Doc/lib/libcollections.tex - platform/external/python/cpython2 - Gitiles

 \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 objected 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. This technique makes counting simpler and faster than an equivalent
 technique using \method{dict.get()}:

 \begin{verbatim}
 >>> d = {}
 >>> for k in s:
 	d[k] = d.get(k, 0) + 1

 >>> d.items()
 [('i', 4), ('p', 2), ('s', 4), ('m', 1)]
 \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}
	\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 objected 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. This technique makes counting simpler and faster than an equivalent
	technique using \method{dict.get()}:

	\begin{verbatim}
	>>> d = {}
	>>> for k in s:
	d[k] = d.get(k, 0) + 1

	>>> d.items()
	[('i', 4), ('p', 2), ('s', 4), ('m', 1)]
	\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}