides one method and adds one writable instance variable. The remaining functionality is the same as for the \class{dict} class and is not documented here. The first argument provides the initial value for the \member{default_factory} attribute; it defaults to \code{None}. All remaining arguments are treated the same as if they were passed to the \class{dict} constructor, including keyword arguments. \versionadded{2.5} \end{funcdesc} \class{defaultdict} objects support the following method in addition to the standard \class{dict} operations: \begin{methoddesc}{__missing__}{key} If the \member{default_factory} attribute is \code{None}, this raises an \exception{KeyError} exception with the \var{key} as argument. If \member{default_factory} is not \code{None}, it is called without arguments to provide a default value for the given \var{key}, this value is inserted in the dictionary for the \var{key}, and returned. If calling \member{default_factory} raises an exception this exception is propagated unchanged. This method is called by the \method{__getitem__} method of the \class{dict} class when the requested key is not found; whatever it returns or raises is then returned or raised by \method{__getitem__}. \end{methoddesc} \class{defaultdict} objects support the following instance variable: \begin{datadesc}{default_factory} This attribute is used by the \method{__missing__} method; it is initialized from the first argument to the constructor, if present, or to \code{None}, if absent. \end{datadesc} \subsubsection{\class{defaultdict} Examples \label{defaultdict-examples}} Using \class{list} as the \member{default_factory}, it is easy to group a sequence of key-value pairs into a dictionary of lists: \begin{verbatim} >>> s = [('yellow', 1), ('blue', 2), ('yellow', 3), ('blue', 4), ('red', 1)] >>> d = defaultdict(list) >>> for k, v in s: d[k].append(v) >>> d.items() [('blue', [2, 4]), ('red', [1]), ('yellow', [1, 3])] \end{verbatim} When each key is encountered for the first time, it is not already in the mapping; so an entry is automatically created using the \member{default_factory} function which returns an empty \class{list}. The \method{list.append()} operation then attaches the value to the new list. When keys are encountered again, the look-up proceeds normally (returning the list for that key) and the \method{list.append()} operation adds another value to the list. This technique is simpler and faster than an equivalent technique using \method{dict.setdefault()}: \begin{verbatim} >>> d = {} >>> for k, v in s: d.setdefault(k, []).append(v) >>> d.items() [('blue', [2, 4]), ('red', [1]), ('yellow', [1, 3])] \end{verbatim} Setting the \member{default_factory} to \class{int} makes the \class{defaultdict} useful for counting (like a bag or multiset in other languages): \begin{verbatim} >>> s = 'mississippi' >>> d = defaultdict(int) >>> for k in s: d[k] += 1 >>> d.items() [('i', 4), ('p', 2), ('s', 4), ('m', 1)] \end{verbatim} When a letter is first encountered, it is missing from the mapping, so the \member{default_factory} function calls \function{int()} to supply a default count of zero. The increment operation then builds up the count for each letter. The function \function{int()} which always returns zero is just a special case of constant functions. A faster and more flexible way to create constant functions is to use \function{itertools.repeat()} which can supply any constant value (not just zero): \begin{verbatim} >>> def constant_factory(value): ... return itertools.repeat(value).next >>> d = defaultdict(constant_factory('<missing>')) >>> d.update(name='John', action='ran') >>> '%(name)s %(action)s to %(object)s' % d 'John ran to <missing>' \end{verbatim} Setting the \member{default_factory} to \class{set} makes the \class{defaultdict} useful for building a dictionary of sets: \begin{verbatim} >>> s = [('red', 1), ('blue', 2), ('red', 3), ('blue', 4), ('red', 1), ('blue', 4)] >>> d = defaultdict(set) >>> for k, v in s: d[k].add(v) >>> d.items() [('blue', set([2, 4])), ('red', set([1, 3]))] \end{verbatim}