There is an interesting relation between stability of linear dynamical systems in Rn and positive semigroups on the space Sn of symmetric matrices in. Rn×n ...
There is an interesting relation between stability of linear dynamical systems in ¹n and positive semigroups on the space Sn of symmetric matrices in. ¹nxn . A ...
Our main interest is to determine conditions for complete marginal stability of these systems. To this end we find solutions of the Lyapunov matrix equation and ...
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Feb 17, 2023 · Positive semigroups arise in a variety of areas of applied mathematics, including nonlinear filtering, rare event analysis, branching processes, ...
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Abstract—In this paper, we present a number of results concerned with the stability of positive switched linear systems.
This section is devoted to the definition of linear matrix-valued symmetric continuous-time systems that evolves on the cone of positive semidefinite matrices ...
Missing: Semigroups | Show results with:Semigroups
Any feedback must preserve the cyclic structure of the state matrix if the resulting system is to represent the discretization of a partial differential.
Conclusions. In this paper we studied the stability properties of a class of switched linear systems whose system matrices satisfy certain symmetry conditions.
Missing: Semigroups | Show results with:Semigroups
Abstract. We examine the stability of continuous time linear switched systems when the switch- ing times are governed by a Poisson process.