Add to ORKGThe notion of finite zeros of discrete-time positive linear systems is introduced. It is shown that such zeros are real nonnegative numbers. It is also shown that a square positive strictly proper or proper system of uniform rank with the observability matrix of full column rank has no finite zeros. The problem of zeroing the system output for positive systems is defined. It is shown that a square positive strictly proper or proper system of uniform rank with the observability matrix of full column rank has no nontrivial output-zeroing inputs. The obtained results remain valid for non-square positive systems with the first nonzero Markov parameter of full column rank
AbstractIn this paper we will consider discrete time invariant linear systems that allow for an inpu...
In this paper we will consider discrete time invariant linear systems that allow for an input-state-...
In this paper we will consider discrete time invariant linear systems that allow for an input-state-...
The notion of finite zeros of continuous-time positive linear systems is introduced. It is shown tha...
The positive realization problem for linear systems is to find, for a given transfer function, all p...
Necessary and sufficient conditions for the reachability and observability of the positive continuou...
In this paper the zero properties of discrete-time linear systems with multirate outputs are studied...
A discrete-time positive linear system has the property that any nonnegative initial state and any n...
In this paper, a new finite-time stability (FTS) concept, which is defined as positive FTS (PFTS), i...
Notions of externally and internally positive singular discrete-time linear systems are introduced. ...
Positive systems play an important role in systems and control theory and have found many applicatio...
Positive systems play an important role in systems and control theory and have found many applicatio...
Positive systems play an important role in systems and control theory and have found applications in...
Positive systems play an important role in systems and control theory and have found applications in...
The notions of monomial generalized Frobenius matrices is proposed and the reachability and observab...
AbstractIn this paper we will consider discrete time invariant linear systems that allow for an inpu...
In this paper we will consider discrete time invariant linear systems that allow for an input-state-...
In this paper we will consider discrete time invariant linear systems that allow for an input-state-...
The notion of finite zeros of continuous-time positive linear systems is introduced. It is shown tha...
The positive realization problem for linear systems is to find, for a given transfer function, all p...
Necessary and sufficient conditions for the reachability and observability of the positive continuou...
In this paper the zero properties of discrete-time linear systems with multirate outputs are studied...
A discrete-time positive linear system has the property that any nonnegative initial state and any n...
In this paper, a new finite-time stability (FTS) concept, which is defined as positive FTS (PFTS), i...
Notions of externally and internally positive singular discrete-time linear systems are introduced. ...
Positive systems play an important role in systems and control theory and have found many applicatio...
Positive systems play an important role in systems and control theory and have found many applicatio...
Positive systems play an important role in systems and control theory and have found applications in...
Positive systems play an important role in systems and control theory and have found applications in...
The notions of monomial generalized Frobenius matrices is proposed and the reachability and observab...
AbstractIn this paper we will consider discrete time invariant linear systems that allow for an inpu...
In this paper we will consider discrete time invariant linear systems that allow for an input-state-...
In this paper we will consider discrete time invariant linear systems that allow for an input-state-...