We study the set T_A of infinite binary trees with nodes labelled in a semiring A from a coalgebraic perspective. We present coinductive definition and proof principles based on the fact that T_A carries a final coalgebra structure. By viewing trees as formal power series, we develop a calculus where definitions are presented as behavioural differential equations. We present a general format for these equations that guarantees the existence and uniqueness of solutions. Although technically not very difficult, the resulting framework has surprisingly nice applications, which is illustrated by various concrete examples
We show that coinductive predicates expressing behavioural properties of infinite objects can be the...
AbstractInfinite trees naturally arise in the formalization and the study of the semantics of progra...
International audienceThis article is inspired by two works from the early 90s. The first one is by ...
We study the set T_A of infinite binary trees with nodes labelled in a semiring A from a coalgebraic...
AbstractWe study the set TA of infinite binary trees with nodes labelled in a semiring A from a coal...
We study the set TA of infinite binary trees with nodes labelled in a semiring A from a coalgebraic ...
Abstract. We study the set TA of infinite binary trees with nodes labelled in a semiring A from a co...
We study the set TA of infinite binary trees with nodes labelled in a semiring A from a coalgebraic ...
AbstractWe present a theory of streams (infinite sequences), automata and languages, and formal powe...
AbstractThis paper shows that the approach of [P. Aczel, J. Adámek, S. Milius, and J. Velebil, Infin...
textabstractStreams, (automata and) languages, and formal power series are viewed coalgebraically. I...
Based on the presence of a final coalgebra structure on the set of streams (infinite sequences of re...
We develop a coinductive calculus of streams based on the presence of a final coalgebra structure on...
AbstractIn this article we present a method to define algebraic structure (field operations) on a re...
AbstractThe algebra of infinite trees is, as proved by C. Elgot, completely iterative, i.e., all ide...
We show that coinductive predicates expressing behavioural properties of infinite objects can be the...
AbstractInfinite trees naturally arise in the formalization and the study of the semantics of progra...
International audienceThis article is inspired by two works from the early 90s. The first one is by ...
We study the set T_A of infinite binary trees with nodes labelled in a semiring A from a coalgebraic...
AbstractWe study the set TA of infinite binary trees with nodes labelled in a semiring A from a coal...
We study the set TA of infinite binary trees with nodes labelled in a semiring A from a coalgebraic ...
Abstract. We study the set TA of infinite binary trees with nodes labelled in a semiring A from a co...
We study the set TA of infinite binary trees with nodes labelled in a semiring A from a coalgebraic ...
AbstractWe present a theory of streams (infinite sequences), automata and languages, and formal powe...
AbstractThis paper shows that the approach of [P. Aczel, J. Adámek, S. Milius, and J. Velebil, Infin...
textabstractStreams, (automata and) languages, and formal power series are viewed coalgebraically. I...
Based on the presence of a final coalgebra structure on the set of streams (infinite sequences of re...
We develop a coinductive calculus of streams based on the presence of a final coalgebra structure on...
AbstractIn this article we present a method to define algebraic structure (field operations) on a re...
AbstractThe algebra of infinite trees is, as proved by C. Elgot, completely iterative, i.e., all ide...
We show that coinductive predicates expressing behavioural properties of infinite objects can be the...
AbstractInfinite trees naturally arise in the formalization and the study of the semantics of progra...
International audienceThis article is inspired by two works from the early 90s. The first one is by ...