Prefix grammar

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In theoretical computer science and formal language theory, a prefix grammar is a type of string rewriting system, consisting of a set of string rewriting rules, and similar to a formal grammar or a semi-Thue system. What is specific about prefix grammars is not the shape of their rules, but the way in which they are applied: only prefixes are rewritten. The prefix grammars describe exactly all regular languages.[1]

Formal definition

A prefix grammar G is a 3-tuple, (Σ, S, P), where

  • Σ is a finite alphabet
  • S is a finite set of base strings over Σ
  • P is a finite set of production rules of the form uv where u and v are strings over Σ

For strings x, y, we write xG y (and say: G can derive y from x in one step) if there are strings u, v, w such that [math]\displaystyle{ x = vu, y = wu }[/math], and vw is in P. Note that G is a binary relation on the strings of Σ.

The language of G, denoted [math]\displaystyle{ L(G) }[/math], is the set of strings derivable from S in zero or more steps: formally, the set of strings w such that for some s in S, s R w, where R is the transitive closure of G.

Example

The prefix grammar

  • Σ = {0, 1}
  • S = {01, 10}
  • P = {0 → 010, 10 → 100}

describes the language defined by the regular expression

[math]\displaystyle{ 01(01)^* \cup 100^* }[/math]

See also

References