Add to ORKGtextabstractStreams, (automata and) languages, and formal power series are viewed coalgebraically. In summary, this amounts to supplying these sets with a deterministic automaton structure, which has the universal property of being final. Finality then forms the basis for both definitions and proofs by coinduction, the coalgebraic counterpart of induction. Coinductive definitions take the shape of what we have called behavioural differential equations, after Brzozowski's notion of input derivative. A calculus is developed for coinductive reasoning about all of the afore mentioned structures, closely resembling (and at times generalising) calculus from classical analysis
In this article, we provide a coalgebraic account of parts of the mathematical theory un-derlying co...
Coinductive reasoning about infinitary structures such as streams is widely applicable. However, pra...
Coinduction is a method for specifying and reasoning about infinite data types and automata with inf...
AbstractWe present a theory of streams (infinite sequences), automata and languages, and formal powe...
AbstractBased on the presence of a final coalgebra structure on the set of streams (infinite sequenc...
We develop a coinductive calculus of streams based on the presence of a final coalgebra structure on...
Based on the presence of a final coalgebra structure on the set of streams (infinite sequences of re...
Coinduction is a mathematical tool that is used pervasively in computer science: to program and reas...
The classical theory of deterministic automata is presented in terms of the notions of homomorphism ...
We show that coinductive predicates expressing behavioural properties of infinite objects can be the...
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 ...
htmlabstractIn this article, we provide a coalgebraic account of parts of the mathematical theory un...
Building on recent work by Rutten on coinduction and formal power series, we define a denotational s...
Coinduction is a dual concept to induction; it has been discovered and studied recently. A simple wa...
In this article, we provide a coalgebraic account of parts of the mathematical theory un-derlying co...
Coinductive reasoning about infinitary structures such as streams is widely applicable. However, pra...
Coinduction is a method for specifying and reasoning about infinite data types and automata with inf...
AbstractWe present a theory of streams (infinite sequences), automata and languages, and formal powe...
AbstractBased on the presence of a final coalgebra structure on the set of streams (infinite sequenc...
We develop a coinductive calculus of streams based on the presence of a final coalgebra structure on...
Based on the presence of a final coalgebra structure on the set of streams (infinite sequences of re...
Coinduction is a mathematical tool that is used pervasively in computer science: to program and reas...
The classical theory of deterministic automata is presented in terms of the notions of homomorphism ...
We show that coinductive predicates expressing behavioural properties of infinite objects can be the...
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 ...
htmlabstractIn this article, we provide a coalgebraic account of parts of the mathematical theory un...
Building on recent work by Rutten on coinduction and formal power series, we define a denotational s...
Coinduction is a dual concept to induction; it has been discovered and studied recently. A simple wa...
In this article, we provide a coalgebraic account of parts of the mathematical theory un-derlying co...
Coinductive reasoning about infinitary structures such as streams is widely applicable. However, pra...
Coinduction is a method for specifying and reasoning about infinite data types and automata with inf...