PLY Version: 3.4
This document provides an overview of lexing and parsing with PLY. Given the intrinsic complexity of parsing, I would strongly advise that you read (or at least skim) this entire document before jumping into a big development project with PLY.
PLY-3.0 is compatible with both Python 2 and Python 3. Be aware that Python 3 support is new and has not been extensively tested (although all of the examples and unit tests pass under Python 3.0). If you are using Python 2, you should try to use Python 2.4 or newer. Although PLY works with versions as far back as Python 2.2, some of its optional features require more modern library modules.
Early versions of PLY were developed to support an Introduction to Compilers Course I taught in 2001 at the University of Chicago. In this course, students built a fully functional compiler for a simple Pascal-like language. Their compiler, implemented entirely in Python, had to include lexical analysis, parsing, type checking, type inference, nested scoping, and code generation for the SPARC processor. Approximately 30 different compiler implementations were completed in this course. Most of PLY's interface and operation has been influenced by common usability problems encountered by students. Since 2001, PLY has continued to be improved as feedback has been received from users. PLY-3.0 represents a major refactoring of the original implementation with an eye towards future enhancements.
Since PLY was primarily developed as an instructional tool, you will find it to be fairly picky about token and grammar rule specification. In part, this added formality is meant to catch common programming mistakes made by novice users. However, advanced users will also find such features to be useful when building complicated grammars for real programming languages. It should also be noted that PLY does not provide much in the way of bells and whistles (e.g., automatic construction of abstract syntax trees, tree traversal, etc.). Nor would I consider it to be a parsing framework. Instead, you will find a bare-bones, yet fully capable lex/yacc implementation written entirely in Python.
The rest of this document assumes that you are somewhat familar with parsing theory, syntax directed translation, and the use of compiler construction tools such as lex and yacc in other programming languages. If you are unfamilar with these topics, you will probably want to consult an introductory text such as "Compilers: Principles, Techniques, and Tools", by Aho, Sethi, and Ullman. O'Reilly's "Lex and Yacc" by John Levine may also be handy. In fact, the O'Reilly book can be used as a reference for PLY as the concepts are virtually identical.
The two tools are meant to work together. Specifically, lex.py provides an external interface in the form of a token() function that returns the next valid token on the input stream. yacc.py calls this repeatedly to retrieve tokens and invoke grammar rules. The output of yacc.py is often an Abstract Syntax Tree (AST). However, this is entirely up to the user. If desired, yacc.py can also be used to implement simple one-pass compilers.
Like its Unix counterpart, yacc.py provides most of the features you expect including extensive error checking, grammar validation, support for empty productions, error tokens, and ambiguity resolution via precedence rules. In fact, everything that is possible in traditional yacc should be supported in PLY.
The primary difference between yacc.py and Unix yacc is that yacc.py doesn't involve a separate code-generation process. Instead, PLY relies on reflection (introspection) to build its lexers and parsers. Unlike traditional lex/yacc which require a special input file that is converted into a separate source file, the specifications given to PLY are valid Python programs. This means that there are no extra source files nor is there a special compiler construction step (e.g., running yacc to generate Python code for the compiler). Since the generation of the parsing tables is relatively expensive, PLY caches the results and saves them to a file. If no changes are detected in the input source, the tables are read from the cache. Otherwise, they are regenerated.
A tokenizer splits the string into individual tokensx = 3 + 42 * (s - t)
Tokens are usually given names to indicate what they are. For example:'x','=', '3', '+', '42', '*', '(', 's', '-', 't', ')'
More specifically, the input is broken into pairs of token types and values. For example:'ID','EQUALS','NUMBER','PLUS','NUMBER','TIMES', 'LPAREN','ID','MINUS','ID','RPAREN'
The identification of tokens is typically done by writing a series of regular expression rules. The next section shows how this is done using lex.py.('ID','x'), ('EQUALS','='), ('NUMBER','3'), ('PLUS','+'), ('NUMBER','42), ('TIMES','*'), ('LPAREN','('), ('ID','s'), ('MINUS','-'), ('ID','t'), ('RPAREN',')'
To use the lexer, you first need to feed it some input text using its input() method. After that, repeated calls to token() produce tokens. The following code shows how this works:# ------------------------------------------------------------ # calclex.py # # tokenizer for a simple expression evaluator for # numbers and +,-,*,/ # ------------------------------------------------------------ import ply.lex as lex # List of token names. This is always required tokens = ( 'NUMBER', 'PLUS', 'MINUS', 'TIMES', 'DIVIDE', 'LPAREN', 'RPAREN', ) # Regular expression rules for simple tokens t_PLUS = r'\+' t_MINUS = r'-' t_TIMES = r'\*' t_DIVIDE = r'/' t_LPAREN = r'\(' t_RPAREN = r'\)' # A regular expression rule with some action code def t_NUMBER(t): r'\d+' t.value = int(t.value) return t # Define a rule so we can track line numbers def t_newline(t): r'\n+' t.lexer.lineno += len(t.value) # A string containing ignored characters (spaces and tabs) t_ignore = ' \t' # Error handling rule def t_error(t): print "Illegal character '%s'" % t.value[0] t.lexer.skip(1) # Build the lexer lexer = lex.lex()
When executed, the example will produce the following output:# Test it out data = ''' 3 + 4 * 10 + -20 *2 ''' # Give the lexer some input lexer.input(data) # Tokenize while True: tok = lexer.token() if not tok: break # No more input print tok
Lexers also support the iteration protocol. So, you can write the above loop as follows:$ python example.py LexToken(NUMBER,3,2,1) LexToken(PLUS,'+',2,3) LexToken(NUMBER,4,2,5) LexToken(TIMES,'*',2,7) LexToken(NUMBER,10,2,10) LexToken(PLUS,'+',3,14) LexToken(MINUS,'-',3,16) LexToken(NUMBER,20,3,18) LexToken(TIMES,'*',3,20) LexToken(NUMBER,2,3,21)
The tokens returned by lexer.token() are instances of LexToken. This object has attributes tok.type, tok.value, tok.lineno, and tok.lexpos. The following code shows an example of accessing these attributes:for tok in lexer: print tok
The tok.type and tok.value attributes contain the type and value of the token itself. tok.line and tok.lexpos contain information about the location of the token. tok.lexpos is the index of the token relative to the start of the input text.# Tokenize while True: tok = lexer.token() if not tok: break # No more input print tok.type, tok.value, tok.line, tok.lexpos
In the example, the following code specified the token names:
tokens = ( 'NUMBER', 'PLUS', 'MINUS', 'TIMES', 'DIVIDE', 'LPAREN', 'RPAREN', )
In this case, the name following the t_ must exactly match one of the names supplied in tokens. If some kind of action needs to be performed, a token rule can be specified as a function. For example, this rule matches numbers and converts the string into a Python integer.t_PLUS = r'\+'
When a function is used, the regular expression rule is specified in the function documentation string. The function always takes a single argument which is an instance of LexToken. This object has attributes of t.type which is the token type (as a string), t.value which is the lexeme (the actual text matched), t.lineno which is the current line number, and t.lexpos which is the position of the token relative to the beginning of the input text. By default, t.type is set to the name following the t_ prefix. The action function can modify the contents of the LexToken object as appropriate. However, when it is done, the resulting token should be returned. If no value is returned by the action function, the token is simply discarded and the next token read.def t_NUMBER(t): r'\d+' t.value = int(t.value) return t
Internally, lex.py uses the re module to do its patten matching. When building the master regular expression, rules are added in the following order:
Without this ordering, it can be difficult to correctly match certain types of tokens. For example, if you wanted to have separate tokens for "=" and "==", you need to make sure that "==" is checked first. By sorting regular expressions in order of decreasing length, this problem is solved for rules defined as strings. For functions, the order can be explicitly controlled since rules appearing first are checked first.
To handle reserved words, you should write a single rule to match an identifier and do a special name lookup in a function like this:
This approach greatly reduces the number of regular expression rules and is likely to make things a little faster.reserved = { 'if' : 'IF', 'then' : 'THEN', 'else' : 'ELSE', 'while' : 'WHILE', ... } tokens = ['LPAREN','RPAREN',...,'ID'] + list(reserved.values()) def t_ID(t): r'[a-zA-Z_][a-zA-Z_0-9]*' t.type = reserved.get(t.value,'ID') # Check for reserved words return t
Note: You should avoid writing individual rules for reserved words. For example, if you write rules like this,
those rules will be triggered for identifiers that include those words as a prefix such as "forget" or "printed". This is probably not what you want.t_FOR = r'for' t_PRINT = r'print'
It is important to note that storing data in other attribute names is not recommended. The yacc.py module only exposes the contents of the value attribute. Thus, accessing other attributes may be unnecessarily awkward. If you need to store multiple values on a token, assign a tuple, dictionary, or instance to value.def t_ID(t): ... # Look up symbol table information and return a tuple t.value = (t.value, symbol_lookup(t.value)) ... return t
Alternatively, you can include the prefix "ignore_" in the token declaration to force a token to be ignored. For example:def t_COMMENT(t): r'\#.*' pass # No return value. Token discarded
Be advised that if you are ignoring many different kinds of text, you may still want to use functions since these provide more precise control over the order in which regular expressions are matched (i.e., functions are matched in order of specification whereas strings are sorted by regular expression length).t_ignore_COMMENT = r'\#.*'
By default, lex.py knows nothing about line numbers. This is because lex.py doesn't know anything about what constitutes a "line" of input (e.g., the newline character or even if the input is textual data). To update this information, you need to write a special rule. In the example, the t_newline() rule shows how to do this.
Within the rule, the lineno attribute of the underlying lexer t.lexer is updated. After the line number is updated, the token is simply discarded since nothing is returned.# Define a rule so we can track line numbers def t_newline(t): r'\n+' t.lexer.lineno += len(t.value)
lex.py does not perform and kind of automatic column tracking. However, it does record positional information related to each token in the lexpos attribute. Using this, it is usually possible to compute column information as a separate step. For instance, just count backwards until you reach a newline.
Since column information is often only useful in the context of error handling, calculating the column position can be performed when needed as opposed to doing it for each token.# Compute column. # input is the input text string # token is a token instance def find_column(input,token): last_cr = input.rfind('\n',0,token.lexpos) if last_cr < 0: last_cr = 0 column = (token.lexpos - last_cr) + 1 return column
The special t_ignore rule is reserved by lex.py for characters that should be completely ignored in the input stream. Usually this is used to skip over whitespace and other non-essential characters. Although it is possible to define a regular expression rule for whitespace in a manner similar to t_newline(), the use of t_ignore provides substantially better lexing performance because it is handled as a special case and is checked in a much more efficient manner than the normal regular expression rules.
Literal characters can be specified by defining a variable literals in your lexing module. For example:
or alternativelyliterals = [ '+','-','*','/' ]
A literal character is simply a single character that is returned "as is" when encountered by the lexer. Literals are checked after all of the defined regular expression rules. Thus, if a rule starts with one of the literal characters, it will always take precedence.literals = "+-*/"
When a literal token is returned, both its type and value attributes are set to the character itself. For example, '+'.
Finally, the t_error() function is used to handle lexing errors that occur when illegal characters are detected. In this case, the t.value attribute contains the rest of the input string that has not been tokenized. In the example, the error function was defined as follows:
In this case, we simply print the offending character and skip ahead one character by calling t.lexer.skip(1).# Error handling rule def t_error(t): print "Illegal character '%s'" % t.value[0] t.lexer.skip(1)
To build the lexer, the function lex.lex() is used. This function uses Python reflection (or introspection) to read the the regular expression rules out of the calling context and build the lexer. Once the lexer has been built, two methods can be used to control the lexer.
lex.lex() lex.input(sometext) while 1: tok = lex.token() if not tok: break print tok
In this example, the module-level functions lex.input() and lex.token() are bound to the input() and token() methods of the last lexer created by the lex module. This interface may go away at some point so it's probably best not to use it.
In this case, we want the regular expression rule for ID to be one of the variables above. However, there is no way to directly specify this using a normal documentation string. To solve this problem, you can use the @TOKEN decorator. For example:digit = r'([0-9])' nondigit = r'([_A-Za-z])' identifier = r'(' + nondigit + r'(' + digit + r'|' + nondigit + r')*)' def t_ID(t): # want docstring to be identifier above. ????? ...
This will attach identifier to the docstring for t_ID() allowing lex.py to work normally. An alternative approach this problem is to set the docstring directly like this:from ply.lex import TOKEN @TOKEN(identifier) def t_ID(t): ...
NOTE: Use of @TOKEN requires Python-2.4 or newer. If you're concerned about backwards compatibility with older versions of Python, use the alternative approach of setting the docstring directly.def t_ID(t): ... t_ID.__doc__ = identifier
Next, run Python in its normal operating mode. When you do this, lex.py will write a file called lextab.py to the current directory. This file contains all of the regular expression rules and tables used during lexing. On subsequent executions, lextab.py will simply be imported to build the lexer. This approach substantially improves the startup time of the lexer and it works in Python's optimized mode.lexer = lex.lex(optimize=1)
To change the name of the lexer-generated file, use the lextab keyword argument. For example:
When running in optimized mode, it is important to note that lex disables most error checking. Thus, this is really only recommended if you're sure everything is working correctly and you're ready to start releasing production code.lexer = lex.lex(optimize=1,lextab="footab")
lexer = lex.lex(debug=1)
This will produce various sorts of debugging information including all of the added rules, the master regular expressions used by the lexer, and tokens generating during lexing.
In addition, lex.py comes with a simple main function which will either tokenize input read from standard input or from a file specified on the command line. To use it, simply put this in your lexer:
Please refer to the "Debugging" section near the end for some more advanced details of debugging.if __name__ == '__main__': lex.runmain()
For example, you might have a dedicated module that just contains the token rules:
Now, if you wanted to build a tokenizer from these rules from within a different module, you would do the following (shown for Python interactive mode):# module: tokrules.py # This module just contains the lexing rules # List of token names. This is always required tokens = ( 'NUMBER', 'PLUS', 'MINUS', 'TIMES', 'DIVIDE', 'LPAREN', 'RPAREN', ) # Regular expression rules for simple tokens t_PLUS = r'\+' t_MINUS = r'-' t_TIMES = r'\*' t_DIVIDE = r'/' t_LPAREN = r'\(' t_RPAREN = r'\)' # A regular expression rule with some action code def t_NUMBER(t): r'\d+' t.value = int(t.value) return t # Define a rule so we can track line numbers def t_newline(t): r'\n+' t.lexer.lineno += len(t.value) # A string containing ignored characters (spaces and tabs) t_ignore = ' \t' # Error handling rule def t_error(t): print "Illegal character '%s'" % t.value[0] t.lexer.skip(1)
The module option can also be used to define lexers from instances of a class. For example:>>> import tokrules >>> lexer = lex.lex(module=tokrules) >>> lexer.input("3 + 4") >>> lexer.token() LexToken(NUMBER,3,1,1,0) >>> lexer.token() LexToken(PLUS,'+',1,2) >>> lexer.token() LexToken(NUMBER,4,1,4) >>> lexer.token() None >>>
When building a lexer from class, you should construct the lexer from an instance of the class, not the class object itself. This is because PLY only works properly if the lexer actions are defined by bound-methods.import ply.lex as lex class MyLexer: # List of token names. This is always required tokens = ( 'NUMBER', 'PLUS', 'MINUS', 'TIMES', 'DIVIDE', 'LPAREN', 'RPAREN', ) # Regular expression rules for simple tokens t_PLUS = r'\+' t_MINUS = r'-' t_TIMES = r'\*' t_DIVIDE = r'/' t_LPAREN = r'\(' t_RPAREN = r'\)' # A regular expression rule with some action code # Note addition of self parameter since we're in a class def t_NUMBER(self,t): r'\d+' t.value = int(t.value) return t # Define a rule so we can track line numbers def t_newline(self,t): r'\n+' t.lexer.lineno += len(t.value) # A string containing ignored characters (spaces and tabs) t_ignore = ' \t' # Error handling rule def t_error(self,t): print "Illegal character '%s'" % t.value[0] t.lexer.skip(1) # Build the lexer def build(self,**kwargs): self.lexer = lex.lex(module=self, **kwargs) # Test it output def test(self,data): self.lexer.input(data) while True: tok = lexer.token() if not tok: break print tok # Build the lexer and try it out m = MyLexer() m.build() # Build the lexer m.test("3 + 4") # Test it
When using the module option to lex(), PLY collects symbols from the underlying object using the dir() function. There is no direct access to the __dict__ attribute of the object supplied as a module value.
Finally, if you want to keep things nicely encapsulated, but don't want to use a full-fledged class definition, lexers can be defined using closures. For example:
import ply.lex as lex # List of token names. This is always required tokens = ( 'NUMBER', 'PLUS', 'MINUS', 'TIMES', 'DIVIDE', 'LPAREN', 'RPAREN', ) def MyLexer(): # Regular expression rules for simple tokens t_PLUS = r'\+' t_MINUS = r'-' t_TIMES = r'\*' t_DIVIDE = r'/' t_LPAREN = r'\(' t_RPAREN = r'\)' # A regular expression rule with some action code def t_NUMBER(t): r'\d+' t.value = int(t.value) return t # Define a rule so we can track line numbers def t_newline(t): r'\n+' t.lexer.lineno += len(t.value) # A string containing ignored characters (spaces and tabs) t_ignore = ' \t' # Error handling rule def t_error(t): print "Illegal character '%s'" % t.value[0] t.lexer.skip(1) # Build the lexer from my environment and return it return lex.lex()
One way to do this is to keep a set of global variables in the module where you created the lexer. For example:
If you don't like the use of a global variable, another place to store information is inside the Lexer object created by lex(). To this, you can use the lexer attribute of tokens passed to the various rules. For example:num_count = 0 def t_NUMBER(t): r'\d+' global num_count num_count += 1 t.value = int(t.value) return t
This latter approach has the advantage of being simple and working correctly in applications where multiple instantiations of a given lexer exist in the same application. However, this might also feel like a gross violation of encapsulation to OO purists. Just to put your mind at some ease, all internal attributes of the lexer (with the exception of lineno) have names that are prefixed by lex (e.g., lexdata,lexpos, etc.). Thus, it is perfectly safe to store attributes in the lexer that don't have names starting with that prefix or a name that conlicts with one of the predefined methods (e.g., input(), token(), etc.).def t_NUMBER(t): r'\d+' t.lexer.num_count += 1 # Note use of lexer attribute t.value = int(t.value) return t lexer = lex.lex() lexer.num_count = 0 # Set the initial count
If you don't like assigning values on the lexer object, you can define your lexer as a class as shown in the previous section:
The class approach may be the easiest to manage if your application is going to be creating multiple instances of the same lexer and you need to manage a lot of state.class MyLexer: ... def t_NUMBER(self,t): r'\d+' self.num_count += 1 t.value = int(t.value) return t def build(self, **kwargs): self.lexer = lex.lex(object=self,**kwargs) def __init__(self): self.num_count = 0
State can also be managed through closures. For example, in Python 3:
def MyLexer(): num_count = 0 ... def t_NUMBER(t): r'\d+' nonlocal num_count num_count += 1 t.value = int(t.value) return t ...
If necessary, a lexer object can be duplicated by invoking its clone() method. For example:
When a lexer is cloned, the copy is exactly identical to the original lexer including any input text and internal state. However, the clone allows a different set of input text to be supplied which may be processed separately. This may be useful in situations when you are writing a parser/compiler that involves recursive or reentrant processing. For instance, if you needed to scan ahead in the input for some reason, you could create a clone and use it to look ahead. Or, if you were implementing some kind of preprocessor, cloned lexers could be used to handle different input files.lexer = lex.lex() ... newlexer = lexer.clone()
Creating a clone is different than calling lex.lex() in that PLY doesn't regenerate any of the internal tables or regular expressions. So,
Special considerations need to be made when cloning lexers that also maintain their own internal state using classes or closures. Namely, you need to be aware that the newly created lexers will share all of this state with the original lexer. For example, if you defined a lexer as a class and did this:
Then both a and b are going to be bound to the same object m and any changes to m will be reflected in both lexers. It's important to emphasize that clone() is only meant to create a new lexer that reuses the regular expressions and environment of another lexer. If you need to make a totally new copy of a lexer, then call lex() again.m = MyLexer() a = lex.lex(object=m) # Create a lexer b = a.clone() # Clone the lexer
lexer.lexpos
This attribute is an integer that contains the current position within the input text. If you modify the value, it will change the result of the next call to token(). Within token rule functions, this points to the first character after the matched text. If the value is modified within a rule, the next returned token will be matched at the new position.
lexer.lineno
The current value of the line number attribute stored in the lexer. PLY only specifies that the attribute exists---it never sets, updates, or performs any processing with it. If you want to track line numbers, you will need to add code yourself (see the section on line numbers and positional information).
lexer.lexdata
The current input text stored in the lexer. This is the string passed with the input() method. It would probably be a bad idea to modify this unless you really know what you're doing.
lexer.lexmatch
This is the raw Match object returned by the Python re.match() function (used internally by PLY) for the current token. If you have written a regular expression that contains named groups, you can use this to retrieve those values. Note: This attribute is only updated when tokens are defined and processed by functions.
To define a new lexing state, it must first be declared. This is done by including a "states" declaration in your lex file. For example:
This declaration declares two states, 'foo' and 'bar'. States may be of two types; 'exclusive' and 'inclusive'. An exclusive state completely overrides the default behavior of the lexer. That is, lex will only return tokens and apply rules defined specifically for that state. An inclusive state adds additional tokens and rules to the default set of rules. Thus, lex will return both the tokens defined by default in addition to those defined for the inclusive state.states = ( ('foo','exclusive'), ('bar','inclusive'), )
Once a state has been declared, tokens and rules are declared by including the state name in token/rule declaration. For example:
A token can be declared in multiple states by including multiple state names in the declaration. For example:t_foo_NUMBER = r'\d+' # Token 'NUMBER' in state 'foo' t_bar_ID = r'[a-zA-Z_][a-zA-Z0-9_]*' # Token 'ID' in state 'bar' def t_foo_newline(t): r'\n' t.lexer.lineno += 1
Alternative, a token can be declared in all states using the 'ANY' in the name.t_foo_bar_NUMBER = r'\d+' # Defines token 'NUMBER' in both state 'foo' and 'bar'
If no state name is supplied, as is normally the case, the token is associated with a special state 'INITIAL'. For example, these two declarations are identical:t_ANY_NUMBER = r'\d+' # Defines a token 'NUMBER' in all states
t_NUMBER = r'\d+' t_INITIAL_NUMBER = r'\d+'
States are also associated with the special t_ignore and t_error() declarations. For example, if a state treats these differently, you can declare:
By default, lexing operates in the 'INITIAL' state. This state includes all of the normally defined tokens. For users who aren't using different states, this fact is completely transparent. If, during lexing or parsing, you want to change the lexing state, use the begin() method. For example:t_foo_ignore = " \t\n" # Ignored characters for state 'foo' def t_bar_error(t): # Special error handler for state 'bar' pass
To get out of a state, you use begin() to switch back to the initial state. For example:def t_begin_foo(t): r'start_foo' t.lexer.begin('foo') # Starts 'foo' state
The management of states can also be done with a stack. For example:def t_foo_end(t): r'end_foo' t.lexer.begin('INITIAL') # Back to the initial state
def t_begin_foo(t): r'start_foo' t.lexer.push_state('foo') # Starts 'foo' state def t_foo_end(t): r'end_foo' t.lexer.pop_state() # Back to the previous state
The use of a stack would be useful in situations where there are many ways of entering a new lexing state and you merely want to go back to the previous state afterwards.
An example might help clarify. Suppose you were writing a parser and you wanted to grab sections of arbitrary C code enclosed by curly braces. That is, whenever you encounter a starting brace '{', you want to read all of the enclosed code up to the ending brace '}' and return it as a string. Doing this with a normal regular expression rule is nearly (if not actually) impossible. This is because braces can be nested and can be included in comments and strings. Thus, simply matching up to the first matching '}' character isn't good enough. Here is how you might use lexer states to do this:
In this example, the occurrence of the first '{' causes the lexer to record the starting position and enter a new state 'ccode'. A collection of rules then match various parts of the input that follow (comments, strings, etc.). All of these rules merely discard the token (by not returning a value). However, if the closing right brace is encountered, the rule t_ccode_rbrace collects all of the code (using the earlier recorded starting position), stores it, and returns a token 'CCODE' containing all of that text. When returning the token, the lexing state is restored back to its initial state.# Declare the state states = ( ('ccode','exclusive'), ) # Match the first {. Enter ccode state. def t_ccode(t): r'\{' t.lexer.code_start = t.lexer.lexpos # Record the starting position t.lexer.level = 1 # Initial brace level t.lexer.begin('ccode') # Enter 'ccode' state # Rules for the ccode state def t_ccode_lbrace(t): r'\{' t.lexer.level +=1 def t_ccode_rbrace(t): r'\}' t.lexer.level -=1 # If closing brace, return the code fragment if t.lexer.level == 0: t.value = t.lexer.lexdata[t.lexer.code_start:t.lexer.lexpos+1] t.type = "CCODE" t.lexer.lineno += t.value.count('\n') t.lexer.begin('INITIAL') return t # C or C++ comment (ignore) def t_ccode_comment(t): r'(/\*(.|\n)*?*/)|(//.*)' pass # C string def t_ccode_string(t): r'\"([^\\\n]|(\\.))*?\"' # C character literal def t_ccode_char(t): r'\'([^\\\n]|(\\.))*?\'' # Any sequence of non-whitespace characters (not braces, strings) def t_ccode_nonspace(t): r'[^\s\{\}\'\"]+' # Ignored characters (whitespace) t_ccode_ignore = " \t\n" # For bad characters, we just skip over it def t_ccode_error(t): t.lexer.skip(1)
lex.lex(reflags=re.UNICODE)
If you are going to create a hand-written lexer and you plan to use it with yacc.py, it only needs to conform to the following requirements:
In the grammar, symbols such as NUMBER, +, -, *, and / are known as terminals and correspond to raw input tokens. Identifiers such as term and factor refer to grammar rules comprised of a collection of terminals and other rules. These identifiers are known as non-terminals.expression : expression + term | expression - term | term term : term * factor | term / factor | factor factor : NUMBER | ( expression )
The semantic behavior of a language is often specified using a technique known as syntax directed translation. In syntax directed translation, attributes are attached to each symbol in a given grammar rule along with an action. Whenever a particular grammar rule is recognized, the action describes what to do. For example, given the expression grammar above, you might write the specification for a simple calculator like this:
A good way to think about syntax directed translation is to view each symbol in the grammar as a kind of object. Associated with each symbol is a value representing its "state" (for example, the val attribute above). Semantic actions are then expressed as a collection of functions or methods that operate on the symbols and associated values.Grammar Action -------------------------------- -------------------------------------------- expression0 : expression1 + term expression0.val = expression1.val + term.val | expression1 - term expression0.val = expression1.val - term.val | term expression0.val = term.val term0 : term1 * factor term0.val = term1.val * factor.val | term1 / factor term0.val = term1.val / factor.val | factor term0.val = factor.val factor : NUMBER factor.val = int(NUMBER.lexval) | ( expression ) factor.val = expression.val
Yacc uses a parsing technique known as LR-parsing or shift-reduce parsing. LR parsing is a bottom up technique that tries to recognize the right-hand-side of various grammar rules. Whenever a valid right-hand-side is found in the input, the appropriate action code is triggered and the grammar symbols are replaced by the grammar symbol on the left-hand-side.
LR parsing is commonly implemented by shifting grammar symbols onto a stack and looking at the stack and the next input token for patterns that match one of the grammar rules. The details of the algorithm can be found in a compiler textbook, but the following example illustrates the steps that are performed if you wanted to parse the expression 3 + 5 * (10 - 20) using the grammar defined above. In the example, the special symbol $ represents the end of input.
When parsing the expression, an underlying state machine and the current input token determine what happens next. If the next token looks like part of a valid grammar rule (based on other items on the stack), it is generally shifted onto the stack. If the top of the stack contains a valid right-hand-side of a grammar rule, it is usually "reduced" and the symbols replaced with the symbol on the left-hand-side. When this reduction occurs, the appropriate action is triggered (if defined). If the input token can't be shifted and the top of stack doesn't match any grammar rules, a syntax error has occurred and the parser must take some kind of recovery step (or bail out). A parse is only successful if the parser reaches a state where the symbol stack is empty and there are no more input tokens.Step Symbol Stack Input Tokens Action ---- --------------------- --------------------- ------------------------------- 1 3 + 5 * ( 10 - 20 )$ Shift 3 2 3 + 5 * ( 10 - 20 )$ Reduce factor : NUMBER 3 factor + 5 * ( 10 - 20 )$ Reduce term : factor 4 term + 5 * ( 10 - 20 )$ Reduce expr : term 5 expr + 5 * ( 10 - 20 )$ Shift + 6 expr + 5 * ( 10 - 20 )$ Shift 5 7 expr + 5 * ( 10 - 20 )$ Reduce factor : NUMBER 8 expr + factor * ( 10 - 20 )$ Reduce term : factor 9 expr + term * ( 10 - 20 )$ Shift * 10 expr + term * ( 10 - 20 )$ Shift ( 11 expr + term * ( 10 - 20 )$ Shift 10 12 expr + term * ( 10 - 20 )$ Reduce factor : NUMBER 13 expr + term * ( factor - 20 )$ Reduce term : factor 14 expr + term * ( term - 20 )$ Reduce expr : term 15 expr + term * ( expr - 20 )$ Shift - 16 expr + term * ( expr - 20 )$ Shift 20 17 expr + term * ( expr - 20 )$ Reduce factor : NUMBER 18 expr + term * ( expr - factor )$ Reduce term : factor 19 expr + term * ( expr - term )$ Reduce expr : expr - term 20 expr + term * ( expr )$ Shift ) 21 expr + term * ( expr ) $ Reduce factor : (expr) 22 expr + term * factor $ Reduce term : term * factor 23 expr + term $ Reduce expr : expr + term 24 expr $ Reduce expr 25 $ Success!
It is important to note that the underlying implementation is built around a large finite-state machine that is encoded in a collection of tables. The construction of these tables is non-trivial and beyond the scope of this discussion. However, subtle details of this process explain why, in the example above, the parser chooses to shift a token onto the stack in step 9 rather than reducing the rule expr : expr + term.
In this example, each grammar rule is defined by a Python function where the docstring to that function contains the appropriate context-free grammar specification. The statements that make up the function body implement the semantic actions of the rule. Each function accepts a single argument p that is a sequence containing the values of each grammar symbol in the corresponding rule. The values of p[i] are mapped to grammar symbols as shown here:# Yacc example import ply.yacc as yacc # Get the token map from the lexer. This is required. from calclex import tokens def p_expression_plus(p): 'expression : expression PLUS term' p[0] = p[1] + p[3] def p_expression_minus(p): 'expression : expression MINUS term' p[0] = p[1] - p[3] def p_expression_term(p): 'expression : term' p[0] = p[1] def p_term_times(p): 'term : term TIMES factor' p[0] = p[1] * p[3] def p_term_div(p): 'term : term DIVIDE factor' p[0] = p[1] / p[3] def p_term_factor(p): 'term : factor' p[0] = p[1] def p_factor_num(p): 'factor : NUMBER' p[0] = p[1] def p_factor_expr(p): 'factor : LPAREN expression RPAREN' p[0] = p[2] # Error rule for syntax errors def p_error(p): print "Syntax error in input!" # Build the parser parser = yacc.yacc() while True: try: s = raw_input('calc > ') except EOFError: break if not s: continue result = parser.parse(s) print result
def p_expression_plus(p): 'expression : expression PLUS term' # ^ ^ ^ ^ # p[0] p[1] p[2] p[3] p[0] = p[1] + p[3]
For tokens, the "value" of the corresponding p[i] is the same as the p.value attribute assigned in the lexer module. For non-terminals, the value is determined by whatever is placed in p[0] when rules are reduced. This value can be anything at all. However, it probably most common for the value to be a simple Python type, a tuple, or an instance. In this example, we are relying on the fact that the NUMBER token stores an integer value in its value field. All of the other rules simply perform various types of integer operations and propagate the result.
Note: The use of negative indices have a special meaning in yacc---specially p[-1] does not have the same value as p[3] in this example. Please see the section on "Embedded Actions" for further details.
The first rule defined in the yacc specification determines the starting grammar symbol (in this case, a rule for expression appears first). Whenever the starting rule is reduced by the parser and no more input is available, parsing stops and the final value is returned (this value will be whatever the top-most rule placed in p[0]). Note: an alternative starting symbol can be specified using the start keyword argument to yacc().
The p_error(p) rule is defined to catch syntax errors. See the error handling section below for more detail.
To build the parser, call the yacc.yacc() function. This function looks at the module and attempts to construct all of the LR parsing tables for the grammar you have specified. The first time yacc.yacc() is invoked, you will get a message such as this:
Since table construction is relatively expensive (especially for large grammars), the resulting parsing table is written to the current directory in a file called parsetab.py. In addition, a debugging file called parser.out is created. On subsequent executions, yacc will reload the table from parsetab.py unless it has detected a change in the underlying grammar (in which case the tables and parsetab.py file are regenerated). Note: The names of parser output files can be changed if necessary. See the PLY Reference for details.$ python calcparse.py Generating LALR tables calc >
If any errors are detected in your grammar specification, yacc.py will produce diagnostic messages and possibly raise an exception. Some of the errors that can be detected include:
The final part of the example shows how to actually run the parser created by yacc(). To run the parser, you simply have to call the parse() with a string of input text. This will run all of the grammar rules and return the result of the entire parse. This result return is the value assigned to p[0] in the starting grammar rule.
Instead of writing two functions, you might write a single function like this:def p_expression_plus(p): 'expression : expression PLUS term' p[0] = p[1] + p[3] def p_expression_minus(t): 'expression : expression MINUS term' p[0] = p[1] - p[3]
In general, the doc string for any given function can contain multiple grammar rules. So, it would have also been legal (although possibly confusing) to write this:def p_expression(p): '''expression : expression PLUS term | expression MINUS term''' if p[2] == '+': p[0] = p[1] + p[3] elif p[2] == '-': p[0] = p[1] - p[3]
When combining grammar rules into a single function, it is usually a good idea for all of the rules to have a similar structure (e.g., the same number of terms). Otherwise, the corresponding action code may be more complicated than necessary. However, it is possible to handle simple cases using len(). For example:def p_binary_operators(p): '''expression : expression PLUS term | expression MINUS term term : term TIMES factor | term DIVIDE factor''' if p[2] == '+': p[0] = p[1] + p[3] elif p[2] == '-': p[0] = p[1] - p[3] elif p[2] == '*': p[0] = p[1] * p[3] elif p[2] == '/': p[0] = p[1] / p[3]
If parsing performance is a concern, you should resist the urge to put too much conditional processing into a single grammar rule as shown in these examples. When you add checks to see which grammar rule is being handled, you are actually duplicating the work that the parser has already performed (i.e., the parser already knows exactly what rule it matched). You can eliminate this overhead by using a separate p_rule() function for each grammar rule.def p_expressions(p): '''expression : expression MINUS expression | MINUS expression''' if (len(p) == 4): p[0] = p[1] - p[3] elif (len(p) == 3): p[0] = -p[2]
A character literal must be enclosed in quotes such as '+'. In addition, if literals are used, they must be declared in the corresponding lex file through the use of a special literals declaration.def p_binary_operators(p): '''expression : expression '+' term | expression '-' term term : term '*' factor | term '/' factor''' if p[2] == '+': p[0] = p[1] + p[3] elif p[2] == '-': p[0] = p[1] - p[3] elif p[2] == '*': p[0] = p[1] * p[3] elif p[2] == '/': p[0] = p[1] / p[3]
Character literals are limited to a single character. Thus, it is not legal to specify literals such as '<=' or '=='. For this, use the normal lexing rules (e.g., define a rule such as t_EQ = r'==').# Literals. Should be placed in module given to lex() literals = ['+','-','*','/' ]
Now to use the empty production, simply use 'empty' as a symbol. For example:def p_empty(p): 'empty :' pass
Note: You can write empty rules anywhere by simply specifying an empty right hand side. However, I personally find that writing an "empty" rule and using "empty" to denote an empty production is easier to read and more clearly states your intentions.def p_optitem(p): 'optitem : item' ' | empty' ...
The use of a start specifier may be useful during debugging since you can use it to have yacc build a subset of a larger grammar. For this purpose, it is also possible to specify a starting symbol as an argument to yacc(). For example:start = 'foo' def p_bar(p): 'bar : A B' # This is the starting rule due to the start specifier above def p_foo(p): 'foo : bar X' ...
yacc.yacc(start='foo')
Unfortunately, this grammar specification is ambiguous. For example, if you are parsing the string "3 * 4 + 5", there is no way to tell how the operators are supposed to be grouped. For example, does the expression mean "(3 * 4) + 5" or is it "3 * (4+5)"?expression : expression PLUS expression | expression MINUS expression | expression TIMES expression | expression DIVIDE expression | LPAREN expression RPAREN | NUMBER
When an ambiguous grammar is given to yacc.py it will print messages about "shift/reduce conflicts" or "reduce/reduce conflicts". A shift/reduce conflict is caused when the parser generator can't decide whether or not to reduce a rule or shift a symbol on the parsing stack. For example, consider the string "3 * 4 + 5" and the internal parsing stack:
In this case, when the parser reaches step 6, it has two options. One is to reduce the rule expr : expr * expr on the stack. The other option is to shift the token + on the stack. Both options are perfectly legal from the rules of the context-free-grammar.Step Symbol Stack Input Tokens Action ---- --------------------- --------------------- ------------------------------- 1 $ 3 * 4 + 5$ Shift 3 2 $ 3 * 4 + 5$ Reduce : expression : NUMBER 3 $ expr * 4 + 5$ Shift * 4 $ expr * 4 + 5$ Shift 4 5 $ expr * 4 + 5$ Reduce: expression : NUMBER 6 $ expr * expr + 5$ SHIFT/REDUCE CONFLICT ????
By default, all shift/reduce conflicts are resolved in favor of shifting. Therefore, in the above example, the parser will always shift the + instead of reducing. Although this strategy works in many cases (for example, the case of "if-then" versus "if-then-else"), it is not enough for arithmetic expressions. In fact, in the above example, the decision to shift + is completely wrong---we should have reduced expr * expr since multiplication has higher mathematical precedence than addition.
To resolve ambiguity, especially in expression grammars, yacc.py allows individual tokens to be assigned a precedence level and associativity. This is done by adding a variable precedence to the grammar file like this:
This declaration specifies that PLUS/MINUS have the same precedence level and are left-associative and that TIMES/DIVIDE have the same precedence and are left-associative. Within the precedence declaration, tokens are ordered from lowest to highest precedence. Thus, this declaration specifies that TIMES/DIVIDE have higher precedence than PLUS/MINUS (since they appear later in the precedence specification).precedence = ( ('left', 'PLUS', 'MINUS'), ('left', 'TIMES', 'DIVIDE'), )
The precedence specification works by associating a numerical precedence level value and associativity direction to the listed tokens. For example, in the above example you get:
These values are then used to attach a numerical precedence value and associativity direction to each grammar rule. This is always determined by looking at the precedence of the right-most terminal symbol. For example:PLUS : level = 1, assoc = 'left' MINUS : level = 1, assoc = 'left' TIMES : level = 2, assoc = 'left' DIVIDE : level = 2, assoc = 'left'
When shift/reduce conflicts are encountered, the parser generator resolves the conflict by looking at the precedence rules and associativity specifiers.expression : expression PLUS expression # level = 1, left | expression MINUS expression # level = 1, left | expression TIMES expression # level = 2, left | expression DIVIDE expression # level = 2, left | LPAREN expression RPAREN # level = None (not specified) | NUMBER # level = None (not specified)
When shift/reduce conflicts are resolved using the first three techniques (with the help of precedence rules), yacc.py will report no errors or conflicts in the grammar (although it will print some information in the parser.out debugging file).
One problem with the precedence specifier technique is that it is sometimes necessary to change the precedence of an operator in certain contexts. For example, consider a unary-minus operator in "3 + 4 * -5". Mathematically, the unary minus is normally given a very high precedence--being evaluated before the multiply. However, in our precedence specifier, MINUS has a lower precedence than TIMES. To deal with this, precedence rules can be given for so-called "fictitious tokens" like this:
Now, in the grammar file, we can write our unary minus rule like this:precedence = ( ('left', 'PLUS', 'MINUS'), ('left', 'TIMES', 'DIVIDE'), ('right', 'UMINUS'), # Unary minus operator )
In this case, %prec UMINUS overrides the default rule precedence--setting it to that of UMINUS in the precedence specifier.def p_expr_uminus(p): 'expression : MINUS expression %prec UMINUS' p[0] = -p[2]
At first, the use of UMINUS in this example may appear very confusing. UMINUS is not an input token or a grammer rule. Instead, you should think of it as the name of a special marker in the precedence table. When you use the %prec qualifier, you're simply telling yacc that you want the precedence of the expression to be the same as for this special marker instead of the usual precedence.
It is also possible to specify non-associativity in the precedence table. This would be used when you don't want operations to chain together. For example, suppose you wanted to support comparison operators like < and > but you didn't want to allow combinations like a < b < c. To do this, simply specify a rule like this:
precedence = ( ('nonassoc', 'LESSTHAN', 'GREATERTHAN'), # Nonassociative operators ('left', 'PLUS', 'MINUS'), ('left', 'TIMES', 'DIVIDE'), ('right', 'UMINUS'), # Unary minus operator )
If you do this, the occurrence of input text such as a < b < c will result in a syntax error. However, simple expressions such as a < b will still be fine.
Reduce/reduce conflicts are caused when there are multiple grammar rules that can be applied to a given set of symbols. This kind of conflict is almost always bad and is always resolved by picking the rule that appears first in the grammar file. Reduce/reduce conflicts are almost always caused when different sets of grammar rules somehow generate the same set of symbols. For example:
In this case, a reduce/reduce conflict exists between these two rules:assignment : ID EQUALS NUMBER | ID EQUALS expression expression : expression PLUS expression | expression MINUS expression | expression TIMES expression | expression DIVIDE expression | LPAREN expression RPAREN | NUMBER
For example, if you wrote "a = 5", the parser can't figure out if this is supposed to be reduced as assignment : ID EQUALS NUMBER or whether it's supposed to reduce the 5 as an expression and then reduce the rule assignment : ID EQUALS expression.assignment : ID EQUALS NUMBER expression : NUMBER
It should be noted that reduce/reduce conflicts are notoriously difficult to spot simply looking at the input grammer. When a reduce/reduce conflict occurs, yacc() will try to help by printing a warning message such as this:
This message identifies the two rules that are in conflict. However, it may not tell you how the parser arrived at such a state. To try and figure it out, you'll probably have to look at your grammar and the contents of the parser.out debugging file with an appropriately high level of caffeination.WARNING: 1 reduce/reduce conflict WARNING: reduce/reduce conflict in state 15 resolved using rule (assignment -> ID EQUALS NUMBER) WARNING: rejected rule (expression -> NUMBER)
The different states that appear in this file are a representation of every possible sequence of valid input tokens allowed by the grammar. When receiving input tokens, the parser is building up a stack and looking for matching rules. Each state keeps track of the grammar rules that might be in the process of being matched at that point. Within each rule, the "." character indicates the current location of the parse within that rule. In addition, the actions for each valid input token are listed. When a shift/reduce or reduce/reduce conflict arises, rules not selected are prefixed with an !. For example:Unused terminals: Grammar Rule 1 expression -> expression PLUS expression Rule 2 expression -> expression MINUS expression Rule 3 expression -> expression TIMES expression Rule 4 expression -> expression DIVIDE expression Rule 5 expression -> NUMBER Rule 6 expression -> LPAREN expression RPAREN Terminals, with rules where they appear TIMES : 3 error : MINUS : 2 RPAREN : 6 LPAREN : 6 DIVIDE : 4 PLUS : 1 NUMBER : 5 Nonterminals, with rules where they appear expression : 1 1 2 2 3 3 4 4 6 0 Parsing method: LALR state 0 S' -> . expression expression -> . expression PLUS expression expression -> . expression MINUS expression expression -> . expression TIMES expression expression -> . expression DIVIDE expression expression -> . NUMBER expression -> . LPAREN expression RPAREN NUMBER shift and go to state 3 LPAREN shift and go to state 2 state 1 S' -> expression . expression -> expression . PLUS expression expression -> expression . MINUS expression expression -> expression . TIMES expression expression -> expression . DIVIDE expression PLUS shift and go to state 6 MINUS shift and go to state 5 TIMES shift and go to state 4 DIVIDE shift and go to state 7 state 2 expression -> LPAREN . expression RPAREN expression -> . expression PLUS expression expression -> . expression MINUS expression expression -> . expression TIMES expression expression -> . expression DIVIDE expression expression -> . NUMBER expression -> . LPAREN expression RPAREN NUMBER shift and go to state 3 LPAREN shift and go to state 2 state 3 expression -> NUMBER . $ reduce using rule 5 PLUS reduce using rule 5 MINUS reduce using rule 5 TIMES reduce using rule 5 DIVIDE reduce using rule 5 RPAREN reduce using rule 5 state 4 expression -> expression TIMES . expression expression -> . expression PLUS expression expression -> . expression MINUS expression expression -> . expression TIMES expression expression -> . expression DIVIDE expression expression -> . NUMBER expression -> . LPAREN expression RPAREN NUMBER shift and go to state 3 LPAREN shift and go to state 2 state 5 expression -> expression MINUS . expression expression -> . expression PLUS expression expression -> . expression MINUS expression expression -> . expression TIMES expression expression -> . expression DIVIDE expression expression -> . NUMBER expression -> . LPAREN expression RPAREN NUMBER shift and go to state 3 LPAREN shift and go to state 2 state 6 expression -> expression PLUS . expression expression -> . expression PLUS expression expression -> . expression MINUS expression expression -> . expression TIMES expression expression -> . expression DIVIDE expression expression -> . NUMBER expression -> . LPAREN expression RPAREN NUMBER shift and go to state 3 LPAREN shift and go to state 2 state 7 expression -> expression DIVIDE . expression expression -> . expression PLUS expression expression -> . expression MINUS expression expression -> . expression TIMES expression expression -> . expression DIVIDE expression expression -> . NUMBER expression -> . LPAREN expression RPAREN NUMBER shift and go to state 3 LPAREN shift and go to state 2 state 8 expression -> LPAREN expression . RPAREN expression -> expression . PLUS expression expression -> expression . MINUS expression expression -> expression . TIMES expression expression -> expression . DIVIDE expression RPAREN shift and go to state 13 PLUS shift and go to state 6 MINUS shift and go to state 5 TIMES shift and go to state 4 DIVIDE shift and go to state 7 state 9 expression -> expression TIMES expression . expression -> expression . PLUS expression expression -> expression . MINUS expression expression -> expression . TIMES expression expression -> expression . DIVIDE expression $ reduce using rule 3 PLUS reduce using rule 3 MINUS reduce using rule 3 TIMES reduce using rule 3 DIVIDE reduce using rule 3 RPAREN reduce using rule 3 ! PLUS [ shift and go to state 6 ] ! MINUS [ shift and go to state 5 ] ! TIMES [ shift and go to state 4 ] ! DIVIDE [ shift and go to state 7 ] state 10 expression -> expression MINUS expression . expression -> expression . PLUS expression expression -> expression . MINUS expression expression -> expression . TIMES expression expression -> expression . DIVIDE expression $ reduce using rule 2 PLUS reduce using rule 2 MINUS reduce using rule 2 RPAREN reduce using rule 2 TIMES shift and go to state 4 DIVIDE shift and go to state 7 ! TIMES [ reduce using rule 2 ] ! DIVIDE [ reduce using rule 2 ] ! PLUS [ shift and go to state 6 ] ! MINUS [ shift and go to state 5 ] state 11 expression -> expression PLUS expression . expression -> expression . PLUS expression expression -> expression . MINUS expression expression -> expression . TIMES expression expression -> expression . DIVIDE expression $ reduce using rule 1 PLUS reduce using rule 1 MINUS reduce using rule 1 RPAREN reduce using rule 1 TIMES shift and go to state 4 DIVIDE shift and go to state 7 ! TIMES [ reduce using rule 1 ] ! DIVIDE [ reduce using rule 1 ] ! PLUS [ shift and go to state 6 ] ! MINUS [ shift and go to state 5 ] state 12 expression -> expression DIVIDE expression . expression -> expression . PLUS expression expression -> expression . MINUS expression expression -> expression . TIMES expression expression -> expression . DIVIDE expression $ reduce using rule 4 PLUS reduce using rule 4 MINUS reduce using rule 4 TIMES reduce using rule 4 DIVIDE reduce using rule 4 RPAREN reduce using rule 4 ! PLUS [ shift and go to state 6 ] ! MINUS [ shift and go to state 5 ] ! TIMES [ shift and go to state 4 ] ! DIVIDE [ shift and go to state 7 ] state 13 expression -> LPAREN expression RPAREN . $ reduce using rule 6 PLUS reduce using rule 6 MINUS reduce using rule 6 TIMES reduce using rule 6 DIVIDE reduce using rule 6 RPAREN reduce using rule 6
By looking at these rules (and with a little practice), you can usually track down the source of most parsing conflicts. It should also be stressed that not all shift-reduce conflicts are bad. However, the only way to be sure that they are resolved correctly is to look at parser.out.! TIMES [ reduce using rule 2 ] ! DIVIDE [ reduce using rule 2 ] ! PLUS [ shift and go to state 6 ] ! MINUS [ shift and go to state 5 ]
When a syntax error occurs, yacc.py performs the following steps:
To account for the possibility of a bad expression, you might write an additional grammar rule like this:def p_statement_print(p): 'statement : PRINT expr SEMI' ...
In this case, the error token will match any sequence of tokens that might appear up to the first semicolon that is encountered. Once the semicolon is reached, the rule will be invoked and the error token will go away.def p_statement_print_error(p): 'statement : PRINT error SEMI' print "Syntax error in print statement. Bad expression"
This type of recovery is sometimes known as parser resynchronization. The error token acts as a wildcard for any bad input text and the token immediately following error acts as a synchronization token.
It is important to note that the error token usually does not appear as the last token on the right in an error rule. For example:
This is because the first bad token encountered will cause the rule to be reduced--which may make it difficult to recover if more bad tokens immediately follow.def p_statement_print_error(p): 'statement : PRINT error' print "Syntax error in print statement. Bad expression"
Panic mode recovery is implemented entirely in the p_error() function. For example, this function starts discarding tokens until it reaches a closing '}'. Then, it restarts the parser in its initial state.
def p_error(p): print "Whoa. You are seriously hosed." # Read ahead looking for a closing '}' while 1: tok = yacc.token() # Get the next token if not tok or tok.type == 'RBRACE': break yacc.restart()
This function simply discards the bad token and tells the parser that the error was ok.
def p_error(p): print "Syntax error at token", p.type # Just discard the token and tell the parser it's okay. yacc.errok()
Within the p_error() function, three functions are available to control the behavior of the parser:
To supply the next lookahead token to the parser, p_error() can return a token. This might be useful if trying to synchronize on special characters. For example:
def p_error(p): # Read ahead looking for a terminating ";" while 1: tok = yacc.token() # Get the next token if not tok or tok.type == 'SEMI': break yacc.errok() # Return SEMI to the parser as the next lookahead token return tok
The effect of raising SyntaxError is the same as if the last symbol shifted onto the parsing stack was actually a syntax error. Thus, when you do this, the last symbol shifted is popped off of the parsing stack and the current lookahead token is set to an error token. The parser then enters error-recovery mode where it tries to reduce rules that can accept error tokens. The steps that follow from this point are exactly the same as if a syntax error were detected and p_error() were called.def p_production(p): 'production : some production ...' raise SyntaxError
One important aspect of manually setting an error is that the p_error() function will NOT be called in this case. If you need to issue an error message, make sure you do it in the production that raises SyntaxError.
Note: This feature of PLY is meant to mimic the behavior of the YYERROR macro in yacc.
As an optional feature, yacc.py can automatically track line numbers and positions for all of the grammar symbols as well. However, this extra tracking requires extra processing and can significantly slow down parsing. Therefore, it must be enabled by passing the tracking=True option to yacc.parse(). For example:def p_expression(p): 'expression : expression PLUS expression' line = p.lineno(2) # line number of the PLUS token index = p.lexpos(2) # Position of the PLUS token
Once enabled, the lineno() and lexpos() methods work for all grammar symbols. In addition, two additional methods can be used:yacc.parse(data,tracking=True)
Note: The lexspan() function only returns the range of values up to the start of the last grammar symbol.def p_expression(p): 'expression : expression PLUS expression' p.lineno(1) # Line number of the left expression p.lineno(2) # line number of the PLUS operator p.lineno(3) # line number of the right expression ... start,end = p.linespan(3) # Start,end lines of the right expression starti,endi = p.lexspan(3) # Start,end positions of right expression
Although it may be convenient for PLY to track position information on all grammar symbols, this is often unnecessary. For example, if you are merely using line number information in an error message, you can often just key off of a specific token in the grammar rule. For example:
def p_bad_func(p): 'funccall : fname LPAREN error RPAREN' # Line number reported from LPAREN token print "Bad function call at line", p.lineno(2)
Similarly, you may get better parsing performance if you only selectively propagate line number information where it's needed using the p.set_lineno() method. For example:
PLY doesn't retain line number information from rules that have already been parsed. If you are building an abstract syntax tree and need to have line numbers, you should make sure that the line numbers appear in the tree itself.def p_fname(p): 'fname : ID' p[0] = p[1] p.set_lineno(0,p.lineno(1))
A minimal way to construct a tree is to simply create and propagate a tuple or list in each grammar rule function. There are many possible ways to do this, but one example would be something like this:
def p_expression_binop(p): '''expression : expression PLUS expression | expression MINUS expression | expression TIMES expression | expression DIVIDE expression''' p[0] = ('binary-expression',p[2],p[1],p[3]) def p_expression_group(p): 'expression : LPAREN expression RPAREN' p[0] = ('group-expression',p[2]) def p_expression_number(p): 'expression : NUMBER' p[0] = ('number-expression',p[1])
Another approach is to create a set of data structure for different kinds of abstract syntax tree nodes and assign nodes to p[0] in each rule. For example:
The advantage to this approach is that it may make it easier to attach more complicated semantics, type checking, code generation, and other features to the node classes.class Expr: pass class BinOp(Expr): def __init__(self,left,op,right): self.type = "binop" self.left = left self.right = right self.op = op class Number(Expr): def __init__(self,value): self.type = "number" self.value = value def p_expression_binop(p): '''expression : expression PLUS expression | expression MINUS expression | expression TIMES expression | expression DIVIDE expression''' p[0] = BinOp(p[1],p[2],p[3]) def p_expression_group(p): 'expression : LPAREN expression RPAREN' p[0] = p[2] def p_expression_number(p): 'expression : NUMBER' p[0] = Number(p[1])
To simplify tree traversal, it may make sense to pick a very generic tree structure for your parse tree nodes. For example:
class Node: def __init__(self,type,children=None,leaf=None): self.type = type if children: self.children = children else: self.children = [ ] self.leaf = leaf def p_expression_binop(p): '''expression : expression PLUS expression | expression MINUS expression | expression TIMES expression | expression DIVIDE expression''' p[0] = Node("binop", [p[1],p[3]], p[2])
def p_foo(p): "foo : A B C D" print "Parsed a foo", p[1],p[2],p[3],p[4]
In this case, the supplied action code only executes after all of the symbols A, B, C, and D have been parsed. Sometimes, however, it is useful to execute small code fragments during intermediate stages of parsing. For example, suppose you wanted to perform some action immediately after A has been parsed. To do this, write an empty rule like this:
def p_foo(p): "foo : A seen_A B C D" print "Parsed a foo", p[1],p[3],p[4],p[5] print "seen_A returned", p[2] def p_seen_A(p): "seen_A :" print "Saw an A = ", p[-1] # Access grammar symbol to left p[0] = some_value # Assign value to seen_A
In this example, the empty seen_A rule executes immediately after A is shifted onto the parsing stack. Within this rule, p[-1] refers to the symbol on the stack that appears immediately to the left of the seen_A symbol. In this case, it would be the value of A in the foo rule immediately above. Like other rules, a value can be returned from an embedded action by simply assigning it to p[0]
The use of embedded actions can sometimes introduce extra shift/reduce conflicts. For example, this grammar has no conflicts:
However, if you insert an embedded action into one of the rules like this,def p_foo(p): """foo : abcd | abcx""" def p_abcd(p): "abcd : A B C D" def p_abcx(p): "abcx : A B C X"
an extra shift-reduce conflict will be introduced. This conflict is caused by the fact that the same symbol C appears next in both the abcd and abcx rules. The parser can either shift the symbol (abcd rule) or reduce the empty rule seen_AB (abcx rule).def p_foo(p): """foo : abcd | abcx""" def p_abcd(p): "abcd : A B C D" def p_abcx(p): "abcx : A B seen_AB C X" def p_seen_AB(p): "seen_AB :"
A common use of embedded rules is to control other aspects of parsing such as scoping of local variables. For example, if you were parsing C code, you might write code like this:
In this case, the embedded action new_scope executes immediately after a LBRACE ({) symbol is parsed. This might adjust internal symbol tables and other aspects of the parser. Upon completion of the rule statements_block, code might undo the operations performed in the embedded action (e.g., pop_scope()).def p_statements_block(p): "statements: LBRACE new_scope statements RBRACE""" # Action code ... pop_scope() # Return to previous scope def p_new_scope(p): "new_scope :" # Create a new scope for local variables s = new_scope() push_scope(s) ...
Note: LALR table generation takes approximately twice as long as SLR table generation. There is no difference in actual parsing performance---the same code is used in both cases. LALR is preferred when working with more complicated grammars since it is more powerful.yacc.yacc(method="SLR")
in this case, x must be a Lexer object that minimally has a x.token() method for retrieving the next token. If an input string is given to yacc.parse(), the lexer must also have an x.input() method.yacc.parse(lexer=x)
yacc.yacc(debug=0)
yacc.yacc(tabmodule="foo")
yacc.yacc(tabmodule="foo",outputdir="somedirectory")
Note: If you disable table generation, yacc() will regenerate the parsing tables each time it runs (which may take awhile depending on how large your grammar is).yacc.yacc(write_tables=0)
yacc.parse(debug=1)
Note: The function yacc.parse() is bound to the last parser that was generated.p = yacc.yacc() ... p.parse()
It should be noted that table generation is reasonably efficient, even for grammars that involve around a 100 rules and several hundred states. For more complex languages such as C, table generation may take 30-60 seconds on a slow machine. Please be patient.
As a general rules this isn't a problem. However, to make it work, you need to carefully make sure everything gets hooked up correctly. First, make sure you save the objects returned by lex() and yacc(). For example:
Next, when parsing, make sure you give the parse() function a reference to the lexer it should be using. For example:lexer = lex.lex() # Return lexer object parser = yacc.yacc() # Return parser object
If you forget to do this, the parser will use the last lexer created--which is not always what you want.parser.parse(text,lexer=lexer)
Within lexer and parser rule functions, these objects are also available. In the lexer, the "lexer" attribute of a token refers to the lexer object that triggered the rule. For example:
In the parser, the "lexer" and "parser" attributes refer to the lexer and parser objects respectively.def t_NUMBER(t): r'\d+' ... print t.lexer # Show lexer object
If necessary, arbitrary attributes can be attached to the lexer or parser object. For example, if you wanted to have different parsing modes, you could attach a mode attribute to the parser object and look at it later.def p_expr_plus(p): 'expr : expr PLUS expr' ... print p.parser # Show parser object print p.lexer # Show lexer object
then PLY can later be used when Python runs in optimized mode. To make this work, make sure you first run Python in normal mode. Once the lexing and parsing tables have been generated the first time, run Python in optimized mode. PLY will use the tables without the need for doc strings.lex.lex(optimize=1) yacc.yacc(optimize=1)
Beware: running PLY in optimized mode disables a lot of error checking. You should only do this when your project has stabilized and you don't need to do any debugging. One of the purposes of optimized mode is to substantially decrease the startup time of your compiler (by assuming that everything is already properly specified and works).
Debugging a compiler is typically not an easy task. PLY provides some advanced diagonistic capabilities through the use of Python's logging module. The next two sections describe this:
Both the lex() and yacc() commands have a debugging mode that can be enabled using the debug flag. For example:
Normally, the output produced by debugging is routed to either standard error or, in the case of yacc(), to a file parser.out. This output can be more carefully controlled by supplying a logging object. Here is an example that adds information about where different debugging messages are coming from:lex.lex(debug=True) yacc.yacc(debug=True)
If you supply a custom logger, the amount of debugging information produced can be controlled by setting the logging level. Typically, debugging messages are either issued at the DEBUG, INFO, or WARNING levels.# Set up a logging object import logging logging.basicConfig( level = logging.DEBUG, filename = "parselog.txt", filemode = "w", format = "%(filename)10s:%(lineno)4d:%(message)s" ) log = logging.getLogger() lex.lex(debug=True,debuglog=log) yacc.yacc(debug=True,debuglog=log)
PLY's error messages and warnings are also produced using the logging interface. This can be controlled by passing a logging object using the errorlog parameter.
If you want to completely silence warnings, you can either pass in a logging object with an appropriate filter level or use the NullLogger object defined in either lex or yacc. For example:lex.lex(errorlog=log) yacc.yacc(errorlog=log)
yacc.yacc(errorlog=yacc.NullLogger())
To enable run-time debugging of a parser, use the debug option to parse. This option can either be an integer (which simply turns debugging on or off) or an instance of a logger object. For example:
If a logging object is passed, you can use its filtering level to control how much output gets generated. The INFO level is used to produce information about rule reductions. The DEBUG level will show information about the parsing stack, token shifts, and other details. The ERROR level shows information related to parsing errors.log = logging.getLogger() parser.parse(input,debug=log)
For very complicated problems, you should pass in a logging object that redirects to a file where you can more easily inspect the output after execution.