The bilinearisation of infinite dimensional nonlinear systems defined on a Hilbert space H is examined and Volterra series on L2 are also considered. This will be achieved by introducing a new Hilbert space L2 w [H;IR]
AbstractFor any finite dimensional control system with arbitrary cost, Pontryagin's Maximum Principl...
The nonlinear variations of constants formula is used to derive state estimates when a nonlinear sys...
A simple identity is given which forms the basis of a descent for the optimization of bilinear syste...
The theory of realisation of linear input-output maps is applied to the study of root locus for dist...
A simple condition for the noncontrolability of homgeneous bilinear syaytems is derived in terms of ...
Volterra series expansions represent an important model for the representation, analysis and synthes...
In this paper, the approximate observability of a class of infinite dimensional bilinear systems is ...
A physical mechanism is suggested for the appearance of non-integer order infinite zeros. It is used...
The theory of linear systems has been developed over many years into a unified collection of results...
SIGLEAvailable from British Library Document Supply Centre- DSC:9106.17(CUED/F-INFENG/TR--12) / BLDS...
Recently, attention has been focused on the class of bilinear systems, both for its applicative inte...
Volterra series expansions are widely used in analysing and solving the problems of nonlinear dynami...
The nonlinear variation of constants formula is generalised to infinite dimensional systems and appl...
The root locus is an important tool for analysing the stability and time constants of linear finite-...
New results for model order reduction, for weakly nonlinear systems in the frequency domain, are der...
AbstractFor any finite dimensional control system with arbitrary cost, Pontryagin's Maximum Principl...
The nonlinear variations of constants formula is used to derive state estimates when a nonlinear sys...
A simple identity is given which forms the basis of a descent for the optimization of bilinear syste...
The theory of realisation of linear input-output maps is applied to the study of root locus for dist...
A simple condition for the noncontrolability of homgeneous bilinear syaytems is derived in terms of ...
Volterra series expansions represent an important model for the representation, analysis and synthes...
In this paper, the approximate observability of a class of infinite dimensional bilinear systems is ...
A physical mechanism is suggested for the appearance of non-integer order infinite zeros. It is used...
The theory of linear systems has been developed over many years into a unified collection of results...
SIGLEAvailable from British Library Document Supply Centre- DSC:9106.17(CUED/F-INFENG/TR--12) / BLDS...
Recently, attention has been focused on the class of bilinear systems, both for its applicative inte...
Volterra series expansions are widely used in analysing and solving the problems of nonlinear dynami...
The nonlinear variation of constants formula is generalised to infinite dimensional systems and appl...
The root locus is an important tool for analysing the stability and time constants of linear finite-...
New results for model order reduction, for weakly nonlinear systems in the frequency domain, are der...
AbstractFor any finite dimensional control system with arbitrary cost, Pontryagin's Maximum Principl...
The nonlinear variations of constants formula is used to derive state estimates when a nonlinear sys...
A simple identity is given which forms the basis of a descent for the optimization of bilinear syste...