We develop a coinductive calculus of streams based on the presence of a final coalgebra structure on the set of streams (infinite sequences of real numbers). The main ingredient is the notion of stream derivative, which can be used to formulate both coinductive proofs and definitions. In close analogy to classical analysis, the latter are presented as behavioural differential equations. A number of applications of the calculus are presented, including difference equations, analytical differential equations, continued fractions, and some problems from discrete mathematics and combinatorics. 1
AbstractWe study the set TA of infinite binary trees with nodes labelled in a semiring A from a coal...
We study the set T_A 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...
AbstractBased on the presence of a final coalgebra structure on the set of streams (infinite sequenc...
Based on the presence of a final coalgebra structure on the set of streams (infinite sequences of re...
textabstractStreams, (automata and) languages, and formal power series are viewed coalgebraically. I...
In this article we give an accessible introduction to stream differential equations, ie., equations ...
AbstractWe present a theory of streams (infinite sequences), automata and languages, and formal powe...
This paper shows how to reason about streams concisely and precisely. Streams, infinite sequences of...
Using (stream) differential equations for definitions and coinduction for proofs, we define, analyse...
We study various operations for partitioning, projecting and merging streams of data. These operatio...
textabstractThis report contains a set of lecture notes that were used in the spring of 2003 for a m...
Using (stream) differential equations for definitions and coinduction for proofs, we define, analys...
AbstractThis paper presents an application of coinductive stream calculus to signal flow graphs. In ...
We study the set TA 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 T_A 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...
AbstractBased on the presence of a final coalgebra structure on the set of streams (infinite sequenc...
Based on the presence of a final coalgebra structure on the set of streams (infinite sequences of re...
textabstractStreams, (automata and) languages, and formal power series are viewed coalgebraically. I...
In this article we give an accessible introduction to stream differential equations, ie., equations ...
AbstractWe present a theory of streams (infinite sequences), automata and languages, and formal powe...
This paper shows how to reason about streams concisely and precisely. Streams, infinite sequences of...
Using (stream) differential equations for definitions and coinduction for proofs, we define, analyse...
We study various operations for partitioning, projecting and merging streams of data. These operatio...
textabstractThis report contains a set of lecture notes that were used in the spring of 2003 for a m...
Using (stream) differential equations for definitions and coinduction for proofs, we define, analys...
AbstractThis paper presents an application of coinductive stream calculus to signal flow graphs. In ...
We study the set TA 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 T_A 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...