Add to ORKGThe problem of realization is used to find out the linear systems containing the known G transfer function. This final project describes the relationship between the invariant subspace with controllable subspace and the observable subspace of a linear system. Realization of the transfer function G will be controlled if the controllabe subspace of the system is invariant subspace of an operator on the state space system. Realization of the transfer function G will be observable if the observable subspace of the system is co-invariant to an operator of the state space system
When a state variable description of a linear system is known, then its input–output behavior can be...
When a state variable description of a linear system is known, then its input–output behavior can be...
Controllability subspaces play an important role in geometric control theory for proper linear syst...
The aim of the thesis is to examine a number of properties related to the set of invariants of linea...
A fundamental problem is to construct linear systems with given transfer functions. This problem has...
We generalize controllability invariantsuspaces of switched linear systems, a class of hy-brid syste...
For a class of spectral systems a complete characterization of all controlled invariant subspaces co...
We generalize controllability invariantsuspaces of switched linear systems, a class of hy-brid syste...
State-space representation and analysis of dynamical systems has led to new concepts, one of which i...
For a class of spectral systems a complete characterization of all controlled invariant subspaces co...
Switched linear systems consist of a collection of linear systems and a switching law that governs t...
This paper deals with the problem of the functional output e-controllability of a linear system whos...
This paper deals with the problem of the functional output e-controllability of a linear system whos...
When a state variable description of a linear system is known, then its input–output behavior can be...
When a state variable description of a linear system is known, then its input–output behavior can be...
When a state variable description of a linear system is known, then its input–output behavior can be...
When a state variable description of a linear system is known, then its input–output behavior can be...
Controllability subspaces play an important role in geometric control theory for proper linear syst...
The aim of the thesis is to examine a number of properties related to the set of invariants of linea...
A fundamental problem is to construct linear systems with given transfer functions. This problem has...
We generalize controllability invariantsuspaces of switched linear systems, a class of hy-brid syste...
For a class of spectral systems a complete characterization of all controlled invariant subspaces co...
We generalize controllability invariantsuspaces of switched linear systems, a class of hy-brid syste...
State-space representation and analysis of dynamical systems has led to new concepts, one of which i...
For a class of spectral systems a complete characterization of all controlled invariant subspaces co...
Switched linear systems consist of a collection of linear systems and a switching law that governs t...
This paper deals with the problem of the functional output e-controllability of a linear system whos...
This paper deals with the problem of the functional output e-controllability of a linear system whos...
When a state variable description of a linear system is known, then its input–output behavior can be...
When a state variable description of a linear system is known, then its input–output behavior can be...
When a state variable description of a linear system is known, then its input–output behavior can be...
When a state variable description of a linear system is known, then its input–output behavior can be...
Controllability subspaces play an important role in geometric control theory for proper linear syst...