B. M. J. Maschke

Well-posedness and regularity for a class of hyperbolic boundary control systems (2006)

Zwart, H.J., Le Gorrec, Y., Maschke, B.M.J., Villegas, J.A.

We study a class of hyperbolic partial differential equations on a one dimensional spatial domain with control and observation at the boundary. Using the idea of feedback we show this class of...

Boundary control for a class of dissipative differential operators including diffusion systems (2006)

Villegas, J.A., Le Gorrec, Y., Zwart, H.J., Maschke, B.M.J.

In this paper we study a class of partial differential equations (PDE's), which includes Sturm-Liouville systems and diffusion equations. From this class of PDE's we define systems with control and...

Dissipative boundary control systems with application to distributed parameters reactors (2006)

Le Gorrec, Y., Maschke, B.M.J., Villegas, J.A., Zwart, H.J.

In this paper we consider distributed parameter physical systems composed of a reversible part associated with a skew-symmetric operator J as Hamiltonian systems and a symmetric operator associated...

Energy-conserving formulation of RLC-circuits with linear resistors (2006)

Eberard, D., Maschke, B.M.J., Van Der Schaft, A.J.

Bond graph modelling for chemical reactors (2006)

Couenne, F., Jallut, C., Maschke, B.M.J., Breedveld, P.C., Tayakout, M.

In this paper we present a bond graph model of a Continuous Stirred Tank Reactor which represents the reaction kinetics as well as the heat and mass transport phenomena in the reactor. The...

Dirac structures and boundary control systems associated with skew-symmetric differential operators (2005)

Le Gorrec, Y., Zwart, H.J., Maschke, B.M.J.

Associated with a skew-symmetric linear operator on the spatial domain $[a,b]$ we define a Dirac structure which includes the port variables on the boundary of this spatial domain. This Dirac...

Dirac structures and boundary control systems associated with skew-symmetric differential operators (2004)

Le Gorrec, Y., Zwart, H.J., Maschke, B.M.J.

Associated with a skew-symmetric linear operator on the spatial domain $[a,b]$ we define a Dirac structure which includes the port variables on the boundary of this spatial domain. This Dirac...

Fluid dynamical systems as Hamiltonian boundary control systems (2001)

Maschke, B.M.J., Van Der Schaft, A.J.

It is shown how the geometric framework for distributed-parameter port-controlled Hamiltonian systems, as recently obtained by the authors, can be adapted to formulate ideal adiabatic fluids with...

Hamiltonian formulation of distributed-parameter systems with boundary energy flow (2001)

Maschke, B.M.J., Van Der Schaft, A.J.

A Hamiltonian formulation of classes of distributed-parameter systems is presented, which incorporates the energy flow through the boundary of the spatial domain of the system, and which allows to...

Port controlled Hamiltonian representation of distributed parameter systems (2000)

Maschke, B.M.J., Van Der Schaft, A.J.

A port controlled Hamiltonian formulation of the dynamics of distributed parameter systems is presented, which incorporates the energy flow through the boundary of the domain of the system, and which...

Geometric formulation of generalized bond graph models - Part I: Generalized junction structures (2000)

Golo, G., Breedveld, P.C., Maschke, B.M.J., Van Der Schaft, A.J.

This paper deals with the extraction of input-output equations that describe a generalized junction structure. This is done by associating a Dirac structure to the generalized junction structure....