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For linear periodic discrete-time systems the analysis of the model error introduced by a truncation on the balanced minimal realization is performed, and a bound for the infinity norm of the model error is introduced. The results represent an extension to the periodic systems of the well known results on the balanced truncation for time-invariant systems. The general case of periodically time-varying state-space dimension has been considered.
Many researches have been interested in the approximation properties of Fuzzy Logic Systems (FLS), which, like neural networks, can be seen as approximation schemes. Almost all of them tackled the Mamdani fuzzy model, which was shown to have many interesting approximation features. However, only in few cases the Sugeno fuzzy model was considered. In this paper, we are interested in the zero-order Multi-Input-Multi-Output (MIMO) Sugeno fuzzy model with Beta membership functions. This leads to Beta...
Necessary and sufficient conditions are established for the existence of a solution to some bilateral polynomial matrix equations with unimodular right-hand-side matrices. A procedure for the computation of the solution is derived and illustrated by a numerical example. Two examples of applications of bilateral polynomial matrix equations are presented.
Companion matrices of the second type are characterized by properties that involve bilinear maps.
The paper deals with a boundary control problem for the Maxwell dynamical
system in a bounbed domain
Ω ⊂ R3. Let ΩT ⊂ Ω be the subdomain
filled by waves at the moment T,
T* the moment at which the waves fill the whole
of Ω. The following effect occurs: for small enough
T the system is approximately controllable in ΩT whereas for
larger T < T* a lack of controllability is possible. The subspace of unreachable states
is of finite dimension determined by topological characteristics of ΩT.
We consider transmission problems for general second order linear hyperbolic
systems having piecewise constant coefficients in a bounded, open connected
set with smooth boundary and controlled through the Dirichlet boundary
condition. It is proved that such a system is exactly controllable in an
appropriate function space provided the interfaces where the coefficients
have a jump discontinuity are all star-shaped with respect to one and the
same point and the coefficients satisfy a certain...
We propose a finite difference semi-discrete scheme for the approximation of the boundary exact controllability problem of the 1-D beam equation modelling the transversal vibrations of a beam with fixed ends. First of all we show that, due to the high frequency spurious oscillations, the uniform (with respect to the mesh-size) controllability property of the semi-discrete model fails in the natural functional setting. We then prove that there are two ways of restoring the uniform controllability...
We propose a finite difference semi-discrete scheme for the
approximation of the boundary exact controllability problem of
the 1-D beam equation modelling the transversal vibrations
of a beam with fixed ends.
First of all we show that, due to the high frequency spurious
oscillations, the uniform (with respect to the mesh-size)
controllability property of the semi-discrete model fails in the
natural functional setting.
We then prove that there are two ways of restoring the uniform
controllability...
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