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2007

Optimal Semicomputable Approximations to Reachable and Invariant Sets

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Optimal Semicomputable Approximations to Reachable and Invariant Sets
In this paper we consider the computation of reachable, viable and invariant sets for discrete-time systems. We use the framework of type-two effectivity, in which computations are performed by Turing machines with infinite input and output tapes, with the representations of computable topology. We see that the reachable set is lower-semicomputable, and the viability and invariance kernels are upper-semicomputable. We then define an upper-semicomputable over-approximation to the reachable set, and lower-semicomputable under-approximations to the viability and invariance kernels, and show that these approximations are optimal.
Pieter Collins
Added 27 Dec 2010
Updated 27 Dec 2010
Type Journal
Year 2007
Where MST
Authors Pieter Collins
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