AbstractGeneral second-order parabolic and hyperbolic equations on a bounded domain are considered. The input is applied in the Neumann or mixed boundary condition and is expressed as a finite-dimensional feedback. In the parabolic case, the feedback acts, in particular, on the Dirichlet trace of the solution: here it is shown that the resulting closed loop system defines a (feedback) C0-semigroup on L2(Ω) (in fact, on H32 − 2ϱ(Ω), ρ > 0), that is both analytic and compact for positive times, and whose generator has compact resolvent. In the hyperbolic case, the feedback acts on the position vector only, or on its Dirichlet trace in a special case: here a similar result is established regarding the existence of a feedback C0-cosine operator...
This paper considers the regulator problem for a parabolic equation (generally unstable), defined on...
AbstractFeedback stabilization of a linear hyperbolic boundary value control system is implemented. ...
Recently, the following novel method for proving the existence of solutions for certain linear time-...
General second-order parabolic and hyperbolic equations on a bounded domain are considered. The inpu...
AbstractGeneral second-order parabolic and hyperbolic equations on a bounded domain are considered. ...
AbstractA general second order parabolic equation is considered with both Dirichlet or mixed (in par...
A parabolic equation defined on a bounded domain is considered, with input acting in the Neumann (or...
A parabolic equation defined on a bounded domain is considered, with input acting in the Neumann (or...
AbstractThis paper deals with the boundary feedback stabilization problem of a wide class of linear ...
AbstractWe study the stabilization problem of linear parabolic boundary control systems. While the c...
AbstractA “closed loop” system consisting of the wave equation with a feedback acting in the Dirichl...
A parabolic equation defined on a bounded domain is considered, with input acting on the boundary th...
AbstractSufficient conditions for the local exponential stabilizability of abstract systems describe...
A hyperbolic equation defined on a bounded domain is considered, with input acting in the Dirichlet ...
Abstract. This paper considers feedback stabilization for the semilinear control system ~(t)=Au(t)+v...
This paper considers the regulator problem for a parabolic equation (generally unstable), defined on...
AbstractFeedback stabilization of a linear hyperbolic boundary value control system is implemented. ...
Recently, the following novel method for proving the existence of solutions for certain linear time-...
General second-order parabolic and hyperbolic equations on a bounded domain are considered. The inpu...
AbstractGeneral second-order parabolic and hyperbolic equations on a bounded domain are considered. ...
AbstractA general second order parabolic equation is considered with both Dirichlet or mixed (in par...
A parabolic equation defined on a bounded domain is considered, with input acting in the Neumann (or...
A parabolic equation defined on a bounded domain is considered, with input acting in the Neumann (or...
AbstractThis paper deals with the boundary feedback stabilization problem of a wide class of linear ...
AbstractWe study the stabilization problem of linear parabolic boundary control systems. While the c...
AbstractA “closed loop” system consisting of the wave equation with a feedback acting in the Dirichl...
A parabolic equation defined on a bounded domain is considered, with input acting on the boundary th...
AbstractSufficient conditions for the local exponential stabilizability of abstract systems describe...
A hyperbolic equation defined on a bounded domain is considered, with input acting in the Dirichlet ...
Abstract. This paper considers feedback stabilization for the semilinear control system ~(t)=Au(t)+v...
This paper considers the regulator problem for a parabolic equation (generally unstable), defined on...
AbstractFeedback stabilization of a linear hyperbolic boundary value control system is implemented. ...
Recently, the following novel method for proving the existence of solutions for certain linear time-...