зеркало из https://github.com/mozilla/gecko-dev.git
485 строки
15 KiB
Python
485 строки
15 KiB
Python
#!/usr/bin/env python
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# Copyright 2014 The Chromium Authors. All rights reserved.
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# Use of this source code is governed by a BSD-style license that can be
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# found in the LICENSE file.
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"""
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A Deterministic acyclic finite state automaton (DAFSA) is a compact
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representation of an unordered word list (dictionary).
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http://en.wikipedia.org/wiki/Deterministic_acyclic_finite_state_automaton
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This python program converts a list of strings to a byte array in C++.
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This python program fetches strings and return values from a gperf file
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and generates a C++ file with a byte array representing graph that can be
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used as a memory efficient replacement for the perfect hash table.
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The input strings are assumed to consist of printable 7-bit ASCII characters
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and the return values are assumed to be one digit integers.
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In this program a DAFSA is a diamond shaped graph starting at a common
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source node and ending at a common sink node. All internal nodes contain
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a label and each word is represented by the labels in one path from
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the source node to the sink node.
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The following python represention is used for nodes:
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Source node: [ children ]
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Internal node: (label, [ children ])
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Sink node: None
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The graph is first compressed by prefixes like a trie. In the next step
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suffixes are compressed so that the graph gets diamond shaped. Finally
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one to one linked nodes are replaced by nodes with the labels joined.
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The order of the operations is crucial since lookups will be performed
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starting from the source with no backtracking. Thus a node must have at
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most one child with a label starting by the same character. The output
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is also arranged so that all jumps are to increasing addresses, thus forward
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in memory.
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The generated output has suffix free decoding so that the sign of leading
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bits in a link (a reference to a child node) indicate if it has a size of one,
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two or three bytes and if it is the last outgoing link from the actual node.
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A node label is terminated by a byte with the leading bit set.
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The generated byte array can described by the following BNF:
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<byte> ::= < 8-bit value in range [0x00-0xFF] >
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<char> ::= < printable 7-bit ASCII character, byte in range [0x20-0x7F] >
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<end_char> ::= < char + 0x80, byte in range [0xA0-0xFF] >
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<return value> ::= < value + 0x80, byte in range [0x80-0x8F] >
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<offset1> ::= < byte in range [0x00-0x3F] >
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<offset2> ::= < byte in range [0x40-0x5F] >
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<offset3> ::= < byte in range [0x60-0x7F] >
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<end_offset1> ::= < byte in range [0x80-0xBF] >
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<end_offset2> ::= < byte in range [0xC0-0xDF] >
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<end_offset3> ::= < byte in range [0xE0-0xFF] >
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<prefix> ::= <char>
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<label> ::= <end_char>
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| <char> <label>
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<end_label> ::= <return_value>
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| <char> <end_label>
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<offset> ::= <offset1>
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| <offset2> <byte>
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| <offset3> <byte> <byte>
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<end_offset> ::= <end_offset1>
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| <end_offset2> <byte>
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| <end_offset3> <byte> <byte>
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<offsets> ::= <end_offset>
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| <offset> <offsets>
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<source> ::= <offsets>
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<node> ::= <label> <offsets>
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| <prefix> <node>
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| <end_label>
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<dafsa> ::= <source>
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| <dafsa> <node>
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Decoding:
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<char> -> printable 7-bit ASCII character
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<end_char> & 0x7F -> printable 7-bit ASCII character
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<return value> & 0x0F -> integer
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<offset1 & 0x3F> -> integer
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((<offset2> & 0x1F>) << 8) + <byte> -> integer
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((<offset3> & 0x1F>) << 16) + (<byte> << 8) + <byte> -> integer
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end_offset1, end_offset2 and and_offset3 are decoded same as offset1,
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offset2 and offset3 respectively.
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The first offset in a list of offsets is the distance in bytes between the
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offset itself and the first child node. Subsequent offsets are the distance
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between previous child node and next child node. Thus each offset links a node
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to a child node. The distance is always counted between start addresses, i.e.
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first byte in decoded offset or first byte in child node.
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Example 1:
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%%
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aa, 1
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a, 2
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%%
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The input is first parsed to a list of words:
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["aa1", "a2"]
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A fully expanded graph is created from the words:
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source = [node1, node4]
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node1 = ("a", [node2])
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node2 = ("a", [node3])
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node3 = ("\x01", [sink])
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node4 = ("a", [node5])
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node5 = ("\x02", [sink])
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sink = None
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Compression results in the following graph:
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source = [node1]
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node1 = ("a", [node2, node3])
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node2 = ("\x02", [sink])
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node3 = ("a\x01", [sink])
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sink = None
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A C++ representation of the compressed graph is generated:
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const unsigned char dafsa[7] = {
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0x81, 0xE1, 0x02, 0x81, 0x82, 0x61, 0x81,
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};
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The bytes in the generated array has the following meaning:
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0: 0x81 <end_offset1> child at position 0 + (0x81 & 0x3F) -> jump to 1
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1: 0xE1 <end_char> label character (0xE1 & 0x7F) -> match "a"
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2: 0x02 <offset1> child at position 2 + (0x02 & 0x3F) -> jump to 4
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3: 0x81 <end_offset1> child at position 4 + (0x81 & 0x3F) -> jump to 5
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4: 0x82 <return_value> 0x82 & 0x0F -> return 2
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5: 0x61 <char> label character 0x61 -> match "a"
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6: 0x81 <return_value> 0x81 & 0x0F -> return 1
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Example 2:
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%%
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aa, 1
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bbb, 2
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baa, 1
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%%
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The input is first parsed to a list of words:
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["aa1", "bbb2", "baa1"]
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Compression results in the following graph:
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source = [node1, node2]
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node1 = ("b", [node2, node3])
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node2 = ("aa\x01", [sink])
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node3 = ("bb\x02", [sink])
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sink = None
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A C++ representation of the compressed graph is generated:
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const unsigned char dafsa[11] = {
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0x02, 0x83, 0xE2, 0x02, 0x83, 0x61, 0x61, 0x81, 0x62, 0x62, 0x82,
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};
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The bytes in the generated array has the following meaning:
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0: 0x02 <offset1> child at position 0 + (0x02 & 0x3F) -> jump to 2
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1: 0x83 <end_offset1> child at position 2 + (0x83 & 0x3F) -> jump to 5
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2: 0xE2 <end_char> label character (0xE2 & 0x7F) -> match "b"
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3: 0x02 <offset1> child at position 3 + (0x02 & 0x3F) -> jump to 5
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4: 0x83 <end_offset1> child at position 5 + (0x83 & 0x3F) -> jump to 8
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5: 0x61 <char> label character 0x61 -> match "a"
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6: 0x61 <char> label character 0x61 -> match "a"
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7: 0x81 <return_value> 0x81 & 0x0F -> return 1
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8: 0x62 <char> label character 0x62 -> match "b"
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9: 0x62 <char> label character 0x62 -> match "b"
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10: 0x82 <return_value> 0x82 & 0x0F -> return 2
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"""
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import sys
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class InputError(Exception):
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"""Exception raised for errors in the input file."""
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def to_dafsa(words):
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"""Generates a DAFSA from a word list and returns the source node.
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Each word is split into characters so that each character is represented by
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a unique node. It is assumed the word list is not empty.
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"""
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if not words:
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raise InputError('The domain list must not be empty')
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def ToNodes(word):
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"""Split words into characters"""
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if not 0x1F < ord(word[0]) < 0x80:
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raise InputError('Domain names must be printable 7-bit ASCII')
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if len(word) == 1:
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return chr(ord(word[0]) & 0x0F), [None]
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return word[0], [ToNodes(word[1:])]
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return [ToNodes(word) for word in words]
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def to_words(node):
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"""Generates a word list from all paths starting from an internal node."""
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if not node:
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return ['']
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return [(node[0] + word) for child in node[1] for word in to_words(child)]
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def reverse(dafsa):
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"""Generates a new DAFSA that is reversed, so that the old sink node becomes
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the new source node.
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"""
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sink = []
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nodemap = {}
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def dfs(node, parent):
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"""Creates reverse nodes.
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A new reverse node will be created for each old node. The new node will
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get a reversed label and the parents of the old node as children.
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"""
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if not node:
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sink.append(parent)
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elif id(node) not in nodemap:
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nodemap[id(node)] = (node[0][::-1], [parent])
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for child in node[1]:
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dfs(child, nodemap[id(node)])
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else:
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nodemap[id(node)][1].append(parent)
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for node in dafsa:
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dfs(node, None)
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return sink
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def join_labels(dafsa):
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"""Generates a new DAFSA where internal nodes are merged if there is a one to
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one connection.
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"""
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parentcount = {id(None): 2}
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nodemap = {id(None): None}
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def count_parents(node):
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"""Count incoming references"""
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if id(node) in parentcount:
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parentcount[id(node)] += 1
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else:
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parentcount[id(node)] = 1
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for child in node[1]:
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count_parents(child)
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def join(node):
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"""Create new nodes"""
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if id(node) not in nodemap:
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children = [join(child) for child in node[1]]
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if len(children) == 1 and parentcount[id(node[1][0])] == 1:
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child = children[0]
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nodemap[id(node)] = (node[0] + child[0], child[1])
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else:
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nodemap[id(node)] = (node[0], children)
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return nodemap[id(node)]
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for node in dafsa:
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count_parents(node)
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return [join(node) for node in dafsa]
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def join_suffixes(dafsa):
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"""Generates a new DAFSA where nodes that represent the same word lists
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towards the sink are merged.
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"""
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nodemap = {frozenset(('',)): None}
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def join(node):
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"""Returns a macthing node. A new node is created if no matching node
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exists. The graph is accessed in dfs order.
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"""
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suffixes = frozenset(to_words(node))
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if suffixes not in nodemap:
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nodemap[suffixes] = (node[0], [join(child) for child in node[1]])
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return nodemap[suffixes]
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return [join(node) for node in dafsa]
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def top_sort(dafsa):
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"""Generates list of nodes in topological sort order."""
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incoming = {}
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def count_incoming(node):
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"""Counts incoming references."""
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if node:
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if id(node) not in incoming:
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incoming[id(node)] = 1
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for child in node[1]:
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count_incoming(child)
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else:
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incoming[id(node)] += 1
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for node in dafsa:
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count_incoming(node)
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for node in dafsa:
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incoming[id(node)] -= 1
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waiting = [node for node in dafsa if incoming[id(node)] == 0]
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nodes = []
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while waiting:
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node = waiting.pop()
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assert incoming[id(node)] == 0
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nodes.append(node)
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for child in node[1]:
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if child:
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incoming[id(child)] -= 1
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if incoming[id(child)] == 0:
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waiting.append(child)
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return nodes
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def encode_links(children, offsets, current):
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"""Encodes a list of children as one, two or three byte offsets."""
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if not children[0]:
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# This is an <end_label> node and no links follow such nodes
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assert len(children) == 1
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return []
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guess = 3 * len(children)
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assert children
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children = sorted(children, key=lambda x: -offsets[id(x)])
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while True:
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offset = current + guess
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buf = []
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for child in children:
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last = len(buf)
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distance = offset - offsets[id(child)]
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assert distance > 0 and distance < (1 << 21)
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if distance < (1 << 6):
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# A 6-bit offset: "s0xxxxxx"
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buf.append(distance)
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elif distance < (1 << 13):
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# A 13-bit offset: "s10xxxxxxxxxxxxx"
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buf.append(0x40 | (distance >> 8))
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buf.append(distance & 0xFF)
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else:
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# A 21-bit offset: "s11xxxxxxxxxxxxxxxxxxxxx"
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buf.append(0x60 | (distance >> 16))
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buf.append((distance >> 8) & 0xFF)
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buf.append(distance & 0xFF)
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# Distance in first link is relative to following record.
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# Distance in other links are relative to previous link.
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offset -= distance
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if len(buf) == guess:
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break
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guess = len(buf)
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# Set most significant bit to mark end of links in this node.
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buf[last] |= (1 << 7)
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buf.reverse()
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return buf
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def encode_prefix(label):
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"""Encodes a node label as a list of bytes without a trailing high byte.
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This method encodes a node if there is exactly one child and the
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child follows immidiately after so that no jump is needed. This label
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will then be a prefix to the label in the child node.
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"""
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assert label
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return [ord(c) for c in reversed(label)]
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def encode_label(label):
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"""Encodes a node label as a list of bytes with a trailing high byte >0x80.
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"""
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buf = encode_prefix(label)
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# Set most significant bit to mark end of label in this node.
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buf[0] |= (1 << 7)
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return buf
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def encode(dafsa):
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"""Encodes a DAFSA to a list of bytes"""
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output = []
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offsets = {}
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for node in reversed(top_sort(dafsa)):
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if (len(node[1]) == 1 and node[1][0] and
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(offsets[id(node[1][0])] == len(output))):
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output.extend(encode_prefix(node[0]))
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else:
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output.extend(encode_links(node[1], offsets, len(output)))
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output.extend(encode_label(node[0]))
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offsets[id(node)] = len(output)
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output.extend(encode_links(dafsa, offsets, len(output)))
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output.reverse()
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return output
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def to_cxx(data, preamble=None):
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"""Generates C++ code from a list of encoded bytes."""
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text = '/* This file is generated. DO NOT EDIT!\n\n'
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text += 'The byte array encodes a dictionary of strings and values. See '
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text += 'make_dafsa.py for documentation.'
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text += '*/\n\n'
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if preamble:
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text += preamble
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text += '\n\n'
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text += 'const unsigned char kDafsa[%s] = {\n' % len(data)
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for i in range(0, len(data), 12):
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text += ' '
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text += ', '.join('0x%02x' % byte for byte in data[i:i + 12])
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text += ',\n'
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text += '};\n'
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return text
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def words_to_cxx(words, preamble=None):
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"""Generates C++ code from a word list"""
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dafsa = to_dafsa(words)
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for fun in (reverse, join_suffixes, reverse, join_suffixes, join_labels):
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dafsa = fun(dafsa)
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return to_cxx(encode(dafsa), preamble)
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def parse_gperf(infile):
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"""Parses gperf file and extract strings and return code"""
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lines = [line.strip() for line in infile]
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# Extract the preamble.
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first_delimeter = lines.index('%%')
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preamble = '\n'.join(lines[0:first_delimeter])
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# Extract strings after the first '%%' and before the second '%%'.
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begin = first_delimeter + 1
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end = lines.index('%%', begin)
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lines = lines[begin:end]
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for line in lines:
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if line[-3:-1] != ', ':
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raise InputError('Expected "domainname, <digit>", found "%s"' % line)
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# Technically the DAFSA format could support return values in range [0-31],
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# but the values below are the only with a defined meaning.
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if line[-1] not in '0124':
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raise InputError('Expected value to be one of {0,1,2,4}, found "%s"' %
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line[-1])
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return (preamble, [line[:-3] + line[-1] for line in lines])
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def main(outfile, infile):
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with open(infile, 'r') as infile:
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preamble, words = parse_gperf(infile)
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outfile.write(words_to_cxx(words, preamble))
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return 0
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if __name__ == '__main__':
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if len(sys.argv) != 3:
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print('usage: %s infile outfile' % sys.argv[0])
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sys.exit(1)
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with open(sys.argv[2], 'w') as outfile:
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sys.exit(main(outfile, sys.argv[1]))
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