Projection based MOR

The basic idea of almost all the model order reduction (MOR) methods is to find a subspace ${\displaystyle S_1}$ which approximates the manifold where the state vector ${\displaystyle \mathbf{𝐱}}(t)$ resides. Afterwards, ${\displaystyle \mathbf{𝐱}}(t)$ is approximated by a vector ${\displaystyle \widetilde{\mathbf{𝐱}}(t)}$ in $S_1$. The reduced model is produced by Petrov-Galerkin projection onto a subspace $S_2$, or by Galerkin projection onto the same subspace ${\displaystyle S_1}$.

We use the system ${\displaystyle E\frac{d\mathbf{𝐱}}{dt}=A\mathbf{𝐱}+B\mathbf{𝐮}(t),\mathbf{𝐲}(t)=C\mathbf{𝐱}+D\mathbf{𝐮}(t).}$

as an example to explain the basic idea. Assuming that an orthonormal basis ${\displaystyle V=(v_1,v_2,\dots ,v_q)}$ of the subspace ${\displaystyle S_1}$ has been found, then the approximation ${\displaystyle \widetilde{\mathbf{𝐱}}(t)}$ in ${\displaystyle S_1}$ can be represented by the basis as ${\displaystyle \widetilde{\mathbf{𝐱}}(t)=V\mathbf{𝐳}(t)}$. Therefore ${\displaystyle \mathbf{𝐱}}(t)$ can be approximated by ${\displaystyle \mathbf{𝐱}}(t)\approx V\mathbf{𝐳}(t)$. Here ${\bf z}$ is a vector of length $q \ll n$.

Once ${\displaystyle \mathbf{𝐳}}(t)$ is computed, we can get an approximate solution ${\displaystyle \widetilde{\mathbf{𝐱}}(t)=V\mathbf{𝐳}(t)}$ for ${\displaystyle \mathbf{𝐱}}(t)$. The vector ${\displaystyle \mathbf{𝐳}}(t)$ can be computed from the reduced model which is derived by the following two steps.