In mathematics, computer science, and linguistics, a formal language is a set of strings of symbols that may be constrained by rules that are specific to it.
The alphabet of a formal language is the set of symbols, letters, or tokens from which the strings of the language may be formed; frequently it is required to be finite. The strings formed from this alphabet are called words, and the words that belong to a particular formal language are sometimes called wellformed words or wellformed formulas. A formal language is often defined by means of a formal grammar such as a regular grammar or contextfree grammar, also called its formation rule.
The field of formal language theory studies primarily the purely syntactical aspects of such languages—that is, their internal structural patterns. Formal language theory sprang out of linguistics, as a way of understanding the syntactic regularities of natural languages.
In computer science, formal languages are used among others as the basis for defining the grammar of programming languages and formalized versions of subsets of natural languages in which the words of the language represent concepts that are associated with particular meanings or semantics. In computational complexity theory, decision problems are typically defined as formal languages, and complexity classes are defined as the sets of the formal languages that can be parsed by machines with limited computational power. In logic and the foundations of mathematics, formal languages are used to represent the syntax of axiomatic systems, and mathematical formalism is the philosophy that all of mathematics can be reduced to the syntactic manipulation of formal languages in this way.
History
The first formal language is thought be the one used by Gottlob Frege in his Begriffsschrift (1879), literally meaning "concept writing", and which Frege described as a "formal language of pure thought."^{[1]}
Axel Thue's early SemiThue system which can be used for rewriting strings was influential on formal grammars.
Words over an alphabet
An alphabet, in the context of formal languages, can be any set, although it often makes sense to use an alphabet in the usual sense of the word, or more generally a character set such as ASCII or Unicode. Alphabets can also be infinite; e.g. firstorder logic is often expressed using an alphabet which, besides symbols such as ∧, ¬, ∀ and parentheses, contains infinitely many elements x_{0}, x_{1}, x_{2}, … that play the role of variables. The elements of an alphabet are called its letters.
A word over an alphabet can be any finite sequence, or string, of characters or letters, which sometimes may include spaces, and are separated by specified word separation characters. The set of all words over an alphabet Σ is usually denoted by Σ^{*} (using the Kleene star). The length of a word is the number of characters or letters it is composed of. For any alphabet there is only one word of length 0, the empty word, which is often denoted by e, ε or λ. By concatenation one can combine two words to form a new word, whose length is the sum of the lengths of the original words. The result of concatenating a word with the empty word is the original word.
In some applications, especially in logic, the alphabet is also known as the vocabulary and words are known as formulas or sentences; this breaks the letter/word metaphor and replaces it by a word/sentence metaphor.
Definition
A formal language L over an alphabet Σ is a subset of Σ^{*}, that is, a set of words over that alphabet. Sometimes the sets of words are grouped into expressions, whereas rules and constraints may be formulated for the creation of 'wellformed expressions'.
In computer science and mathematics, which do not usually deal with natural languages, the adjective "formal" is often omitted as redundant.
While formal language theory usually concerns itself with formal languages that are described by some syntactical rules, the actual definition of the concept "formal language" is only as above: a (possibly infinite) set of finitelength strings composed from a given alphabet, no more nor less. In practice, there are many languages that can be described by rules, such as regular languages or contextfree languages. The notion of a formal grammar may be closer to the intuitive concept of a "language," one described by syntactic rules. By an abuse of the definition, a particular formal language is often thought of as being equipped with a formal grammar that describes it.
Examples
The following rules describe a formal language Template:Mvar over the alphabet Σ = { 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, +, = }:
 Every nonempty string that does not contain "+" or "=" and does not start with "0" is in Template:Mvar.
 The string "0" is in Template:Mvar.
 A string containing "=" is in Template:Mvar if and only if there is exactly one "=", and it separates two valid strings of Template:Mvar.
 A string containing "+" but not "=" is in Template:Mvar if and only if every "+" in the string separates two valid strings of Template:Mvar.
 No string is in Template:Mvar other than those implied by the previous rules.
Under these rules, the string "23+4=555" is in Template:Mvar, but the string "=234=+" is not. This formal language expresses natural numbers, wellformed addition statements, and wellformed addition equalities, but it expresses only what they look like (their syntax), not what they mean (semantics). For instance, nowhere in these rules is there any indication that "0" means the number zero, or that "+" means addition.
Constructions
For finite languages one can explicitly enumerate all wellformed words. For example, we can describe a language Template:Mvar as just Template:Mvar = {"a", "b", "ab", "cba"}. The degenerate case of this construction is the empty language, which contains no words at all (Template:Mvar = ∅).
However, even over a finite (nonempty) alphabet such as Σ = {a, b} there are infinitely many words: "a", "abb", "ababba", "aaababbbbaab", …. Therefore formal languages are typically infinite, and describing an infinite formal language is not as simple as writing L = {"a", "b", "ab", "cba"}. Here are some examples of formal languages:
 Template:Mvar = Σ^{*}, the set of all words over Σ;
 Template:Mvar = {"a"}^{*} = {"a"^{n}}, where n ranges over the natural numbers and "a"^{n} means "a" repeated n times (this is the set of words consisting only of the symbol "a");
 the set of syntactically correct programs in a given programming language (the syntax of which is usually defined by a contextfree grammar);
 the set of inputs upon which a certain Turing machine halts; or
 the set of maximal strings of alphanumeric ASCII characters on this line, i.e., the set {"the", "set", "of", "maximal", "strings", "alphanumeric", "ASCII", "characters", "on", "this", "line", "i", "e"}.
Languagespecification formalisms
Formal language theory rarely concerns itself with particular languages (except as examples), but is mainly concerned with the study of various types of formalisms to describe languages. For instance, a language can be given as
Typical questions asked about such formalisms include:
 What is their expressive power? (Can formalism X describe every language that formalism Y can describe? Can it describe other languages?)
 What is their recognizability? (How difficult is it to decide whether a given word belongs to a language described by formalism X?)
 What is their comparability? (How difficult is it to decide whether two languages, one described in formalism X and one in formalism Y, or in X again, are actually the same language?).
Surprisingly often, the answer to these decision problems is "it cannot be done at all", or "it is extremely expensive" (with a characterization of how expensive). Therefore, formal language theory is a major application area of computability theory and complexity theory. Formal languages may be classified in the Chomsky hierarchy based on the expressive power of their generative grammar as well as the complexity of their recognizing automaton. Contextfree grammars and regular grammars provide a good compromise between expressivity and ease of parsing, and are widely used in practical applications.
Operations on languages
Certain operations on languages are common. This includes the standard set operations, such as union, intersection, and complement. Another class of operation is the elementwise application of string operations.
Examples: suppose L_{1} and L_{2} are languages over some common alphabet.
 The concatenation L_{1}L_{2} consists of all strings of the form vw where v is a string from L_{1} and w is a string from L_{2}.
 The intersection L_{1} ∩ L_{2} of L_{1} and L_{2} consists of all strings which are contained in both languages
 The complement ¬L of a language with respect to a given alphabet consists of all strings over the alphabet that are not in the language.
 The Kleene star: the language consisting of all words that are concatenations of 0 or more words in the original language;
 Reversal:
 Let e be the empty word, then e^{R} = e, and
 for each nonempty word w = x_{1}…x_{n} over some alphabet, let w^{R} = x_{n}…x_{1},
 then for a formal language L, L^{R} = {w^{R}  w ∈ L}.
 String homomorphism
Such string operations are used to investigate closure properties of classes of languages. A class of languages is closed under a particular operation when the operation, applied to languages in the class, always produces a language in the same class again. For instance, the contextfree languages are known to be closed under union, concatenation, and intersection with regular languages, but not closed under intersection or complement. The theory of trios and abstract families of languages studies the most common closure properties of language families in their own right.^{[2]}
Closure properties of language families ($L\_1$ Op $L\_2$ where both $L\_1$ and $L\_2$ are in the language family given by the column). After Hopcroft and Ullman.
Operation


Regular

DCFL

CFL

IND

CSL

recursive

RE

Union

w \in L_1 \lor w \in L_2\}

Yes

No

Yes

Yes

Yes

Yes

Yes

Intersection

w \in L_1 \land w \in L_2\}

Yes

No

No

No

Yes

Yes

Yes

Complement

w \not\in L_1\}

Yes

Yes

No

No

Yes

Yes

No

Concatenation

w \in L_1 \land z \in L_2\}

Yes

No

Yes

Yes

Yes

Yes

Yes

Kleene star

w \in L_1 \land z \in L_1^{*}\}

Yes

No

Yes

Yes

Yes

Yes

Yes

Homomorphism


Yes

No

Yes

Yes

No

No

Yes

efree Homomorphism


Yes

No

Yes

Yes

Yes

Yes

Yes

Substitution


Yes

No

Yes

Yes

Yes

No

Yes

Inverse Homomorphism


Yes

Yes

Yes

Yes

Yes

Yes

Yes

Reverse

w \in L\}

Yes

No

Yes

Yes

Yes

Yes

Yes

Intersection with a regular language

w \in L_1 \land w \in R\}, R \text{ regular}

Yes

Yes

Yes

Yes

Yes

Yes

Yes

Applications
Programming languages
A compiler usually has two distinct components. A lexical analyzer, generated by a tool like lex
, identifies the tokens of the programming language grammar, e.g. identifiers or keywords, which are themselves expressed in a simpler formal language, usually by means of regular expressions. At the most basic conceptual level, a parser, usually generated by a parser generator like yacc
, attempts to decide if the source program is valid, that is if it belongs to the programming language for which the compiler was built. Of course, compilers do more than just parse the source code—they usually translate it into some executable format. Because of this, a parser usually outputs more than a yes/no answer, typically an abstract syntax tree, which is used by subsequent stages of the compiler to eventually generate an executable containing machine code that runs directly on the hardware, or some intermediate code that requires a virtual machine to execute.
Formal theories, systems and proofs
In mathematical logic, a formal theory is a set of sentences expressed in a formal language.
A formal system (also called a logical calculus, or a logical system) consists of a formal language together with a deductive apparatus (also called a deductive system). The deductive apparatus may consist of a set of transformation rules which may be interpreted as valid rules of inference or a set of axioms, or have both. A formal system is used to derive one expression from one or more other expressions. Although a formal language can be identified with its formulas, a formal system cannot be likewise identified by its theorems. Two formal systems $\backslash mathcal\{FS\}$ and $\backslash mathcal\{FS\text{'}\}$ may have all the same theorems and yet differ in some significant prooftheoretic way (a formula A may be a syntactic consequence of a formula B in one but not another for instance).
A formal proof or derivation is a finite sequence of wellformed formulas (which may be interpreted as propositions) each of which is an axiom or follows from the preceding formulas in the sequence by a rule of inference. The last sentence in the sequence is a theorem of a formal system. Formal proofs are useful because their theorems can be interpreted as true propositions.
Interpretations and models
Formal languages are entirely syntactic in nature but may be given semantics that give meaning to the elements of the language. For instance, in mathematical logic, the set of possible formulas of a particular logic is a formal language, and an interpretation assigns a meaning to each of the formulas—usually, a truth value.
The study of interpretations of formal languages is called formal semantics. In mathematical logic, this is often done in terms of model theory. In model theory, the terms that occur in a formula are interpreted as mathematical structures, and fixed compositional interpretation rules determine how the truth value of the formula can be derived from the interpretation of its terms; a model for a formula is an interpretation of terms such that the formula becomes true.
See also
References
Notes
General references
 A. G. Hamilton, Logic for Mathematicians, Cambridge University Press, 1978, ISBN 0521218381.
 Seymour Ginsburg, Algebraic and automata theoretic properties of formal languages, NorthHolland, 1975, ISBN 0720425069.
 Michael A. Harrison, Introduction to Formal Language Theory, AddisonWesley, 1978.
 John E. Hopcroft and Jeffrey D. Ullman, Introduction to Automata Theory, Languages, and Computation, AddisonWesley Publishing, Reading Massachusetts, 1979. ISBN 8178083477.
 .
 Grzegorz Rozenberg, Arto Salomaa, Handbook of Formal Languages: Volume IIII, Springer, 1997, ISBN 3540614869.
 Patrick Suppes, Introduction to Logic, D. Van Nostrand, 1957, ISBN 0442080727.
 Andries van Renssen, Gellish, a Generic Extensible Ontological Language, Delft University Press, 2005, ISBN 9040725974.
External links
 Template:Planetmath reference
 Template:Planetmath reference
 Formal Language Definitions
 James Power, "Notes on Formal Language Theory and Parsing", 29 November 2002.
 Drafts of some chapters in the "Handbook of Formal Language Theory", Vol. 13, G. Rozenberg and A. Salomaa (eds.), Springer Verlag, (1997):
 Alexandru Mateescu and Arto Salomaa, "Preface" in Vol.1, pp. vviii, and "Formal Languages: An Introduction and a Synopsis", Chapter 1 in Vol. 1, pp.139
 Sheng Yu, "Regular Languages", Chapter 2 in Vol. 1
 JeanMichel Autebert, Jean Berstel, Luc Boasson, "ContextFree Languages and PushDown Automata", Chapter 3 in Vol. 1
 Christian Choffrut and Juhani Karhumäki, "Combinatorics of Words", Chapter 6 in Vol. 1
 Tero Harju and Juhani Karhumäki, "Morphisms", Chapter 7 in Vol. 1, pp. 439  510
 JeanEric Pin, "Syntactic semigroups", Chapter 10 in Vol. 1, pp. 679746
 M. Crochemore and C. Hancart, "Automata for matching patterns", Chapter 9 in Vol. 2
 Dora Giammarresi, Antonio Restivo, "Twodimensional Languages", Chapter 4 in Vol. 3, pp. 215  267


   Each category of languages is a proper subset of the category directly above it. Any automaton and any grammar in each category has an equivalent automaton or grammar in the category directly above it. 



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