Brzozowski derivative

Brzozowski derivative (on red background) of a dictionary string set with respect to the string "con"

In theoretical computer science, in particular in formal language theory, the Brzozowski derivative [math]\displaystyle{ u^{-1}S }[/math] of a set [math]\displaystyle{ S }[/math] of strings and a string [math]\displaystyle{ u }[/math] is the set of all strings obtainable from a string in [math]\displaystyle{ S }[/math] by cutting off the prefix [math]\displaystyle{ u }[/math]. Formally:

[math]\displaystyle{ u^{-1}S = \{v \in \Sigma^* \mid uv \in S\} }[/math].

For example,

[math]\displaystyle{ c^{-1}\{\text{cat}, \text{cow}, \text{dog}\} = \{\text{at}, \text{ow}\}. }[/math]

The Brzozowski derivative was introduced under various different names since the late 1950s.^[1][2][3] Today it is named after the computer scientist Janusz Brzozowski who investigated its properties and gave an algorithm to compute the derivative of a generalized regular expression.^[4]

Definition

Even though originally studied for regular expressions, the definition applies to arbitrary formal languages. Given any formal language [math]\displaystyle{ S }[/math] over an alphabet [math]\displaystyle{ \Sigma }[/math] and any string [math]\displaystyle{ u \in \Sigma^* }[/math], the derivative of [math]\displaystyle{ S }[/math] with respect to [math]\displaystyle{ u }[/math] is defined as:^[5]

[math]\displaystyle{ u^{-1}S = \{v \in \Sigma^* \mid uv \in S\} }[/math]

The Brzozowski derivative is a special case of left quotient by a singleton set containing only [math]\displaystyle{ u }[/math]: [math]\displaystyle{ \ u^{-1}S = \{u\} \;\backslash\; S }[/math].

Equivalently, for all [math]\displaystyle{ u,v \in \Sigma^* }[/math]:

[math]\displaystyle{ v \in u^{-1}S \;\Leftrightarrow\; uv \in S. }[/math]

From the definition, for all [math]\displaystyle{ u, v \in \Sigma^* }[/math]:

[math]\displaystyle{ (uv)^{-1}S = v^{-1}(u^{-1}S) }[/math]

since for all [math]\displaystyle{ w \in \Sigma^* }[/math], we have [math]\displaystyle{ w \in (uv)^{-1}S \Leftrightarrow uvw \in S \Leftrightarrow vw \in u^{-1}S \Leftrightarrow w \in v^{-1}(u^{-1}S) }[/math].

The derivative with respect to an arbitrary string reduces to successive derivatives over the symbols of that string, since for all [math]\displaystyle{ a \in \Sigma, u \in \Sigma^* }[/math]: [math]\displaystyle{ \begin{align} (ua)^{-1}S &= a^{-1}(u^{-1}S) \\ \varepsilon^{-1}S &= S \end{align} }[/math]

A language [math]\displaystyle{ S \subseteq \Sigma^* }[/math] is called nullable if and only if it contains the empty string [math]\displaystyle{ \varepsilon }[/math]. Each language [math]\displaystyle{ S }[/math] is uniquely determined by nullability of its derivatives:

[math]\displaystyle{ w \in S \ \Leftrightarrow\ \varepsilon \in w^{-1}S }[/math]

A language can be viewed as a (potentially infinite) boolean-labelled tree (see also tree (set theory) and infinite-tree automaton). Each possible string [math]\displaystyle{ w \in \Sigma^* }[/math] denotes a node in the tree, with label true when [math]\displaystyle{ w \in S }[/math] and false otherwise. In this interpretation, the derivative with respect to a symbol [math]\displaystyle{ a }[/math] corresponds to the subtree obtained by following the edge [math]\displaystyle{ a }[/math] from the root. Decomposing a tree into the root and the subtrees [math]\displaystyle{ a^{-1}S }[/math] corresponds to the following equality, which holds for every language [math]\displaystyle{ S \subseteq \Sigma^* }[/math]:

[math]\displaystyle{ S = (\{\varepsilon\} \cap S) \cup \bigcup_{a \in \Sigma} a(a^{-1}S). }[/math]

Derivatives of generalized regular expressions

When a language is given by a regular expression, the concept of derivatives leads to an algorithm for deciding whether a given word belongs to the regular expression.

Given a finite alphabet A of symbols,^[6] a generalized regular expression R denotes a possibly infinite set of finite-length strings over the alphabet A, called the language of R, denoted L(R).

A generalized regular expression can be one of the following (where a is a symbol of the alphabet A, and R and S are generalized regular expressions):

• "∅" denotes the empty set: L(∅) = {},
• "ε" denotes the singleton set containing the empty string: L(ε) = {ε},
• "a" denotes the singleton set containing the single-symbol string a: L(a) = {a},
• "R∨S" denotes the union of R and S: L(R∨S) = L(R) ∪ L(S),
• "R∧S" denotes the intersection of R and S: L(R∧S) = L(R) ∩ L(S),
• "¬R" denotes the complement of R (with respect to A*, the set of all strings over A): L(¬R) = A* \ L(R),
• "RS" denotes the concatenation of R and S: L(RS) = L(R) · L(S),
• "R*" denotes the Kleene closure of R: L(R*) = L(R)*.

In an ordinary regular expression, neither ∧ nor ¬ is allowed.

Computation

For any given generalized regular expression R and any string u, the derivative u⁻¹R is again a generalized regular expression (denoting the language u⁻¹L(R)).^[7] It may be computed recursively as follows.^[8]

Using the previous two rules, the derivative with respect to an arbitrary string is explained by the derivative with respect to a single-symbol string a. The latter can be computed as follows:^[9]

Here, ν(R) is an auxiliary function yielding a generalized regular expression that evaluates to the empty string ε if R 's language contains ε, and otherwise evaluates to ∅. This function can be computed by the following rules:^[10]

Properties

A string u is a member of the string set denoted by a generalized regular expression R if and only if ε is a member of the string set denoted by the derivative u⁻¹R.^[11]

Considering all the derivatives of a fixed generalized regular expression R results in only finitely many different languages. If their number is denoted by d_R, all these languages can be obtained as derivatives of R with respect to strings of length less than d_R.^[12] Furthermore, there is a complete deterministic finite automaton with d_R states that recognises the regular language given by R, as stated by the Myhill–Nerode theorem.

Derivatives of context-free languages

Derivatives are also effectively computable for recursively defined equations with regular expression operators, which are equivalent to context-free grammars. This insight was used to derive parsing algorithms for context-free languages.^[13] Implementation of such algorithms have shown to have cubic time complexity,^[14] corresponding to the complexity of the Earley parser on general context-free grammars.

See also

• Quotient of a formal language

References

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