Add to ORKGhtmlabstractBecause of the isomorphism (X x A) -> X = X -> (A -> X), the transition structure t: X -> (A -> X) of a deterministic automaton with state set X and with inputs from an alphabet A can be viewed both as an algebra and as a coalgebra. Here we will use this algebra-coalgebra duality of automata as a common perspective for the study of equations and coequations. Equations are sets of pairs of words (v,w) that are satisfied by a state x in X if they lead to the same state: x_v=x_w. Dually, coequations are sets of languages and are satisfied by x if the language accepted by x belongs to that set. For every automaton (X, t), we define two new automata: free(X, t) and cofree(X, t) that represent, respectively, the greatest set of ...
Contains fulltext : 132905.pdf (publisher's version ) (Closed access)30 p
AbstractA bialgebra is a structure which is simultaneously an algebra and a coalgebra, such that the...
Abstract. We study weighted automata from both an algebraic and a coalgebraic perspective. In partic...
Because of the isomorphism (X x A) -> X = X -> (A -> X), the transition structure t: X -> (A ->...
Because of the isomorphism (X × A) → X ∼ = X → (A → X), the transition structure of a deterministic...
AbstractBecause of the isomorphism (X×A)→X≅X→(A→X), the transition structure of a deterministic auto...
In this paper we use a duality result between equations and coequations for automata, proved by Ball...
In this paper we use a duality result between equations and coequations for automata, proved by Ball...
International audienceIn this paper we show duality results between categories of equations and cate...
International audienceIn this paper we show duality results between categories of equations and cate...
International audienceIn this paper we show duality results between categories of equations and cate...
International audienceIn this paper we show duality results between categories of equations and cate...
Contains fulltext : 147286.pdf (preprint version ) (Open Access
textabstractIn this paper we show duality results between categories of equations and categories of ...
AbstractBecause of the isomorphism (X×A)→X≅X→(A→X), the transition structure of a deterministic auto...
Contains fulltext : 132905.pdf (publisher's version ) (Closed access)30 p
AbstractA bialgebra is a structure which is simultaneously an algebra and a coalgebra, such that the...
Abstract. We study weighted automata from both an algebraic and a coalgebraic perspective. In partic...
Because of the isomorphism (X x A) -> X = X -> (A -> X), the transition structure t: X -> (A ->...
Because of the isomorphism (X × A) → X ∼ = X → (A → X), the transition structure of a deterministic...
AbstractBecause of the isomorphism (X×A)→X≅X→(A→X), the transition structure of a deterministic auto...
In this paper we use a duality result between equations and coequations for automata, proved by Ball...
In this paper we use a duality result between equations and coequations for automata, proved by Ball...
International audienceIn this paper we show duality results between categories of equations and cate...
International audienceIn this paper we show duality results between categories of equations and cate...
International audienceIn this paper we show duality results between categories of equations and cate...
International audienceIn this paper we show duality results between categories of equations and cate...
Contains fulltext : 147286.pdf (preprint version ) (Open Access
textabstractIn this paper we show duality results between categories of equations and categories of ...
AbstractBecause of the isomorphism (X×A)→X≅X→(A→X), the transition structure of a deterministic auto...
Contains fulltext : 132905.pdf (publisher's version ) (Closed access)30 p
AbstractA bialgebra is a structure which is simultaneously an algebra and a coalgebra, such that the...
Abstract. We study weighted automata from both an algebraic and a coalgebraic perspective. In partic...