forked from SigmaQuan/Better-Python-59-Ways
-
Notifications
You must be signed in to change notification settings - Fork 0
/
item_46_use_built_in_algorithm.py
234 lines (183 loc) · 7.72 KB
/
item_46_use_built_in_algorithm.py
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
53
54
55
56
57
58
59
60
61
62
63
64
65
66
67
68
69
70
71
72
73
74
75
76
77
78
79
80
81
82
83
84
85
86
87
88
89
90
91
92
93
94
95
96
97
98
99
100
101
102
103
104
105
106
107
108
109
110
111
112
113
114
115
116
117
118
119
120
121
122
123
124
125
126
127
128
129
130
131
132
133
134
135
136
137
138
139
140
141
142
143
144
145
146
147
148
149
150
151
152
153
154
155
156
157
158
159
160
161
162
163
164
165
166
167
168
169
170
171
172
173
174
175
176
177
178
179
180
181
182
183
184
185
186
187
188
189
190
191
192
193
194
195
196
197
198
199
200
201
202
203
204
205
206
207
208
209
210
211
212
213
214
215
216
217
218
219
220
221
222
223
224
225
226
227
228
229
230
231
232
233
234
# Item 46: Use built-in algorithms and data structures
from collections import deque
import random
from collections import OrderedDict
from collections import defaultdict
from heapq import heappush
from heapq import heappop
from heapq import nsmallest
from bisect import bisect_left
# When you're implementing Python programs that handle a non-trivial amount of
# data, you'll eventually see slowdowns caused by the algorithmic complexity
# of your code. This usually isn't the result of Python's speed as a language
# (see Item 41: "Consider concurrent.futures for true parallelism" if it is).
# The issue, more likely, is that you are not using the best algorithms and
# data structures for your problem.
# Luckily, the Python standard library has many of the algorithms and data
# structures you'll need to use built in. Besides speed, using these common
# algorithms and data structures can make your life easier. Some of the most
# valuable tools you may want to use are tricky to implement correctly.
# Avoiding reimplementation of common functionality will save you time and
# headaches.
# Double-ended Queue
# The deque class from the collections module is a double-ended queue. It
# provides constant time operations for inserting or removing items from its
# beginning or end. This makes it ideal fro first-in-first-out (FIFO) queues.
fifo = deque()
fifo.append(1) # Producer
fifo.append(2) # Producer
fifo.append(3) # Producer
fifo.append(5) # Producer
print(fifo)
x = fifo.popleft() # Consumer
y = fifo.pop() # Consumer
print(x)
print(y)
print(fifo)
# deque([1, 2, 3, 5])
# 1
# 5
# deque([2, 3])
# The list built-in type also contains an ordered sequence of items like a
# queue. You can insert or remove items from the end of a list in constant
# time. But inserting or removing items from the head of a list takes linear
# time, which is much slower than the constant time of a deque.
# Ordered Dictionary
# Standard dictionaries are unordered. That means a dict with the same keys
# and values can result in different orders of iteration. This behavior is a
# surprising byproduct of the way the dictionary's fast hash table is
# implemented.
a = {}
a['foo'] = 1
a['bar'] = 2
print(a)
# {'foo': 1, 'bar': 2}
# Randomly populate 'b' to cause hash conflicts
while True:
z = random.randint(99, 1013)
b = {}
for i in range(z):
b[i] = i
b['foo'] = 1
b['bar'] = 2
for i in range(z):
del b[i]
if str(b) != str(a):
break
print(a)
print(b)
print('Equal?', a == b)
# {'foo': 1, 'bar': 2}
# {'bar': 2, 'foo': 1}
# Equal? True
# The OrderedDict class from the collections module is a special type of
# dictionary that keeps track of the order in which its keys were inserted.
# Iterating the keys of an OrderedDict has predictable behavior. This can
# vastly simplify testing and debugging by making all code deterministic.
a = OrderedDict()
a['foo'] = 1
a['bar'] = 2
b = OrderedDict()
b['foo'] = 'red'
b['bar'] = 'blue'
for value1, value2 in zip(a.values(), b.values()):
print(value1, value2)
# 1 red
# 2 blue
# Default Dictionary
# Dictionaries are useful for bookkeeping and tracking statistics. One problem
# with dictionaries is that you can't assume any keys are already present.
# That makes it clumsy to do simple things like increment a counter stored in a
# dictionary.
stats = {}
key = 'my_computer'
if key not in stats:
stats[key] = 0
stats[key] += 1
# The defaultdict class from the collections module simplifies this by
# automatically storing a default value when a key doesn't exist. All you have
# to do is provide a function that will return the default value each time a
# key is missing. In this example, the int built-in function returns 0 (see
# Item 23: "Accept functions for simple interfaces instead of classes" for
# another example). Now, incrementing a counter is simple.
stats = defaultdict(int)
stats['my_counter'] += 1
# Heap Queue
# Heaps are useful data structures for maintaining a priority queue. The heapq
# module provides functions for creating heaps in standard list types with
# functions like heappush, heappop, and nsmallest.
# Items of any priority can be inserted into the heap in any other.
a = []
heappush(a, 5)
heappush(a, 3)
heappush(a, 7)
heappush(a, 4)
# Items are always by highest priority (lowest number) first.
print(heappop(a), heappop(a), heappop(a), heappop(a))
# 3 4 5 7
# The result list is easy to use outside of heapq. Accessing the 0 index of
# the heap will always return the smallest item.
a = []
heappush(a, 5)
heappush(a, 3)
heappush(a, 7)
heappush(a, 4)
assert a[0] == nsmallest(1, a)[0] == 3
# Calling the sort method on the list maintains the heap invariant.
print('Before:', a)
a.sort()
print('After: ', a)
# Before: [3, 4, 7, 5]
# After: [3, 4, 5, 7]
# Each of these heapq operations takes logarithmic time in proportion to the
# length of the list. Doing the same work with a standard Python list would
# scale linearly.
# Bisection
# Searching for an item in a list takes linear time proportional to its length
# when you call the index method.
x = list(range(10**6))
i = x.index(991234)
# The bisect module's functions, such as bisect_left, provide an efficient
# binary search through a sequence of sorted items. The index it returns is
# the insertion point of the value into the sequence.
i = bisect_left(x, 991234)
# The complexity of a binary search is logarithmic. That means using bisect to
# search a list of 1 million items takes roughly the same amount of time as
# using index to linearly search a list of 14 items. It's way faster!
# Iterator Tools
# The itertools built-in module contains a large number of functions that are
# useful for organizing and interacting with iterators (see Item 16:
# "Consider generator instead of returning lists" and Item 17: "Be defensive
# when iterating over arguments" for background). Not all these are available
# in Python 2, but they can easily be built using simple recipes documented in
# the module. See help(itertools) in an interactive Python session for more
# details
# The itertools functions fall into three main categories:
# 1. Linking iterations together
# a. chain: combines multiple iterators into a single sequential iterator.
# b. cycle: repeats an iterator's items forever.
# c. tree: splits a single iterator into multiple parallel iterators.
# d. zip_longest: a variant of the zip built-in function that works well
# with iterators of different lengths.
# 2. Filtering items from an iterator
# a. islice: slices an iterator by numerical indexes without copying.
# b. takewhile: returns items from an iterator while a predicate function
# returns True.
# c. dropwhile: returns all items from an iterator once the predicate
# function returns False for the first time.
# d. filterfalse: returns all items from an iterator where a predicate
# function return False. The opposite of the filter built-in function.
# 3. Combinations of items from iterators
# a. product: returns the Cartesian product of items from an iterator,
# which is a nice alternative to deeply nested list comprehensions.
# b. permutations: returns ordered permutations of length N with items
# from an iterator.
# c. combination: returns the unordered combinations of length N with
# unrepeated items from an iterator.
# These are even more functions and recipes available in the itertools module
# that I don't mention here. Whenever you find yourself dealing with some
# tricky iteration code, it's worth looking at the itertools documentation
# again to see whether there's anything there for you to see.
# Things to remember
# 1. Use Python's built-in modules for algorithms and data structures.
# 2. Don't re-implement this functionality yourself. It's hard to get right.