We present a semantic framework for the deductive verification of hybrid systems with Isabelle/HOL. It supports reasoning about the temporal evolutions of hybrid programs in the style of differential dynamic logic modelled by flows or invariant sets for vector fields. We introduce the semantic foundations of this framework and summarise their Isabelle formalisation as well as the resulting verification components. A series of simple examples shows our approach at work
Abstract. Hybrid systems is a mathematical model of embedded sys-tems, and has been widely used in t...
Abstract We formalize the soundness theorem for differential dynamic logic, a logic for verifying hy...
Hybrid is a formal theory implemented in Isabelle/HOL that provides an interface for representing an...
The thesis describes an open modular semantic framework for the verification of hybrid systems in a ...
We present simple new Hoare logics and refinement calculi for hybrid systems in the style of differe...
We describe our UTP theory of hybrid relations, which extends the relational calculus with continuou...
The growing complexity and diversity of models used for engineering dependable systems implies that ...
We introduce Canonical HybridLF (CHLF), a metalogic for proving properties of deductive systems, imp...
We present a series of improvements to the Hybrid system, a formal theory implemented in Isabelle/HO...
AbstractWe introduce Canonical HybridLF (CHLF), a metalogic for proving properties of deductive syst...
Logical frameworks supporting higher-order abstract syntax (HOAS) allow a direct and concise specifi...
Abstract. Hybrid systems are integrations of discrete computation and continuous physical evolution....
In this paper, we outline our vision for building verification tools for Cyber-Physical Systems base...
A shallow semantical embedding of Input/Output logic in classical higher-order logic is presented, a...
In this thesis, extensions of Kleene algebras are used to develop algebras for rely-guarantee style ...
Abstract. Hybrid systems is a mathematical model of embedded sys-tems, and has been widely used in t...
Abstract We formalize the soundness theorem for differential dynamic logic, a logic for verifying hy...
Hybrid is a formal theory implemented in Isabelle/HOL that provides an interface for representing an...
The thesis describes an open modular semantic framework for the verification of hybrid systems in a ...
We present simple new Hoare logics and refinement calculi for hybrid systems in the style of differe...
We describe our UTP theory of hybrid relations, which extends the relational calculus with continuou...
The growing complexity and diversity of models used for engineering dependable systems implies that ...
We introduce Canonical HybridLF (CHLF), a metalogic for proving properties of deductive systems, imp...
We present a series of improvements to the Hybrid system, a formal theory implemented in Isabelle/HO...
AbstractWe introduce Canonical HybridLF (CHLF), a metalogic for proving properties of deductive syst...
Logical frameworks supporting higher-order abstract syntax (HOAS) allow a direct and concise specifi...
Abstract. Hybrid systems are integrations of discrete computation and continuous physical evolution....
In this paper, we outline our vision for building verification tools for Cyber-Physical Systems base...
A shallow semantical embedding of Input/Output logic in classical higher-order logic is presented, a...
In this thesis, extensions of Kleene algebras are used to develop algebras for rely-guarantee style ...
Abstract. Hybrid systems is a mathematical model of embedded sys-tems, and has been widely used in t...
Abstract We formalize the soundness theorem for differential dynamic logic, a logic for verifying hy...
Hybrid is a formal theory implemented in Isabelle/HOL that provides an interface for representing an...