We consider a set of eight natural operations on formal languages (Kleene closure, positive closure, complement, prefix, suffix, factor, subword, and reversal), and compositions of them. If x and y are compositions, we say x is equivalent to y if they have the same effect on all languages L. We prove that the number of equivalence classes of these eight operations is finite. This implies that the orbit of any language L under the elements of the monoid is finite and bounded, independently of L. This generalizes previous results about complement, Kleene closure, and positive closure. We also estimate the number of distinct languages generated by various subsets of these operations
htmlabstractThe main goal in this paper is to use a dual equivalence in automata theory started in [...
Abstract. We assign to each positive variety V and a fixed natural number k the class of all (positi...
A finite state language is a finite or infinite set of strings (sentences) of symbols (words) genera...
AbstractEach set of operations selected from union, intersection, complement, star, quotients, deriv...
peer reviewedWe consider a set of natural operations on languages, and prove that the orbit of any l...
AbstractWe investigate the decidability of the operation problem for T0L languages and subclasses. F...
We explore an analogy between the family B 1 of finite/cofinite languages and the family Y1 of langu...
AbstractLet A be a finite alphabet and A∗ the free monoid generated by A. A language is any subset o...
AbstractIt is well known that varieties of rational languages are in one-to-one correspondence with ...
Abstract. A language L is prefix-closed if, whenever a word w is in L, then every prefix of w is als...
We present an extension of Eilenberg's variety theorem, a well-known result connecting algebra to fo...
AbstractThe problem of homomorphism equivalence is to decide for some language L over some finite al...
AbstractWe investigate the state complexity of some operations on binary regular languages. In parti...
International audienceWe present an extension of Eilenberg's variety theorem, a well-known result co...
The family ℛ of run languages is a generalization of the family of finite/cofinite languages. For an...
htmlabstractThe main goal in this paper is to use a dual equivalence in automata theory started in [...
Abstract. We assign to each positive variety V and a fixed natural number k the class of all (positi...
A finite state language is a finite or infinite set of strings (sentences) of symbols (words) genera...
AbstractEach set of operations selected from union, intersection, complement, star, quotients, deriv...
peer reviewedWe consider a set of natural operations on languages, and prove that the orbit of any l...
AbstractWe investigate the decidability of the operation problem for T0L languages and subclasses. F...
We explore an analogy between the family B 1 of finite/cofinite languages and the family Y1 of langu...
AbstractLet A be a finite alphabet and A∗ the free monoid generated by A. A language is any subset o...
AbstractIt is well known that varieties of rational languages are in one-to-one correspondence with ...
Abstract. A language L is prefix-closed if, whenever a word w is in L, then every prefix of w is als...
We present an extension of Eilenberg's variety theorem, a well-known result connecting algebra to fo...
AbstractThe problem of homomorphism equivalence is to decide for some language L over some finite al...
AbstractWe investigate the state complexity of some operations on binary regular languages. In parti...
International audienceWe present an extension of Eilenberg's variety theorem, a well-known result co...
The family ℛ of run languages is a generalization of the family of finite/cofinite languages. For an...
htmlabstractThe main goal in this paper is to use a dual equivalence in automata theory started in [...
Abstract. We assign to each positive variety V and a fixed natural number k the class of all (positi...
A finite state language is a finite or infinite set of strings (sentences) of symbols (words) genera...