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MFCS
2010
Springer
2010
Springer
Robust Computations with Dynamical Systems
Abstract. In this paper we discuss the computational power of Lipschitz dynamical systems which are robust to infinitesimal perturbations. Whereas the study in [1] was done only for not-so-natural systems from a classical mathematical point of view (discontinuous differential equation systems, discontinuous piecewise affine maps, or perturbed Turing machines), we prove that the results presented there can be generalized to Lipschitz and computable dynamical systems. In other words, we prove that the perturbed reachability problem (i.e. the reachability problem for systems which are subjected to infinitesimal perturbations) is co-recursively enumerable for this kind of systems. Using this result we show that if robustness to infinitesimal perturbations is also required, the reachability problem becomes decidable. This result can be interpreted in the following manner: undecidability of verification doesn’t hold for Lipschitz, computable and robust systems. We also show that the p...
Real-time TrafficMFCS 2010 | Perturbed Reachability Problem | Reachability Problem | Systems | Theoretical Computer Science |
| Added | 29 Jan 2011 |
| Updated | 29 Jan 2011 |
| Type | Journal |
| Year | 2010 |
| Where | MFCS |
| Authors | Olivier Bournez, Daniel S. Graça, Emmanuel Hainry |
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