Quotient complexity of bifix-, factor-, and subword-free regular languages

A language L is prefix-free if whenever words u and v are in L and u is a prefix of v, then u = v. Suffix-, factor-, and subword-free languages are defined similarly, where by "subword" we mean "subsequence", and a language is bifix-free if it is both prefix- and suffix-free. The...

Teljes leírás

Elmentve itt :
Bibliográfiai részletek
Szerzők: Brzozowski Janusz
Jirásková Galina
Li Baiyu
Smith Joshua
Dokumentumtípus: Cikk
Megjelent: 2014
Sorozat:Acta cybernetica 21 No. 4
Kulcsszavak:Számítástechnika
Tárgyszavak:
doi:10.14232/actacyb.21.4.2014.1

Online Access:http://acta.bibl.u-szeged.hu/34823
Leíró adatok
Tartalmi kivonat:A language L is prefix-free if whenever words u and v are in L and u is a prefix of v, then u = v. Suffix-, factor-, and subword-free languages are defined similarly, where by "subword" we mean "subsequence", and a language is bifix-free if it is both prefix- and suffix-free. These languages have important applications in coding theory. The quotient complexity of an operation on regular languages is defined as the number of left quotients of the result of the operation as a function of the numbers of left quotients of the operands. The quotient complexity of a regular language is the same as its state complexity, which is the number of states in the complete minimal deterministic finite automaton accepting the language. The state/quotient complexity of operations in the classes of prefix- and suffix-free languages has been studied before. Here, we study the complexity of operations in the classes of bifix-, factor-, and subword-free languages. We find tight upper bounds on the quotient complexity of intersection, union, difference, symmetric difference, concatenation, star, and reversal in these three classes of languages.
Terjedelem/Fizikai jellemzők:507-527
ISSN:0324-721X