textabstractThe computation of reachable sets of nonlinear dynamic and control systems is an important problem of systems theory. In this paper we consider the computability of reachable sets using Turing machines to perform approximate computations. We use Weihrauch's type-two theory of effectivity for computable analysis and topology, which provides a natural setting for performing computations on sets and maps. The main result is that the reachable set is lower-computable, but is only outer-computable if it equals the chain-reachable set. In the course of the analysis, we extend the computable topology theory to locally-compact Hausdorff spaces and semicontinuous set-valued maps, and provide a framework for computing approximations
In this paper we investigate continuous and upper and lower semi-continuous real functions in the fr...
Dynamical systems have important applications in science and engineering. For example, if a dynamica...
AbstractIn this paper we introduce and compare computability concepts on the set of closed subsets o...
AbstractThe computation of reachable sets of nonlinear dynamic and control systems is an important p...
The computation of reachable sets of nonlinear dynamic and control systems is an important problem o...
htmlabstractIn this paper we consider the computation of reachable, viable and invariant sets for di...
We revise and extend the foundation of computable topology in the framework of Type-2 theory of effe...
In this article we develop a theory of computation for continuous mathematics. The theory is based o...
In this paper we consider the semantics for the evolution of hybrid systems, and the computability o...
AbstractIn this paper we investigate aspects of effectivity and computability on partial continuous ...
International audienceReachability analysis consists in computing the set of states that are reachab...
AbstractIn the context of possibly infinite computations yielding finite or infinite (binary) output...
Computability and continuity are closely linked - in fact, continuity can be seen as computability r...
AbstractA concrete model of computation for a topological algebra is based on a representation of th...
AbstractIn this paper we extend computability theory to the spaces of continuous, upper semi-continu...
In this paper we investigate continuous and upper and lower semi-continuous real functions in the fr...
Dynamical systems have important applications in science and engineering. For example, if a dynamica...
AbstractIn this paper we introduce and compare computability concepts on the set of closed subsets o...
AbstractThe computation of reachable sets of nonlinear dynamic and control systems is an important p...
The computation of reachable sets of nonlinear dynamic and control systems is an important problem o...
htmlabstractIn this paper we consider the computation of reachable, viable and invariant sets for di...
We revise and extend the foundation of computable topology in the framework of Type-2 theory of effe...
In this article we develop a theory of computation for continuous mathematics. The theory is based o...
In this paper we consider the semantics for the evolution of hybrid systems, and the computability o...
AbstractIn this paper we investigate aspects of effectivity and computability on partial continuous ...
International audienceReachability analysis consists in computing the set of states that are reachab...
AbstractIn the context of possibly infinite computations yielding finite or infinite (binary) output...
Computability and continuity are closely linked - in fact, continuity can be seen as computability r...
AbstractA concrete model of computation for a topological algebra is based on a representation of th...
AbstractIn this paper we extend computability theory to the spaces of continuous, upper semi-continu...
In this paper we investigate continuous and upper and lower semi-continuous real functions in the fr...
Dynamical systems have important applications in science and engineering. For example, if a dynamica...
AbstractIn this paper we introduce and compare computability concepts on the set of closed subsets o...