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Are lexers and parsers really that different in theory ?

It seems fashionable to hate regular expressions: coding horror, another blog post.

However, popular lexing based tools: pygments, geshi, or prettify, all use regular expressions. They seem to lex anything...

When is lexing enough, when do you need EBNF ?

Has anyone used the tokens produced by these lexers with bison or antlr parser generators?

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yes. I am trying to parse autohotkey. I was able to build a syntax highlighter using pygments really fast. But antlr is taking much longer... I haven't seen a lot of cross pollination between the two tools. –  Naveen May 16 '10 at 9:32
Its only fashionable to hate regular expressions when they are misused. Many people try to use regular expressions when context-free parsing is needed. They always fail. And they blame regular expression technology. That's much like complaining that your hammer is a crummy saw. True, but you won't get a lot of sympathy. –  Ira Baxter May 17 '10 at 21:51
I am starting to pick up some speed with antlr, thankfully. A lot of lexing is context-free and sometimes even context dependent also by the way. –  Naveen May 25 '10 at 5:22
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4 Answers

up vote 169 down vote accepted

What parsers and lexers have in common:

  1. They read symbols of some alphabet from their input.
    Hint: The alphabet doesn't necessarily have to be of letters. But it has to be of symbols which are atomic for the language understood by parser/lexer.
    • Symbols for the lexer: ASCII characters.
    • Symbols for the parser: the particular tokens, which are terminal symbols of their grammar.
  2. They analyse these symbols and try to match them with the grammar of the language they understood.
    And here's where the real difference usually lies. See below for more.
    • Grammar understood by lexers: regular grammar (Chomsky's level 3).
    • Grammar understood by parsers: context-free grammar (Chomsky's level 2).
  3. They attach semantics (meaning) to the language pieces they find.
    • Lexers attach meaning by classifying lexemes (strings of symbols from the input) as the particular tokens. E.g. All these lexemes: *, ==, <=, ^ will be classified as "operator" token by the C/C++ lexer.
    • Parsers attach meaning by classifying strings of tokens from the input (sentences) as the particular nonterminals and building the parse tree. E.g. all these token strings: [number][operator][number], [id][operator][id], [id][operator][number][operator][number] will be classified as "expression" nonterminal by the C/C++ parser.
  4. They can attach some additional meaning (data) to the recognized elements. E.g. when a lexer recognizes a character sequence constituting a proper number, it can convert it to its binary value and store with the "number" token. Similarly, when a parser recognize an expression, it can compute its value and store with the "expression" node of the syntax tree.
  5. They all produce on their output a proper sentences of the language they recognize.
    • Lexers produce tokens, which are sentences of the regular language they recognize. Each token can have an inner syntax (though level 3, not level 2), but that doesn't matter for the output data and for the one which reads them.
    • Parsers produce syntax trees, which are representations of sentences of the context-free language they recognize. Usually it's only one big tree for the whole document/source file, because the whole document/source file is a proper sentence for them. But there aren't any reasons why parser couldn't produce a series of syntax trees on its output. E.g. it could be a parser which recognizes SGML tags sticked into plain-text. So it'll tokenize the SGML document into a series of tokens: [TXT][TAG][TAG][TXT][TAG][TXT]....

As you can see, parsers and tokenizers have much in common. One parser can be a tokenizer for other parser, which reads its input tokens as symbols from its own alphabet (tokens are simply symbols of some alphabet) in the same way as sentences from one language can be alphabetic symbols of some other, higher-level language. For example, if * and - are the symbols of the alphabet M (as "Morse code symbols"), then you can build a parser which recognizes strings of these dots and lines as letters encoded in the Morse code. The sentences in the language "Morse Code" could be tokens for some other parser, for which these tokens are atomic symbols of its language (e.g. "English Words" language). And these "English Words" could be tokens (symbols of the alphabet) for some higher-level parser which understands "English Sentences" language. And all these languages differ only in the complexity of the grammar. Nothing more.

So what's all about these "Chomsky's grammar levels"? Well, Noam Chomsky classified grammars into four levels depending on their complexity:

  • Level 3: Regular grammars
    They use regular expressions, that is, they can consist only of the symbols of alphabet (a,b), their concatenations (ab,aba,bbb etd.), or alternatives (e.g. a|b).
    They can be implemented as finite state automata (FSA), like NFA (Nondeterministic Finite Automaton) or better DFA (Deterministic Finite Automaton).
    Regular grammars can't handle with nested syntax, e.g. properly nested/matched parentheses (()()(()())), nested HTML/BBcode tags, nested blocks etc. It's because state automata to deal with it should have to have infinitely many states to handle infinitely many nesting levels.
  • Level 2: Context-free grammars
    They can have nested, recursive, self-similar branches in their syntax trees, so they can handle with nested structures well.
    They can be implemented as state automaton with stack. This stack is used to represent the nesting level of the syntax. In practice, they're usually implemented as a top-down, recursive-descent parser which uses machine's procedure call stack to track the nesting level, and use recursively called procedures/functions for every non-terminal symbol in their syntax.
    But they can't handle with a context-sensitive syntax. E.g. when you have an expression x+3 and in one context this x could be a name of a variable, and in other context it could be a name of a function etc.
  • Level 1: Context-sensitive grammars
  • Level 0: Unrestricted grammars
    Also called "phase-structure grammars".
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Oh yeah? So what are those "words or tokens"? They're just sentences in the regular language, consisting of letters of the alphabet. And what are those "constructs" or "trees" in the parser? They're also sentences, but in a different, higher-level language, for which the particular tokens are alphabetical symbols. The difference is not what you've said, but in the COMPLEXITY OF THE LANGUAGE USED. Confront your -1 with any handbook about the parsing theory. –  SasQ Feb 19 '12 at 18:20
@SasQ Would it be fair to say that both Lexers and Parsers take some grammar and a series of tokens as input ? –  Parag Jul 24 '12 at 12:01
Quite so. They both take a series of symbols from the alphabet they recognize. For lexer, this alphabet consists just of plain characters. For parser, the alphabet consists of terminal symbols, whatever they are defined. They could be characters, too, if you don't use lexer and use one-character identifiers and one-digit numbers etc (quite useful at first stages of developement). But they're usually tokens (lexical classes) because tokens are a good abstraction: you can change the actual lexemes (strings) they stand for, and parser doesn't see the change. –  SasQ Aug 2 '12 at 1:02
For example, you can use a terminal symbol STMT_END in your syntax (for the parser) to denote the end of instructions. Now you can have a token with the same name associated with it, generated by the lexer. But you can change the actual lexeme it stands for. Eg. you can define STMT_END as ; to have C/C++-like source code. Or you can define it as end to have it somehow similar to Pascal-style. Or you can define it as just '\n' to end the instruction with the end of line, like in Python. But the syntax of instruction (and the parser) stays unchanged :-) Only lexer needs to be changed. –  SasQ Aug 2 '12 at 1:08
Hours on wikipedia and google didn't help, but you explained Chomsky's grammars in 3 minutes. Thank you. –  enrey Mar 20 '13 at 15:26
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Yes, they are very different in theory, and in implementation.

Lexers are used to recognize "words" that make up language elements, because the structure of such words is generally simple. Regular expressions are extremely good at handling this simpler structure, and there are very high-performance regular-expression matching engines used to implement lexers.

Parsers are used to recognize "structure" of a language phrases. Such structure is generally far beyond what "regular expressions" can recognize, so one needs "context sensitive" parsers to extract such structure. Context-sensitive parsers are hard to build, so the engineering compromise is to use "context-free" grammars and add hacks to the parsers ("symbol tables", etc.) to handle the context-sensitive part.

Neither lexing nor parsing technology is likely to go away soon.

They may be unified by deciding to use "parsing" technology to recognize "words", as is currently explored by so-called scannerless GLR parsers. That has a runtime cost, as you are applying more general machinery to what is often a problem that doesn't need it, and usually you pay for that in overhead. Where you have lots of free cycles, that overhead may not matter. If you process a lot of text, then the overhead does matter and classical regular expression parsers will continue to be used.

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Nice explanation, Ira. Adding to your analogy: While lexers are about getting the words right, parsers are about getting the sentences right. "See spot run" and "spot run See" are both valid as far as a lexer is concerned. It takes a parser to determine that phrase structure is wrong (in English grammar). –  Alan May 24 '10 at 15:16
i guess a parser is to a lexer as a tree walker is to a parser. I am not convinced that the theory is that different: antlr.org/wiki/display/~admin/ANTLR+v4+lexers but I am starting to understand the differences in convention between them... –  Naveen May 25 '10 at 5:19
The theory is very different. Most parser technologies are trying to handle context-free languages to some degree (some do only part, e.g., LALR, some do it all, e.g., GLR). Most lexer technologies only try to do regular expressions. –  Ira Baxter Jun 8 '10 at 9:42
The theory is different, because it has been proposed by many different people and use different terminology and algorithms. But if you look them closely, you can spot the similarities. For example, the problem of left recursion is very similar to the problem of non-determinism in NFAs, and removing left recursion is similar to removing non-determinism and converting NFA into DFA. Tokens are sentences for the tokenizer (output), but alphabetical symbols for the parser (input). I don't deny the differences (Chomsky levels), but similarities help a lot in design. –  SasQ Feb 19 '12 at 18:24
My officemate was into category theory. He showed how the categorical theory notion of sheaves covered all kinds of pattern matching, and was able to derive LR parsing from an abstract categorical specification. So in fact, if you go abstract enough, you can find such commonalities. The point of category theory is you can often abstract "all the way up"; I'm sure you could build a category theory parser that erased the differences. But any practical uses of it have to instantiate down to the specific problem domain, and then the differences show up as real. –  Ira Baxter Oct 30 '13 at 0:55
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When is lexing enough, when do you need EBNF?

EBNF really doesn't add much to the power of grammars. It's just a convenience / shortcut notation / "syntactic sugar" over the standard Chomsky's Normal Form (CNF) grammar rules. For example, the EBNF alternative:

S --> A | B

you can achieve in CNF by just listing each alternative production separately:

S --> A      // `S` can be `A`,
S --> B      // or it can be `B`.

The optional element from EBNF:

S --> X?

you can achieve in CNF by using a nullable production, that is, the one which can be replaced by an empty string (denoted by just empty production here; others use epsilon or lambda or crossed circle):

S --> B       // `S` can be `B`,
B --> X       // and `B` can be just `X`,
B -->         // or it can be empty.

A production in a form like the last one B above is called "erasure", because it can erase whatever it stands for in other productions (product an empty string instead of something else).

Zero-or-more repetiton from EBNF:

S --> A*

you can obtan by using recursive production, that is, one which embeds itself somewhere in it. It can be done in two ways. First one is left recursion (which usually should be avoided, because Top-Down Recursive Descent parsers cannot parse it):

S --> S A    // `S` is just itself ended with `A` (which can be done many times),
S -->        // or it can begin with empty-string, which stops the recursion.

Knowing that it generates just an empty string (ultimately) followed by zero or more As, the same string (but not the same language!) can be expressed using right-recursion:

S --> A S    // `S` can be `A` followed by itself (which can be done many times),
S -->        // or it can be just empty-string end, which stops the recursion.

And when it comes to + for one-or-more repetition from EBNF:

S --> A+

it can be done by factoring out one A and using * as before:

S --> A A*

which you can express in CNF as such (I use right recursion here; try to figure out the other one yourself as an exercise):

S --> A S   // `S` can be one `A` followed by `S` (which stands for more `A`s),
S --> A     // or it could be just one single `A`.

Knowing that, you can now probably recognize a grammar for a regular expression (that is, regular grammar) as one which can be expressed in a single EBNF production consisting only from terminal symbols. More generally, you can recognize regular grammars when you see productions similar to these:

A -->        // Empty (nullable) production (AKA erasure).
B --> x      // Single terminal symbol.
C --> y D    // Simple state change from `C` to `D` when seeing input `y`.
E --> F z    // Simple state change from `E` to `F` when seeing input `z`.
G --> G u    // Left recursion.
H --> v H    // Right recursion.

That is, using only empty strings, terminal symbols, simple non-terminals for substitutions and state changes, and using recursion only to achieve repetition (iteration, which is just linear recursion - the one which doesn't branch tree-like). Nothing more advanced above these, then you're sure it's a regular syntax and you can go with just lexer for that.

But when your syntax uses recursion in a non-trivial way, to produce tree-like, self-similar, nested structures, like the following one:

S --> a S b    // `S` can be itself "parenthesized" by `a` and `b` on both sides.
S -->          // or it could be (ultimately) empty, which ends recursion.

then you can easily see that this cannot be done with regular expression, because you cannot resolve it into one single EBNF production in any way; you'll end up with substituting for S indefinitely, which will always add another as and bs on both sides. Lexers (more specifically: Finite State Automata used by lexers) cannot count to arbitrary number (they are finite, remember?), so they don't know how many as were there to match them evenly with so many bs. Grammars like this are called context-free grammars (at the very least), and they require a parser.

Context-free grammars are well-known to parse, so they are widely used for describing programming languages' syntax. But there's more. Sometimes a more general grammar is needed -- when you have more things to count at the same time, independently. For example, when you want to describe a language where one can use round parentheses and square braces interleaved, but they have to be paired up correctly with each other (braces with braces, round with round). This kind of grammar is called context-sensitive. You can recognize it by that it has more than one symbol on the left (before the arrow). For example:

A R B --> A S B

You can think of these additional symbols on the left as a "context" for applying the rule. There could be some preconditions, postconditions etc. For example, the above rule will substitute R into S, but only when it's in between A and B, leaving those A and B themselves unchanged. This kind of syntax is really hard to parse, because it needs a full-blown Turing machine. It's a whole another story, so I'll end here.

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There are a number of reasons why the analysis portion of a compiler is normally separated into lexical analysis and parsing ( syntax analysis) phases.

  1. Simplicity of design is the most important consideration. The separation of lexical and syntactic analysis often allows us to simplify at least one of these tasks. For example, a parser that had to deal with comments and white space as syntactic units would be. Considerably more complex than one that can assume comments and white space have already been removed by the lexical analyzer. If we are designing a new language, separating lexical and syntactic concerns can lead to a cleaner overall language design.
  2. Compiler efficiency is improved. A separate lexical analyzer allows us to apply specialized techniques that serve only the lexical task, not the job of parsing. In addition, specialized buffering techniques for reading input characters can speed up the compiler significantly.
  3. Compiler portability is enhanced. Input-device-specific peculiarities can be restricted to the lexical analyzer.

resource___Compilers (2nd Edition) written by- Alfred V. Abo Columbia University Monica S. Lam Stanford University Ravi Sethi Avaya Jeffrey D. Ullman Stanford University

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