Bilinear PMOR method

The model reduction method we present here is applicable to linear parameter-varying (LPV) systems of the form

$\dot{x} (t) = A x (t) + \sum_{i = 1}^{d} p_{i} (t) A_{i} x (t) + B_{0} u_{0} (t), y (t) = C x (t),$

where $A, A_{i} \in ℝ^{n \times n}, B_{0} \in ℝ^{n \times m}$ and $C \in ℝ^{p \times n} .$

The main idea is that the structure of the above type of systems is quite similar to so-called bilinear control systems. Although belonging to the class of nonlinear control systems, the latter exhibit many features of linear time-invariant systems. In more detail, a bilinear control system is given as follows

$\dot{x} (t) = A x (t) + \sum_{i = 1}^{m} N_{i} x (t) u_{i} (t) + B u (t),$

where $A, N \in ℝ^{n \times n}, B \in ℝ^{n \times m}$ and $C \in ℝ^{p \times n} .$

As one can see, there seems to be a close connection between LPV and bilinear systems which may be advantageous. To be more precise, we can interpret LPV systems as special bilinear system by simply setting

$\tilde{A} = A, {\tilde{N}}_{i} = 0, i = 1, \dots, m, {\tilde{N}}_{i} = A_{i}, i = m + 1, \dots, m + d, \tilde{B} = [\begin{matrix} B_{0} & 0 \end{matrix}], \tilde{C} = C, \tilde{u} = [\begin{matrix} u_{0} \\ p_{1} (t) \\ ⋮ \\ p_{d} (t) \end{matrix}] .$

It is important to note that in this way the parameter dependency has been hidden in the structure of a bilinear systems and if we use a bilinear model reduction method, we automatically end up with a structure-preserving model reduction method for LPV systems as well.