We revisit our earlier work on the representation of quantum systems as Chu spaces, and investigate the use of coalgebra as an alternative framework. On the one hand, coalgebras allow the dynamics of repeated measurement to be captured, and provide mathematical tools such as final coalgebras, bisimulation and coalgebraic logic. However, the standard coalgebraic framework does not accommodate contravariance, and is too rigid to allow physical symmetries to be represented. We introduce a fibrational structure on coalgebras in which contravariance is represented by indexing. We use this structure to give a universal semantics for quantum systems based on a final coalgebra construction. We characterize equality in this semantics as projective e...
AbstractIn this paper we argue that the category of Stone spaces forms an interesting base category ...
Abstract. Coalgebra is an abstract framework for the uniform study of different kinds of dynamical s...
AbstractWe give an axiomatic account of what structure on a category C and an endofunctor H on C yie...
We revisit our earlier work on the representation of quantum systems as Chu spaces, and investigate ...
We revisit our earlier work on the representation of quantum systems as Chu spaces, and investigate ...
We pursue a model-oriented rather than axiomatic approach to the foundations of Quantum Mechanics, w...
A fundamental component of theoretical computer science is the application of logic. Logic provides ...
Coalgebras generalize various kinds of dynamical systems occuring in mathematics and computer scienc...
A Hilbert space $H$ induces a formal context, the Hilbert formal context $\overline H$, whose associ...
textabstractIn the semantics of programming, finite data types such as finite lists, have traditiona...
AbstractIn the semantics of programming, finite data types such as finite lists, have traditionally ...
We suggest that in the framework of the Category Theory it is possible to demonstrate the mathematic...
Abstract. The paper considers a generalization of the notions of topo-logical system of S. Vickers a...
AbstractLogical definability is investigated for certain classes of coalgebras related to state-tran...
This paper studies finitary modal logics as specification languages for Set-coalgebras (coalgebras o...
AbstractIn this paper we argue that the category of Stone spaces forms an interesting base category ...
Abstract. Coalgebra is an abstract framework for the uniform study of different kinds of dynamical s...
AbstractWe give an axiomatic account of what structure on a category C and an endofunctor H on C yie...
We revisit our earlier work on the representation of quantum systems as Chu spaces, and investigate ...
We revisit our earlier work on the representation of quantum systems as Chu spaces, and investigate ...
We pursue a model-oriented rather than axiomatic approach to the foundations of Quantum Mechanics, w...
A fundamental component of theoretical computer science is the application of logic. Logic provides ...
Coalgebras generalize various kinds of dynamical systems occuring in mathematics and computer scienc...
A Hilbert space $H$ induces a formal context, the Hilbert formal context $\overline H$, whose associ...
textabstractIn the semantics of programming, finite data types such as finite lists, have traditiona...
AbstractIn the semantics of programming, finite data types such as finite lists, have traditionally ...
We suggest that in the framework of the Category Theory it is possible to demonstrate the mathematic...
Abstract. The paper considers a generalization of the notions of topo-logical system of S. Vickers a...
AbstractLogical definability is investigated for certain classes of coalgebras related to state-tran...
This paper studies finitary modal logics as specification languages for Set-coalgebras (coalgebras o...
AbstractIn this paper we argue that the category of Stone spaces forms an interesting base category ...
Abstract. Coalgebra is an abstract framework for the uniform study of different kinds of dynamical s...
AbstractWe give an axiomatic account of what structure on a category C and an endofunctor H on C yie...